Theory and application of infinite series

TIGHT BINDING BOOK

Page No 104 missing

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164019

THEORY AND APPLICATION OF INFINITE SERIES

BLACKIE & SON LIMITED 16/18 William

IV

Street,

Charing

17 Stanhope Street,

Crosi,, LONDON GLASGOW

VV

BLACKJE & SON (INDIA) LIM1TKD 103/5 Fort Street,

BOMBAY

BLACKIH & SON (CANADA) LIMITED TORONTO

C

2

THEORY AND APPLICATION OF INFINITE SERIES

BY

DR.

KONRAD KNOPP

PROFESSOR OF MATHTCMATICb AT THE UNIVLRSITY OF TUBINGEN

Translated

from

the

Second German Edition

and

revised

in accordance with the

Fourth by Miss R. C. H. Young, Ph.D., L.esSc.

BLACKIE & SON LIMITED LONDON AND GLASGOW

First issued i o a8

Reprinted 1044, 1946

Second Publish Fdition, translated ft o, the Fourth German Edition, 1951 Rfpntitrd TO 54

Printed in Great Britain by Blackie

&

Son, Ltd., Glasgow

From

the preface to the

first

(German)

edition.

There is no general agreement as to where an account of the theory of infinite series should begin, what its main outlines should be, or what On the one hand, the whole of higher analysis may it should include. be regarded as a

field for

the application of this theory, for and integration are

all

limiting

based on including processes the investigation of infinite sequences or of infinite series. On the other hand, in the strictest (and therefore narrowest) sense, the only matters that arc in place in a textbook on infinite series are their definition, the differentiation

manipulation of the symbolism connected with them, and the theory of convergence.

Part

In his "Vorlesungen uber Zahlcn- und Funktioncnlehre", Vol. 1, 2, A. Pringsheim has treated the subject with these limitations.

There was no question of offering anything similar in the present book. My aim was quite different: namely, to give a comprehensive account of all the investigations of higher analysis in which infinite series are the chief object of interest, the treatment to be as free from assumptions as possible and to start at the very beginning and lead on to the extensive frontiers of present-day research.

To

set all this forth in as

interesting and intelligible a way as possible, but of course without in the least abandoning exactness, with the object of providing the student with a convenient introduction to the subject and of giving him an idea

of

its

to put

and fascinating variety such was my vision. material grew in my hands, however, and resisted

rich

The it

into shape.

my

efforts

In order to make a convenient and useful book,

the field had to be restricted.

But

was guided throughout by the exI have covered the whole of the perience I have gained in teaching ground several times in the general course of my work and in lectures and also by the aim at the universities of Berlin and Konigsbcrg of the book. It was to give a thorough and reliable treatment which would be of assistance to the student attending lectures and which would at the same time be adapted for private study. The latter aim was particularly dear to me, and this accounts for the form in which I have presented the subject-matter. Since it is generI

easier to prove a deduction in pure especially for beginners mathematics than to recognize the restrictions to which the train of reasoning is subject, I have always dwelt on theoretical difficulties, and ally

VI

Preface.

have tried to remove them by means of repeated illustrations; and although I have thereby deprived myself of a good deal of space for important matter, I hope to win the gratitude of the student. I considered that an introduction to the theory of real numbers was indispensable as a beginning, in order that the first facts relating to convergence might have a firm foundation. To this introduction I have added a fairly extensive account of the theory of sequences, and, finally,

in

the actual theory of infinite series.

The

latter is

then constructed

two

storeys, so to speak: a ground-floor, in which the classical part of the theory (up to about the stage of Cauchy's Analyse

algebrique)

expounded, though with the help of very limited resources, and a superstructure, in which I have attempted to give an account of the later is

th developments of the 19 century. For the reasons mentioned above,

I

have had to omit

many

parts

of the subject to which I would gladly have given a place for their own sake. Semi-convergent series, Euler's summation formula, a detailed treatment of the Gamma-function, problems arising from the

hypjrgeometric series, the theory of double series, the newer work on power series, and, in particular, a more thorough development of the last chapter,

on divergent

that

scries all these I was reluctantly obliged to set the other hand, I considered that it was essential to deal with sequences and series of complex terms. As the theory runs almost parallel with that for real variables, however, I have, from the beginning, formulated all the definitions and proved all the theorems concerned in such a way that they remain valid without alteration, whether the "arbiaside.

On

trary" numbers involved are real or complex. These definitions and theorems are further distinguished by the sign In choosing the examples in this respect, however, I lay no claim to originality; on the contrary, in I them have made collecting extensive use of the literature I have taken pains to put practical .

applications in the fore-front and to leave mere playing with theoretical Hence there are e. g. a particularly large number of exer-

niceties alone. cises

there

on Chapter VIII and only very few on Chapter IX. Unfortunately was no room for solutions or even for hints for the solution of

the examples. list of the most important papers, comprehensive accounts, and textbooks on infinite series is given at the end of the book, immediately in front of the index.

A

Kdnigsberg, September

1921.

VII

Preface.

From

the preface to the second

(German) The

edition.

second edition was called for

such a remarkably had on the whole been on the right lines. Hence the general plan has not been altered, but it has been improved in the details of expression and demonstration on fact that a

mean

short time could be taken to

after

that the first

almost every page.

The

chapter, that dealing with divergent series, has been wholly with rewritten, important extensions, so that it now in some measure an to the theory and gives an idea of modern work introduction provides on the subject. last

Kdnigsberg, December

1923.

Preface to the third (German) edition. The main

and second editions is that Euler's summation formula and asymptotic expansions, which I had reluctantly omitted from the first two editions. This important chapter had meanwhile appeared in a similar form in the English translation published by Blackie Son London and Glasgow, in 1928. Limited, In addition, the whole of the book has again been carefully revised, and the proofs have been improved or simplified in accordance with the progress of mathematical knowledge or teaching experience. This applies especially to theorems 269 and 287. Dr. W, Schobe and Herr P. Securius have given me valuable assistance in correcting the proofs, for which I thank them heartily. it

has

become

difference between the third

possible to

add

a

new chapter on

&

Tubingen, March

1931.

Preface to the fourth (German) edition. In view of present difficulties no large changes have been made for book has again been revised and numerous

the fourth edition, but the details

have been improved, discrepancies removed, and several proofs The references to the literature have been brought up to

simplified. date.

Tubingen,

July 1947.

VIII

Preface.

Preface to the

first

English edition.

This translation of the second German edition has been very skilfully prepared by Miss R. C. //. Young, L. es Sc. (Lausanne), Research Student, Girton College, Cambridge. The publishers, Messrs. Blackie and Son, Ltd., Glasgow, have carefully superintended the printing. In addition, the publishers were kind enough to ask me to add a chapter on Enter's summation formula and asymptotic expansions. I agreed to do so all the more gladly because, as I mentioned in the original preface, it was only with great reluctance that I omitted this part of the subThis chapter has been translated by Miss ject in the German edition. W. M. Deans, B.Sc. (Aberdeen), M.A. (Cantab.), with equal skill. I wish to take this opportunity of thanking the translators and the as I hope publishers for the trouble and care they have taken. If my book meets with a favourable reception and is found useful by Englishspeaking students of Mathematics, the credit will largely be theirs.

Tubingen, February

1928.

Konrad Knopp.

Preface to the second English edition. The second English edition German edition (194/7).

has been produced to correspond to the

fourth

Although most of the changes are individually small, they have nonetheless involved a considerable

work having been

The

number of

translation has been carried out

was responsible

alterations,

about half of the

re-set.

for the original work.

by Dr. R. C. H. Young who

Contents. Page

.,

Introduction

Part

1

I.

Real numbers and sequences. Chapter

1.

Principles of the theory of real numbers. 1.

2 3 4. 5.

The system

of rational numbers and Sequences of rational numbers

Irrational

its

gaps

3 14 23

numbers

Completeness and uniqueness of the system of real numbers Radix fractions and the Ded'-kind section Exercises on Chapter 1 (1 8)

Chapter

.

.

.

Jj3

37 42

II.

Sequences of real numbers. Arbitrary sequences and arbitrary null sequences Powers, roots, and logarithms Special null sequences 8. Convergent sequences The two main criteria ... ... $ 10 Limiting points and upper and lower limits 11. Infinite series, infinite products, and infinite continued fractions Exercises on Chapter II (933) . .

43 49 64 78 89

6. 7.

.

1

Part

.

98 106

II.

Foundations of the theory of

/

. .

Chapter

infinite series.

111.

* Series of positive terms. 12. 13.

14

The first principal criterion and the two comparison The root test and the ratio test Series of positive, monotone decreasing terms Exercises on Chapter **

III

tests

....

(3444) (CJ51)

110 116 120 125

X

Contents.

Chapter

Page

IV.

Series of arbitrary terms. 15.

The second

16. Absolute

principal criterion and the algebra of convergent series 126 136 Derangement of series

convergence.

146 149

17. Multiplication of infinite series

Exercises on Chapter IV

(4503)

Chapter

/

Power 18. 19.

V.

series.

The radius

of convergence Functions of a real variable

.

.

20. Principal piopertics of functions leprcsented 21. The algebra of power series

V

Exercises on Chapter

by power series

.

.

.

151 158 171 179

188

(64 -73)

Chapter VI The expansions 22. 23. 24.

25.

26. 27.

of the so-called elementary functions.

The The The The The logarithmic series The cyclometrical functions Exercises on Chapter VI (74 -84)

189 191

rational functions exponential function trigonometrical functions binomial series

198 208 211 213 215

Chapter

VII.

Infinite products. 28. Products with positive terms 29. Products with arbitrary terms. Absolute convergence ... 30. Connection between series and products. Conditional and unconditional .

convergence

(8599)

Chapter

VIII.

s^ Closed and numerical expressions for the sums of 31.

sum

-J30

of a series 33. Transformation of series 34.

series.

Statement of the problem

32. Evaluation of the

by means of a closed expression

Numerical evaluations

35. Applications of the transformation of series to

Exercises on Chapter VIIF

221

226 228

.

Exercises on Chapter Vll

218

(100132)

numerical evaluations

232 240 247 260 267

Contents.

Part

Development

III

of the theory.

Chapter

y

IX.

Series of positive terms. 36. 37.

38. 39.

Detailed study of the two comparison tests The logarithmic scales Special comparison tests of the second kind Theorems of Abel, Dint, and Prin^heim and their application to a fresh deduction of the logarithmic scale of comparison tests Series of monotonely diminishing positive terms General remarks on the theory of the convergence and divergence of series of positive terms Sy sterna ti/ation of the general theory of convergence Exercises on Chapter IX (138141) .

.

41.

42.

274 278 284

t

.

40.

.

.

.

290 294

298 305 311

Chapter X. \/ Series of arbitrary terms. \

I

|

convergence for series ot arbitrary terms Rearrangement of conditionally convergent series

43. Tests of

44.

45. Multiplication of conditionally

Exercises on Chapter

convergent series

X (142153; Chapter

,

312 318 320 324

XI.

Series of variable terms (Sequences of functions).

Uniform convergence Passage to the limit term by term 48 Tests of uniform convergence

326 338 344 350 350

46.

47.

49. Fourier scries

A. Euler's formulae B. Dinchlet's integral C. Conditions of convergence

356 364

50. Applications of the theory of Fourier series 51. Products with variable terms

Exercises on Chapter XI (154

173J

Chapter Series of 52.

54.

Power

complex terras

series.

XII.

complex terms.

Complex numbers and sequences

53. Series of

372 380 385

Analytic functions

388 396 401

Contents.

XII

Page.

55.

The elementary I.

410

analytic functions

410

Rational functions

The The IV. The V. The VI. The VII. The VIII. The II.

III.

411

exponential function functions cosz and sin z functions cot z and tan*

414 417 419

logarithmic scries inverse sine series inverse tang-cnt series

4*21

422 423

binomial series

Uniform convergence. rem on double series Products with complex terms

56. Series of variable terms.

57.

Weierstrass* theo-

428 434

*-

441

58. Special classes of series of analytic functions

A. Dinchlet's series B. Faculty series C. Lambert's series

.

Exercises on Chapter XII

Divergent 59. 60.

XI11.

series.

General remarks on divergent series and the processes of limitation The C- and H- processes

61. Application of 62. The A- process 63.

452

(174199)

Chapter

Ct summation -

to the theory of Fourier series

.

.

The E- process Exercises on Chapter XIII

441 446 448

(200216)

.

457 478 492 498 507 516

Chapter XIV. Euler's summation formula and asymptotic expansions. 64. Euler's

A.

summation formula

518

.

The summation formula

518 525 531

B. Applications C. The evaluation of renviinders 65.

Asymptotic

535 543

scries

of asymptotic expansions A. Examples of the expansion problem B. Examples of the summation problem

66. Special cases

Exercises on Chapter Bibliography

Name and

XIV

subject index

543 548

(217-225)

........

553 556 557

Introduction. The

foundation on which the structure of higher analysis rests is the theory of real numbers. Any strict treatment of the foundations of differential and the integral calculus and of related subjects must inevitably start from there; and the same is true even for e. g. the calculation of roots and logarithms. The theory of real numbers first creates

the material on which Arithmetic and Analysis can subsequently build, and with which they deal almost exclusively.

The creators

The great necessity for this has not always been realized. l and Leibniz and Newton of the infinitesimal calculus

the no less famous

men who

developed

it,

of

whom

Eider

2

is

the chief,

were too intoxicated by the mighty stream of learning springing from the newly-discovered sources to feel obliged to criticize fundamentals. To them the results of the new methods were sufficient evidence for It was only when the stream began ventured to examine the fundamental con-

the security of their foundations. to

ebb that

critical analysis

About the end of the 18 th century such

efforts became stronger and stronger, chiefly owing to the powerful influence of Gauss 3 Nearly a century had to pass, however, before the most essential matters could

ceptions.

.

be considered thoroughly cleared up. Nowadays rigour in connection with the underlying number concept is the most important requirement in the treatment of any mathematical Ever since the later decades of the past century the last word subject. 4 on the matter has been uttered, so to speak, by Weierstrass in the 5 6 and Dedekind in 1872. No lecture or treatise sixties, and by Cantor 1

Gottfried Wilhelm Leibniz, born in Leipzig in 1646, died in Hanover in Isaac Neivton, born at Woolsthorpe in 1642, died in London in 1727. Each discovered the foundations of the infinitesimal calculus independently of the other. 2 Leonhard Eider, born in Basle in 1707, died in St. Petersburg in 1783. 3 Karl Friedrich Gauss, born at Brunswick in 1777, died at Gottingen in 1853. 4 Karl Weierstrass, born at Ostenfelde in 1815, died in Berlin in 1897. The first rigorous account of the theory of real numbers which Weierstrass had expounded in his lectures since 1860 was given by G. Mittag-Leffler, one of his pupils, in his 1716.

Die Zahl, Einleitung zur Theone der analytischen Funktionen, The Tohoku Mathematical Journal, Vol. 17, pp. 157209. 1920. 5 Georg Cantor, born in St. Petersburg in 1845, died at Halle in 1918: cf. Mathem. Annalen, Vol. 5, p. 123. 1872. 6 Richard Dedekind, born at Brunswick in 1831, died there in 1916: cf. his book: Stetigkeit und irrationaJe Zahlen, Brunsuick 1872. essay:

1

2

Introduction.

dealing with the fundamental parts of higher analysis can claim validity unless it takes the refined concept of the real number as its startingpoint.

Hence the theory of in so

many

different

real

numbers has been

stated so often and might seem superfluous for in this book (at least in

ways since that time that

it

to give another very detailed exposition 7 the later chapters) we wish to address ourselves only to those already acquainted with the elements of the differential and integral calculus. :

Yet it would scarcely suffice merely to point to accounts given elsewhere. For a theory of infinite series, as will be sufficiently clear from later developments, would be up in the clouds throughout, if it were not firmly based on the system of real numbers, the only possible foundation. On account of this, and in order to leave not the slightest uncertainty as to the hypotheses on which we shill build, we shall discuss in the following pages those idsas and data from the theory of real numbers which we shall need further on. We have no intention, however, of constructing a statement of the theory compressed into smaller space but merely wish to make the main ideas, the most

otherwise complete.

We

important questions, and the answers to them, as clear and prominent as possible. So far as the latter are concerned, our treatment throughout will certainly be detailed and without omissions; it is only in the cases of details of subsidiary importance, and of questions as to the completeness and uniqueness of the system of real numbers which lie outside the plan of this book, that

we

shall content ourselves

with shorter indications.

An account which is easy to follow and which includes all the essentials th given by H. v. Mangoldt, Einfuhrung in die hohere Mathematik, Vol. I, 8 edition The treatment of G. Kozvalezvski, Grundziige (by K. Knopp), Leipzig 1944. der Differential- und Integralrechnung, 6 th edition, Leipzig 1929, is accurate and A rigorous construction of the system of real numbers, which goes into concise. the minutest details, is to be found in A. Loezvy, Lehrbuch der Algebra, Part I, Leipzig 1915, in A. Pnngsheim, Vorlesungen uber Zahlen- und Funktionenlehre, Vol. I, Part I, 2 n(1 edition, Leipzig 1923 (cf. also the review of the latter work by H. Hahn, Gott. gel. Anzeigen 1919, pp. 321 47), and in a book by E. Landau exclusively devoted to this purpose, Grundlagen der Analysis (Das Rechnen mit ganzen, rationalen, irrationalen, komplexen Zahlen), Leipzig 1930. A critical account of the whole problem is to be found in the article by F. Bachmann, Aufbau des nii edition, Part I, Zahlensystems, in the Enzyklopadie d. math. Wissensch., Vol. I, 2 7

is

article 3,

Leipzig and Berlin 1938.

Part

I.

Real numbers and sequences. Chapter

I.

Principles of the theory of real numbers. 1.

or

of rational

numbers and

its

gaps.

What do we mean by saying that a particular number is "known" "given" or may be "calculated"? What does one mean by saying he knows the value of 1/2 or

that

A

The system

question like

that \/2

this

= l-414,

I

is

should

answer, and indeed in the question

we cannot

the decimal further,

may

first

and so on, instance

even

that

is

no tenable

entirely meaningless. The on, and this, without further

it is

how we are to go tell. Nor is the position improved by carrying

after all,

is,

indication,

or lnat ne can calculate 1/5? than to answer. Were I to say

obviously be wrong, since, on multiwith greater If I assert, not give 2.

X 1-414 does 1/2 = 1-4 142 135

plying out, 1-414 caution, that

n>>

easier to ask

In this sense to hundreds of places. no one has ever beheld the whole of "V/2,

even

well be said that

held it completely in his own statement that 1/9 3 or that 35-7-7

not

=

it

whilst a hands, so to speak has a finished and thorough-

=5

The position is no better as regards appearance. number n, or a logarithm or sine or cosine from the tables. Yet we feel certain that 1/2 and n and log 5 really do have quite definite But a clear values, and even that we actually know these values. notion of what these impressions exactly amount to or imply we do ly satisfactory

the

Let us endeavour to form such an idea. not as yet possess. raised doubts as to the justification for such statements Having

know 1/2", we must,

be consistent, proceed to examine he knows the number justified or is given (for some specific calculation) the number ~. Nay more, the significance of such statements as "I know the number 97" or "for such and such a calculation I am given a 2 and 6 5" would as

"I

how

far

one

is

even

to

in asserting that

^

=

=

4

Chapter

I.

Principles of the theory of real numbers.

require scrutiny. We should have to enquire into the whole significance or concept of the natural numbers 1, 2, 3, ... This last question, however, strikes us at once as distinctly transgressing the bounds of Mathematics and as belonging to an order of ideas quite apart from that which we propose to develop here. No science rests entirely within itself: each borrows the strength of its ultimate foundations from strata above or below it, such as experi-

ence, or theory of knowledge, or logic, or metaphysics, must accept something as simply given, and on that it .

Every science may proceed to

.

.

In this sense neither mathematics nor any other science starts build. without assumptions. The only question which has to be settled by a criticism of the foundation and logical structure of any science is what shall be assumed as in this sense "given"; or better, what minimum of

assumptions will suffice, to serve as a basis for the subsequent development of all the rest. For the problem we are dealing with, that of constructing the system of real numbers, these preliminary investigations are tedious and troublesome, and have actually, it must be confessed, not yet reached any entirely initial

A

discussion adequate to the present satisfactory conclusion at all. position of the subject would consequently take us far beyond the limits of the work w e are contemplating. Instead, therefore, of shouldering r

an obligation to assume as basis only a minimum of hypotheses, we propose to regard at once as known (or "given", or "secured") a group of data whose deducibility from a smaller body of assumptions is familiar i. e. of numbers and negative, including zero. Speaking broadly, it is a matter of common knowledge how this system may be as a smaller body of assumptions constructed, if only the ordered and their combinations by sequence of natural numbers 1, 2, 3, addition and multiplication, are regarded as "given". For everyone knows and we merely indicate it in passing how fractional numbers arise from the need of inverting the process of multiplication, negative numbers and zero from that of inverting the process of addition 1 The totality, or aggregate, of numbers thus obtained is called the system (or set) of rational numbers. Each of these can be completely and literally "given" or "written down" or "made known" with the help of at most two natural numbers, a dividing bar and possibly a minus sign. For brevity, we represent them by small italic characters; #,&,...,

namely, the system of rational numbers,

to everyone

integral

and

fractional, positive

.

.

.

,

.

x, y,

.

1

.

.

The

following are the essential properties of this system:

See the works of Loewy, Pringsheim, and Landau mentioned in the Introduction; also O. Holder, Die Anthmetik in strenger Begrundung, 2" J edition, Berlin 1929; and O. Stolz and J. A. Gmeiner, Theoretische Arithmetik, 3 r
The system

1.

numbers

Rational

1.

between any two, say a and

of rational

its

a

=

>b

a

b,

2

and these relations of "order" necessarily holds ; numbers are subject to a set of quite simple laws, which the only essential ones for our purposes being the

Fundamental Laws 3

a

Invariably

a

3.

a

=

b always implies b by b c implies a

4.

a

^

b b

Any two

2.

<

c,

rational

between rational

we assume known,

of Order.

a.

1.

2.

y

5

gaps.

form an ordered aggregate; meaning that 6, one and only one of the three relations

< b.

a

numbers and

or a

- a.

= < b, b < c c.

y

implies

numbers may be combined

4

a

<

in

c.

four distinct

ways, referred to respectively as the four processes (or basic operations) of Addition, Subtraction, Multiplication, and Division. These operations

can always be carried out to one definite result, with the single exception of division by 0, which is undefined and should be regarded as an entirely impossible or meaningless process; the four processes also obey a number of simple laws, the so-called Fundamental rules cleducible therefrom.

Laws of Arithmetic, and

further

These too we shall regard as known, and state, concisely, those Fundamental Laws or Axioms of Arithmetic from which all the others may be inferred, by purely formal rules (i. e. by the laws of pure logic). Addition.

I.

ated with 2.

3. 4. 5.

c,

it

1.

a third,

a =

Every pair of numbers a and b has invariably associcalled their sum and denoted by a b.

+ always implv a + b b + (Commutative Law). Invariably, (a + b) + c = a + (b + c) (Associative Law). a < b always implies a + c < b + c (Law of Monotony). a',

b

b'

Subtraction.

To

every pair of

such that a a

>

\

b -- a'

b'.

Invariably, a

II.

8

+

c,

+c

b and b

<

numbers a and

b there corresponds a third

number

b.

a are merely two different expressions of the same

relation.

"<"

would therefore suffice. Strictly speaking, the one symbol 3 With regard to this seemingly trivial "law" cf. footnote 11, p. 9, and footnote 24, p. 29.

remark

1

,

p. 28,

4 To express that one of the relations of order: a b, a 6, or a > b, does not hold, we write, respectively, ("greater than or equal to", "at least equal *6. Kach of to", "not less than"), a -t= b ("unequal to", "different from") or a these statements (negations) definitely excludes one of the three relations and leaves undecided which of the other two holds good.

<

a^b

6

Chapter

Principles of the theory of real numbers.

I.

III. Multiplication.

To

1.

number

every pair of numbers a and b there corresponds a third called their product and denoted by a b.

c,

always implies a b

=

2.

a

3.

In

all

cases

4.

In

all

5.

In

all

cases (ab) c =-- a (b c) (Associative Law). b c (Distributive Law). ac cases (a b) c

6.

a

b

a',

b'

= ba

ab

(Commutative Law).

+

+


a' b'.

implies, provided c

is

positive,

a

<.b

c

c

of

Mono-

not

there

(Law

tony).

IV. Division.

To

every pair of numbers a and b of which the b. corresponds a third number c, such that a c

first is

=

and As already remarked, all the known rules of arithmetic, are deduced from these hence ultimately all mathematical results, few laws, with the help of the laws of pure logic alone. Among these laws, one is distinguished by its primarily mathematical character, namely the

V.

Law

of Induction,

laws of arithmetic and If a set

S

3)t

is

which may be reckoned among the fundamental normally stated as follows:

number 1, and if, every those less than n can be taken to

of natural numbers includes the

time a certain natural number n and

all

belong to the aggregate, the number (n h 1) rniy be inferred also to belong to it, then $)J includes all the natural numbers.

This law of induction

itself

follows quite easily from the following

theorem, which appears even more obvious and is therefore normally called the fundamental law of the natural numbers Law of the Natural Numbers. In every set of natural numbers that :

is always a number less than all the rest. according to the hypotheses of the Induction Law, we consider the set 9i of natural numbers not belonging to $)?, this set W must

is

not "empty" there

For

if,

be "empty", that is, $ft must contain all the natural numbers. For otherwise, by the law of the natural numbers, 1U would include a number less than all the rest. This least number would exceed 1, for it was assumed that 1 belongs to l)i; hence it could be denoted by n 1. Then n would belong to 3)i, but (n 1) would not, which contradicts the hypotheses in the law of induction. 5 In applications it is usually an advantage to be able to make statements not merely about the natural numbers but about any whole numbers.

+

s

+

6

The

deduced If set

>j.)j

more general form of the law of induction can be same way from the fundamental law of the natural numbers. of natural numbers includes the number 1, and if the number (n -|- 1) following rather

in exactly the

can be proved to belong to the aggregate provided the number n does, then Wl contains all the natural

numbers.

The system

1.

The

of rational numbers and

its

laws then take the following forms, obviously equivalent to those

above

:

Law

of Induction. If a statement involves a natural W 10, then 2 n*", or the like) and if this is correct for n statement p a)

>

^

n

"if

7

gaps.

=

number n

(e. g.

t

and correctness for n

its

b)

number

>;

statement

= p,

p)

is

p

-{-

I,

.

.

.

correctness

its

always implies correct for every natural

number

,

k (where k is any natural k -f- 1, then the n

^ p.

Law there

of Integers. In every set of integers all 6 always a number less than all the rest.

is

We

p

r

that

is

not "empty",

mention a theorem susceptible, in the domain of numbers, although it becomes axiomatic character very soon after this domain is left; namely the will

lastly

of immediate proof,

rational in

=

for

Theorem

VI.

of Eudoxus.

a and b are any two positive rational numbers, then a natural number n always exists 7 such that n b a. If

>

The

four ways of combining two rational numbers give in every In this sense the system case as the result another rational number.

of rational numbers forms a closed aggregate (naturlicher Rationalitatsbereich or number corpus). This property of forming a closed system \\ith respect to the four rules is obviously not possessed by the aggregate of natural numbers, or of all positive and negative integers. These are, so to speak, too sparsely sown to meet all the demands which the four all

make upon them.

rules

in

This closed aggregate of all rational numbers and the laws which hold it, are then all that we regard as given, known, secured.

As

may

briefly

argument which makes use of inequalities and its most important rules may be

that type of

be a

little

unfamiliar to some,

and without proof: Here

all

I. Inequalities.

follows

absolute values set

down

here,

from the laws of order and monotony.

In particular

The

3.

statements in the laws of monotony are reversible; always implies a < 6; and so does a c < b c provided c > a < b, c < d always implies a -f c < b -f d. b a < b, c d implies, provided b and c are positive, a c

4.

a

1.

<

b

-|-

2.

c

,

<

<

<

b

a! ways

.

and

also,

b

implies .

provided a

<

.

is

positive,

e.

g.

a

-f-

c

0.

d.

a,

11 < ,

b

-.

a

To

reduce these forms of the laws to the previous ones, we need only connumbers m such that, in the one case, the statement in question correct for n 1) -f m belongs to the (p 1) -f m, or, in the other, that (p

sider the natural is

non-" empty" set under consideration. 7 This theorem is usually, but incorrectly, ascribed to be found in Euclid, Elements, Book V, Def. 4.

to Archimedes ;

it is

already

3.

8

Chapter

Principles of the theory of real numbers.

I.

Also these theorems, as well as the laws of order and monotony, hold (with l> b and a are positive, in 1, 3, and 4 respectively. II. Absolute values. By a |, the absolute value (or modulus) Definition: a which is positive, supof a, is meant that one of the two numbers -\-a and -^ 0. (Hence and if a = 0, a > 0.) posing a 3= 0; and the number 0, if a The following theorems hold, amongst others: \

|

-

---

a\

\

2.

a\.

ab

|

=\

1

3.

J

a

4.

\

b

:_j,

[

+

a\

\

b

\

|a

\;

provided a

,

a

+

a

0.

=f=

+ 6|^|a|-

|6|, and indeed

^ The two

5.

similarly for 0. |

tation of

x

|

a

b

a is |

<

\

r

|

a

<

\

r

and a

and x

r <.

<

r

<

a

a

-\-

r.

<

|

a

+

b

\

\a\ -|6|(.

r are exactly equivalent;

the distance between the points a and b, with the represena straight line described immediately below.

numbers on

Proof of the a -\ b)

^

(a

relations

\

|

|

|

|

|

6

|,

^

a

relation in 4:

first -f-

and hence

|

a

-\

b

a \

\

b

|,

^

|

a

\

< -}-

|

|

b b

|,

so that

by

3,

I, 2,

|.

We also assume it to be known how the relations of magnitude between rational numbers may be illustrated graphically by relations of positions between points on a straight line. On a straight line or number-axis, any two distinct points arc marked, one O, the origin (0) and one U the unit point (1). The point P which is to represent a number 9

a

=

*-

> 0,

(q

p ^

both integers)

0,

is

obtained by marking off on the

times in succession, beginning at O, the
axis,

|

p

|

U

>

This point

8

we

in

corresponding

brevity the point a, and the totality of points

call for

this

to

way

all

rational

numbers we

shall

refer

rational points of the axis. The straight line is usually to of as from and drawn chosen to the right of O. left thought right

to

as

the

U

In this case, the words positive and negative obviously become equivalents of the phrases: to the right of O and to the left of O, respectively; b signifies that a lies to the left of b, b to the and, more generally, a

<

This mode of expression right of a. abstract relations between numbers. 8

of the

The

position of this point

number a

t

i.

a

is

may

often assist us in illustrating

independent of the particular representation

another representation with and p' ^ the construction is performed with q', p' in place of q p, the

e. if

both integers, and if same point P is obtained.

p'/q'

is

t

1.

The system

of rational numbers and

its

gaps.

9

the sketch of what we propose to take as the of our subject. secured foundation We shall now regard previously the description of these foundations as characterizing the concept of

This completes

number;

in other words,

we

any system of conceptually welldistinguished objects (elements, symbols) a number system, and its shall call

numbers, if to put it quite briefly for the moment we can operate with them in essentially the same ways as we do with rational numbers.

elements

We

proceed to give this somewhat inaccurate statement a precise

formulation.

We

consider

a,

.

j3,

.

a

system

S

S

of well-distinguished

a, .

.

1.

which we

will

exclusively by means of rational numbers (i. natural numbers alone) 9 , these symbols a, jS,

conditions

objects,

be called a number system and its elements /?,.... will be called numbers if, besides being capable of definition

denote by

c. .

.

ultimately by means of satisfy the following four

:

Between any two elements a and

three relations

/3

of

S

one and only one of the

10

a

< 0,

a

=

a

>

is expressed briefly by saying that S is an ordered relations and these of order between the elements of S are subject system) to the same fundamental laws 1 as their analogues in the system of rational

necessarily holds (this

numbers u 2. Four .

distinct

methods of combining any two elements of S are and Division. With

defined, called Addition, Subtraction, Multiplication a single exception, to be mentioned immediately

(3.),

these processes

can always be carried out to one definite result, and obey the same Fundamental Laws 2, I IV, as their analogues in the system of the rational

m

We

9 shall come across actual examples 3 and 5; for the moment, we n.ay think of decimal fractions, or similar symbols constructed from rational numbers. See also footnote 10, p. 12. 10 Cf. also footnotes 2 and 4.

11

As to what we may call the practical meaning of these relations, nothing implied; "<" may as usual stand for "less than'*, but it may equally well mean "before", "to the left of", "higher than", "lower than", "subsequent to", in fact may express any relation of order (including "greater than"). This meaning merely has to be defined without ambiguity and kept consistent. Similarly, "equality" Is

need not imply identity. Thus, for example, within the system of symbols of the 12 are form p/q, where/), q are integers and q =4= 0, the symbols 3/4, 0/8, I)/ generally said to be "equal"; that is, for certain purposes (calculating, measuring, and so on) we define equality within our system of symbols in such a way that 3/4 -= 6/8-= -9/-12, although 3/4, 0/8, -9/-12 are in the first instance different elements of that system (see also 14, note

1).

10

Chapter

numbers

12 .

I.

Principles of the theory of real numbers.

(The "zero" of the system, which must be known in order and negative, is to be defined

that the elements can be divided into positive as explained in footnote 14 below.) 3.

(and

With every

all

rational a)

rational

others "equal'

numbers,

to

number we can associate an element of S in such a manner that, if a and b denote

it)

a, ft their associates

the relation

that holding

'

1.

from S:

holding between a and

between a and

ft

is

of the same form as

b.

+

a

ft, b) the element resulting from a combination of a and ft (i. e. a a -f- ft) has for its associated rational number the result ft, a ft, or

of the similar combination of a and b

(i.

e.

a

+ b,

a

b,

a

b,

or a -^ b

respectively).

[This is also expressed, more shortly, by saying that the system S contains a sub-system S' sivnilar and isomorphous to the system of rational numbers. Such a sub-system is in fact constituted by those

elements of S which we have associated with rational numbers 13 .] In such a correspondence, an element of S associated with the rational number zero, and all elements equal to it, may be shortly referred to as the "zero" of the system of elements. then relates to division by zero 14

The

exception mentioned in

2.

.

12 With reference to these four processes it should be noted, as in the case of the symbols < and We also -, that no practical interpretation is implied. draw attention to the fact that subtraction is already completely denned in terms of addition, and division in terms of multiplication, so that, properly speaking, only two modes of combining elements need be assumed known. 13 Two ordered systems are similar if it is possible to associate each element of the one \\ith an element of the other in such a way that the same one of the relations 4, 1 as holds between two elements of the one system also holds between the two associated elements of the other, they are tsomorfihous relatively to the possible modes of combining their elements, if the element resulting from a combination of two elements of the one system is associated with that resulting from the similar combination of the two associated elements of the other system. 14 The third of the stipulations by means of which we here characterise the concept of number is fulfilled, moreover, as a consequence of the first arid second. For our purposes, this fact is not essential; but as it is significant from a systematic point of view, we briefly indicate its proof as follows' By 4, 2, there is an element a. From the fundamental laws 2, 1, it then quite eastl> follow^ for which a -fof S satisfies a -IThis element tha one and the same element a, for every a. with all elements equal to it, is called the neutral element relatively to the process of addition, or for brevity the "zero" in S. If a is different from this "zero", there for which a e a; and it again appears thit this element is, further, an element a for any other a in S. This e, with all elements is the same as that satisfying n equal to it, is called the neutral element relatively to the process of multiplication, The elements of S produced bv repeated addition or or, briefly, the "unit" in S. subtraction of this "unit", and any others equal to them, are then called "integers" of S. All further elements of S (and all equal to them) which result fiom these by the process of division then form the sub-system S' of S in question; that it is similar and iamorphous to the system of all rational numbers is in fact easily deduced from 4, i and 4, 2. Thus, as asserted, our concept of number is already determined by the requirements of 4, 1, 2 and 4. ,

The

1.

system ot rational numbers and

For any two elements a and

4.

of

/3

S

its

11

gaps.

both standing in the relation

">"

to the "zero" of the system, there exists a natural number n for a. Here n )3 denotes the sum ]8 -f- jf? which n j8 . . . -|- ]8 containing

>

the element

To will

+

w times.

]8

abstract

this

(Postulate of Eudoxus;

append the following remark

cf.

2, VI.)

concept of number we If the system S contains no other

characterisation l5 :

of

the

corresponding to rational numbers as specified in 3, then our system does not differ in any essential feature from the system of rational numbers, but only in the (purely external) designation of the elements by symbols, or in the (purely practical) interpretation than

elements

those

we give to these symbols; differences almost as irrelevant, bottom, as those which occur when we write figures at one time in Arabic characters, at another, in Roman or Chinese, or take them to which at

now

denote

temperature,

now

velocity or electric charge.

Disregarding

we interpretation, as identical should thus be perfectly justified in considering the system with the system of rational numbers and in this sense we may put a a, characteristics

external

of

and

notation

practical

S

=

b

--.&....

however, the system S contains other elements besides the above mentioned, then we shall say that S includes the system of rational numbers, and is an extension of it. Whether a system of this more comprehensive kind exists at all, remains for the moment an open question; If,

We

15

have defined the concept of number by a

set of properties characterising construction of the foundations of arithmetic, which is quite out of the question within the limits of this volume, would have to comprise a strict investigation as to the extent to which these properties are independent of one it.

A

critical

whether any one of them can or cannot be deduced from the rest as Further, t would have to be shuwn that none of these fundamental and other matters too would stipulations is in contradiction with any other require consideration. These investigations are tedious and have not yet reached a another,

i.

e.

a provable fact.

final conclusion.

In the treatment by E. Landau mentioned on

p. 2, footnote 7,

it is

proved with

absolute rigour that the fundamental laws of arithmetic which we have set up can all be deduced from the following 5 axioms relating to the natural numbers:

Axiom Axiom

2:

Axiom

5:

1 is a natural number. For every natural number n there is just one other number that is called the successor of n. (Let it be denoted by n'.) 1. Axiom 3: We have always n' n. Axiom 4: From m' ~~ n' it follows that m 1

:

t

The

induction law

V

is

valid (in

its first

form).

These 5 axioms, first formulated as here by G. Peano, but in substance set up by R. Dedektnd, assume that the natural numbers as a whole are regarded as given, that a relation of equality (and hence also inequality) is defined between them, and that logic).

this

equality satisfies

the

relations

1,

1,

2,

3 (which belong to pure

12

Chapter

Principles of the theory of real numbers.

I.

but an example will come before our notice presently in the system of real

numbers

16 .

Having thus agreed as to the

amount of preliminary assumption

we

require, we may now drop all argument on the subject, and again raise the question: What do we mean by saying that we know the number

V2

or TT? It

a

must

far

the

termed altogether paradoxical that square equal to 2 does not exist in the system so or, in geometrical language, that the point A of

in the first instance be

number having constructed

its

17 ,

whose distance from

number-axis,

O

diagonal of the

equals the

O

U, coincides with none of the "rational points". For the rational numbers are dense, i. e. between any two of them (which

square of side are distinct)

we can

the n rational

point out as

many more

numbers given by a

+

v

n

as

a

fo

,

-|-

we

please (since,

for v

=

2,

1,

.

.

.

if

,

a n,

^b

y

evi-

1

dently all lie between a and b and are distinct from these and from one another); but they are not, as we might say, dense enough to symbolise all conceivable points. Rather, as the aggregate of all integers proved too scanty to

16

meet the requirements of the four processes of arithmetic, of defining the number-concept given in 4 is of course not Frequently the designation of number is still ascribed to

The mode

the only possible one.

objects which fail to satisfy some one or other of the requirements there laid down. Thus for instance we may relinquish the condition that the objects under con-

be constructively developed from rational numbers, regarding such like) as numbers, provided 4, or, in short, are similar and isomorphous only they satisfy the conditions 4, 1 This conception of the notion of number, to the system we have just set up. in accordance with which all isomoiphous systems must be regarded as in the abstract sense identical, is perfectly justified from a mathematical point of view, but sideration should

any

entities (for instance points, or distances, or

We

objections necessarily arise in connection with the theory of knowledge. shall encounter another modification of the number -concept when we come to deal with complex numbers.

I

2 -

Proof'.

There

and

other integers have their squares

all

(positive) fraction is

no natural number of square equal

17

1

,

is

certainly

where q may be taken

in its lowest terms).

But

if

Q

is

^2

^ 4.

Thus

and prime

in its lowest terms, so

is

to

V2 p

(i.

J

W/

Q

2,

as

e.

the fraction

,

which there-

(

to

could only be a

'

q

fore cannot reduce to the whole number 2. In a slightly different form: For any two natural numbers p and q without common factor, we have necessarily /> 2 4- 2 q~. For since two integers without common factors cannot both be even, either p is 2 odd, or else p is even and q odd. In the first case /> is again odd, hence cannot

=

z In the second case p 2 . (2 p'Y is divisible by 4, but 2 q 2 2 not, since it is double an odd number. So p' =1= 2 r/ again. This Pythagoras is said to have already known (cf. M. Cantor, Gesch. d. Mathem., Vol. 1, 2 ed., pp. 142 and 169. 1894).

2 equal an even integer 2 q

is

lj

1.

The system

of rational numbers and

its

13

gaps.

so also the aggregate of all rational numbers contains too many gaps 18 to satisfy the more exacting demands of root extraction. One feels, nevertheless, that a perfectly definite numerical value belongs to the point

A

and therefore

to the

underlie this feeling? Obviously, in the

symbol V2. first

instance,

What this:

are the tangible facts

We

do,

it

is

true,

which

know

perfectly well that the values 1-4 or 1*41 or 1*414 etc. for V2 are inaccurate, in fact that these (rational) numbers have squares 2, i. e.

<

But we also know that the values 1-5 or 1-42 or 1*415 etc. are in the same sense too large; that the value which we are attempting to reach would have therefore to lie between the corresponding too large and too small values. We thus reach the definite

are

too

small.

conviction that the value of N/2 values are

all

incorrect.

is

within our grasp, although the given conviction can only lie in

root of this

we have at our command may be continued as far as we

by which the above can, that is, form ... places of decimals, one fracand the other too small, and

the fact that values

The

a process,

please;

we

pairs of decimal fractions, with 1, 2, 3, tion of each pair being too large, the two differing only by one unit in the last decimal place, As this difference if n is the number of decimal places.

i.

e.

may

by

1

(y ^)

71 ,

be made

as ive
as small

decimal places, the

we please to one another. By a metaphor, somewhat bold at the present stage, we say that through this process V2 itself is "given", in virtue of it, V2 is "known", by it, V2 may be "calculated", and as

so on.

We have precisely the same situation with regard to any other value which cannot actually be denoted by a rational number, as for instance etc. If we say, these numbers are known, nothing more TT, log 2, sin 10 is implied than that we know some process (in most cases an extremely by which, as detailed in the case of V2, the desired value be imprisoned, hemmed in, within a narrower and narrower space may and this space ultimately narrowed down between rational numbers,

laborious one)

as

much

as

we

please.

For the purpose of a somewhat more general and more accurate

18 This is the paradox, scarcely capable of any direct illustration, that a set of points, dense in the sense just explained, mav already be marked on the number The situation may axis, and yet not comprise all the points of the straight line.

be described thus: Integers form a first rough partition into compartments; rational fill these compartments as with a fine sand, which on minute inspection inevitably still discloses gaps. To fill these will be our next problem.

numbers

14

Chapter

Principles of the theory of real numbers.

I.

statement of these matters,

we

insert a discussion of sequences of rational

but nevertheless of fundamental im-

provisional in character,

numbers,

comes

portance for all that

after.

numbers 1

2. Sequences of rational

.

In the process indicated above for calculating V2, successive welldefined rational numbers were constructed; their expression in decimal

form was material to free

it,

form we now propose

this

and start with the following

Definition.

5.

from

in the description;

If,

can form successively a

by means of any suitable process of construction, we (rational) number and first, a second, a third, .

.

.

n one and only one well-defined (rational) number thus corresponds, then the numbers Xm X l> X 2> X

if to every positive integer

xn

>

'3>

corresponding to the natural order of the integers 1 2, 3, ... are said to form a sequence. We denote it for brevity by (x n )

(in this order, n,

.

.

.)

*2

or (*!,

,

.

.

,

.).

O

Examples. i

*n

2. 3. -

4. 6.

xn xn xn xn

~~

C

'*

]

-

2"; an

i.

i.

;

xn

~

xn

secl uence

i ]

or

>

~ H1 = the decimal iyi - L_^.__

2' 3'

,

;

n 1,

x2

e the sequence

=

.

1,

#3

=

+

xl

i,

1,

#2

~

We

A

-+

3 4 5

^

.

digit. .

.

*

j

and,

w th

'

*

13, 21,

> 3,

n

for

generally,

1, 1, 2, 3, 5, 8,

.

.

.

let

ubually

,

I

.... 2,3,3,..., n -1 1 2 3 4 10 U '2'3'4' 11. xn the w th prime number

n"""

-

1

&

+

at the

l,2,},-8,-J,S,J,-3,-J,... o

12.

,

- 111 -

thus obtain the sequence called Fibonacci's sequence. 8.

.

V2, terminated

fraction for

i.

.

,

i

7. Let x 1 = xn-i + xn-z-

>

the sequence 2, 4, 8, 16, ... 2 a3 . where a is a given number. e. the sequence a, a (- 1 ) 71 }; 1- e. the sequence 1, 0, 1, 0, 1, 0, ...

e.

/

6.

u

*

The sequence

In this section

1,

|,

^, g,

all literal

2 ;

i.

e.

the sequence

m

^

symbols

wh.ch *

2, 3, 5, 7, 11, 13,

= (l

+

J

+

.

.

... .

+

\

i)

continue to stand for rational numbers

will

only. 2 Euclid proved that there is an infinity of primes. If p lt p 2 pk are any prime numbers, then the integer m -= (/>,/> 2 pk ) + 1 is either a prime different from pi, pi, pk or else a product of such primes. Hence no finite set of prime numbers can include all primes. ,

.

.

.

.

,

,

.

.

.

.

.

,

2.

Sequences of rational numbers.

15

Remarks.

The law

of formation may be quite arbitrary; it need not, in particular, explicit formula enabling us to obtain x n for a given n by direct calculation. In examples 6, 5, 7 and 11, clearly no such formula can be immediately written down. If the terms of the sequence are individually given, neither the law of formation (cf. 6, 5 and 12) nor any other kind of regularity (cf. 6, ll) 1.

be embodied

in

any

the successive

among

or even with a

(

l)

indexing with 2 or

such that x n

numbers

is

necessarily apparent.

sometimes advantageous to

It is

2.

is

th

3.

t

,

or

th

(

The

term, x__ lt 2) only essential

defined for every n

^ m.

We

"

th term x , sequence with a "0 it to start better Occasionally, pays that there should be an integer m

start the

#_ 2 is

.

^

The term xm

is

then called the

initial

term

of the sequence. will however, even then, continue to designate as the nih term lhat which bears the index n. In 6, 2, 3 and 4, for instance, we can without further th term or even ( l) t}l or ( 2)
term" of a sequence is then not necessarily the term with which the sequence begins. notation will be preferably (x 0> *i> ) or (#-i #o> ) etc., as the case may be, unless it is either quite clear or irrelevant where our enumeration begins, and the abbreviated notation (xn ) can be adopted.

The

3. A sequence is frequently characterised as infinite. The epithet is then merely intended to emphasize the fact that every term is succeeded by other terms. More generally, there is It is also said that there is an infinite number of terms. said to be a finite number or an infinite number of things under consideration according as the number of these things can be indicated by a definite integral number or not. And we may remark here that the word infinite, when otherwise used in the sequel, will have a symbolic significance only, intended as a concise expression

of

some

perfectly definite (and usually quite simple) circumstance. If all the terms of a sequence have one and the same value

c, the sequence symbols (x n ) ~ c. More generally, we shall write (x n ) == (xn ') if the two sequences (xn ) and (xn ') agree term for term, i. e. for every index in question xn ~ xn '. 5. It is often helpful and convenient to represent a sequence graphically by marking off its terms on the number-axis, or to think of them as so marked. We thus obtain a sequence of point*. But in doing this it should be borne in mind that, in a sequence, one and the same number may occur repeatedly, even "infinitely often" (cf. 6, 4); the corresponding point has then to be counted (i. e. considered as a term of the sequence of points) repeatedly, or infinitely often, as the

4.

is

said to be identically equal to

case

may

c,

and

in

be.

A

graphical representation of a different kind is obtained by marking, with respect to a pair of rectangular coordinate axes, the points whose coordinates are (w, x n ) for w = 1, 2, 3, ... and joining consecutive points by straight segments. The broken line so constructed gives a picture (diagram, or graph) of the sequence. 0.

To

consider from the most diverse points of view the sequences hereby introduced, and the real sequences that will shortly be defined, will be the

We

shall be interested more parare stipulated to hold, for all the terms of the sequence, or at least for all terms beyond (or following) some

main object of the following chapters. ticularly in properties which hold, or definite

8

term

E. g.

sequence

3 .

all

With

reference to this last restriction,

the terms of the sequence 6, 9 are

th are 6, 2 after the 6

>

>

1.

100 (or more shortly:

it

Or, for

n

all

>

may sometimes the terms of the 6,

xn

>

100).

16

Chapter

Principles of the theory of real numbers.

I.

be said that particular considerations in hand are valid "a finite number of terms being disregarded", or only concern the ultimate behaviour of Our first examples of considerations of the kind referred the sequence.

by the following

to are afforded

Definitions.

I.

K

positive number

A

such

^K

xn

K

sequence is said to be bounded*, if there each term x n of the sequence satisfies

then called a

is

is

that

inequality

The number

definitions:

a

the

or

bound

of the sequence.

Remarks and Examples. In definition 8, it is a matter of practical indifference whether we write holds always (i. e. for every n in question), or "
|

\

^K

\

a

K.'

any

clearly

fortiori

\

xn

\

the distinction If

2.

K

>

K will

^ K. may is

be

<

if |

xn

\

<

K. always, then in of course

bound comes

essential.

bound of

a

\

serve the purpose. Conversely, When the exact magnitude of the (xn ) t then so

is

any larger number K'.

The

sequences 6, 1, 4, 5, 6, 9, 10 are evidently bounded; so is 6, 3, provided a Si 1. The sequences 6, 2, 7, 8, 11 are certainly not so. Whether 6, 3 for every \a\ >1, or 6, 12, is bounded or not, i> not immediately obvious. 4. If all we know is the existence of a constant lt such that x n < lt for every n then the sequence is said to be bounded on the right (or above) and l is called a bound above (or a right hand bound) of the sequence. > 2 always, then (xn ) is said to be If there is a constant 2 such that xn bounded on the left (or below) and 2 is called a bound below (or a left hand bound) of the sequence. and Here 2 need not be positive. 3. |

|

K

t

K

K

K K

K

K

K

Supposing a given sequence is bounded on the right, it may still happen For instance, 6, 10 is bounded on that among its numbers none is the greatest. the right, yet every term of this sequence is exceeded by all that follow it, and none can be the greatest 6 Similarly, a sequence bounded on the left need contain no least term; cf. 6, 1 and 0. (With this fact, which will appear at first sight para5.

.

doxical, the beginner should make himself thoroughly familiar.) Among a finite number of values there is of course always both a greatest and a least, i. e. a value not exceeded by any of the others, and one which none of the

others

falls

below.

(There may, however, be several equal to

this greatest or least

value.) (5. The property of boundedness of a sequence x n (though not the actual value of one of the bounds) is a property of the tail-end of the sequence ; it is unaffected by any alteration to an isolated term of the sequence. (Proof?)

4

This nomenclature appears to have been introduced by C. Jordan, Cours

d'analyse, Vol.

The which may 6

1,

p. 22.

Paris 1893.

beginner should guard against modes of expression such as these, often be heard: "for n infinitely large, xn 1"; "1 is the greatest number of the sequence". Anything of this sort is sheer nonsense (cf. on this point 7, 3). For the terms of the sequence are 0, ,],},... and none of these is -- 1, on the contrary all of them are < 1. And there is no such thing as an "infinitely large n".

Sequences of rational numbers.

2.

if,

A

sequence is said to be for every value of n, II.

monotone ascending Xn

it is

said to be

^ Xn+

or

increasing 9.

il

monotone descending xn

Both kinds

17

or

decreasing

if,

for every n,

S Xn +l* monotone

will also be referred to as

sequences.

Remarks and Examples.

A

sequence need not of course be either monotone increasing, or monoMonotone sequences are, however, extremely comcf. 6, 4, 6, 8. mon, and usually easier to deal with than those which are not monotone. That is why it is convenient to give them a distinguishing name. 2. Instead of "ascending" we should more strictly say "non-descending", and instead of "descending", "non-ascending". This, however, is not customary. 1.

tone decreasing;

If in

vn

>

any special instance the sign of equality is excluded, so that xn < xni l or xn} ,, as the case may be, for every n then the sequence is said to be strictly t

monotone (increasing or decreasing). 3. The sequences 6, 2, 5, 7, 10,

named ascending,

11, 12

the others descending. 6, 3

and 6, 1, 9 are monotone; the firstmonotone descending, if a ^ 1, it is not monotone. due to C. Neumann (Ober die nach

^

is

"

1 for a < 0, a 4. The designation of "monotone" is Kteis-, Kugel- und Zylmderfunktionen fortschreitenden Entwickelungen, pp. 27. Leipzig 1881).

but monotone ascending

We now

come

if

.

;

to

a

definition

sparing no

the greatest attention, meaning and all that it implies. III. sequence will be called a

A

lowing property:

satisfied

by

other words

to

make himself master of

null sequence

all the terms,

xn

|

its

if it possesses the fol-

given any arbitrary positive (rational) number

|

is

which the reader should pay

to

effort

equality

2(5,

e,

the in-


with at most a finite number

an arbitrary positive number

6

of exceptions.

In

e being chosen, it is

always possible to designate a term xm of the sequence, beyond which the terms are less than Or a number n Q can always be found, such that e in absolute value. :

|*|<

for

Remarks and Examples. 1. If, in a given sequence, these conditions are fulfilled for a particular e, they will certainly be fulfilled for every greater e (cf. 8, 1), but not necessarily for any smaller e. (In 6, 10, for instance, the conditions are fulfilled for e = 1 and therefore for every larger e, if we put n =0; for e - } it is not possible to satisfy them.) In the case of a null sequence, the conditions have to be fulfilled for every positive

8

Cf. 7,

3.

10

18

Chapter

Principles of the theory of real numbers.

I.

and in particular, therefore, for every very small e > 0. On this account, it is , usual to formulate the definition somewhat more emphatically as follows: (xn ) > 0, however small, there corresponds a number is a null sequence if, to every n such that

xn

|

<

|

>

n

for every

c

n

.

Here w need not be an

integer. 6, 1 is clearly a null

()

2.

The sequence

xn

I

whatever be the value of

provided n

c,

>

-,

thus sufficient to put n a

It is

e.

<

|

sequence; for

.

The

place in a given sequence beyond which the terms remain numerimagnitude of e; speaking broadly, nn will be larger and larger), the smaller the given c is (cf. 2). This dependence of the number n on e is often 3.

<

e, will naturally depend in general on the cally to the right (i. e. it will lie further and further

emphasised by saying such that ..."

"To each

explicitly:

corresponds a

given

number n Q

w

(t)

xn is to he from some stage onwards 4. The positive number below which need not always be denoted by c. Any positive number, however designated, may serve. In the sequel, where e, a, , denoting any given positive numbers, we |

K

may

often use instead

6,

is

5.

The

^, ^,

sign of

e

^,

2

a

,

t

e,

.

.

t

\

.

a ,

etc.

xn plays no part

since

here,

xn

|

\

=

xn

|

\.

Accordingly

also a null sequence. 6. In a null sequence, no

term need be equal to zero. But all terms, whose For if I choose e = 10~~, say, then for cver\ 10~ 10 and for any other e. < Similarly for e n a < 1. 7. The sequence (a ) specified in 6, 3 is also a null sequence provided > 0, xn < Proof. If a 0, the assertion is trivial, since then, for every

index is very large, must be very small. 10~' n > a certain n 0t xn must be (

5

-

.

\

\

\

|

for every n.

<

If

|

a

\

<

1,

---.

I

I

=

* I

But

in that case, for every

n

a

For when n

=

2,

we have

1 4-

^

p >

then

t

\

we put

0.

we have

2,

+

(1 4- />)

therefore holds in that case.

p

*

If therefore

1.

\


(a)

>

then (by 3, 1,4).

If,

2

#) n

^

for n

1

>! + + k

(!+/>)*>

# p

2/> -f

^

z

>

1

-f

2p;

the stated relation

2,

1-1-

kp,

then by 2, III, 6

therefore our relation, assumed true for n 7 for every n 2. it therefore holds

=

kt

is

true for w

=

&

+

1.

By

2,

V

^

7

The

^

2 provided only 1 4- P proof shows moreover that (a) is valid for n and for n = 1, (a) becomes an equality. For p -1, but =t=0. For /> > 0, the validity of (a) follows immediately from the expansion of the lefthand side by the binomial theorem. The relation (a) is called Bernoulli's Inequality (James Bernoulli, Propositiones arithmeticae de seriebus, 1689, Prop. 4).

>

0,

i.

e.

p >

Sequences of rational numbers.

2.

Accordingly,

so that,

we now have

however small

i

>

c

I

8.

xn

may

^ I

be,

aU

I

we have

<

I

A

.

P

W f

>

n

for every

In particular, besides the sequence

//4\"\ ( (?) )'

ui

19

mentioned

)

in

2.,

-), \ 2n /

(

(-- J, \ 3fi /

remark to that of 8, 1 may be appended to Definition 10: no is produced by reading "5* e" for "< e" there. In fact, > w x n < e, then a fortiori x n 5^ c; conversely, if, given any if, for every n can be so determined that x n '^ e for every n > w 3 then choosing any posie, ?2 xn fg c l9 for every n > n^ tive number e t < c there is certainly an n 1 such that and consequently 9.

similar

essential modification () ,

|

\

\

\

,

\

|

|

|

xn

<

|

for every

n

>

nt

\

;

the conditions in their original form are thus also fulfilled. Precisely analogous " " w are practically interconsiderations show that in Definition 10 "> H O and

"^

changeable alternatives. In any individual case, however, the distinction must of course be taken into account.

Although in a sequence every term stands entirely by itself, with a definite and is not necessarily in any particular relation with the preceding or following terms, yet it is quite customary to ascribe "to the terms x n ", or "to the general term' any peculiarities in the sequence which may be observed on running through it. We might say, for instance, in 6, 1 the terms diminish; in 6, 2 the terms increase; in 6, 4 or 6, 6 the terms oscillate; in 6, 11 the general In this sense, the characterterm cannot be expressed by a formula, and so on. istic behaviour of a null sequence may be described by saying that the terms become 8 by which neither more nor less is meant than arbitrarily small, or infinitely small 9 > however small the terms Definition in viz. that for every is contained 10, or from and after, or beyond, are ultimately (i. e. for all indices n > a suitable n a certain n ) numericallv less than e. 11. A null sequence is ipso facto bounded. For if we choose e I, then there must be an integer n, such that, for every n > n i9 x n < 1. Among the finite .v number of values .v t |, x 2 1, nl |, however, one (cf. 8, 5) is greatest, .v -f 1, obviously say. Then for w is akvays < K. 10.

fixed value,

1

;

;

(t

\

|

K

.

M

.

|

.

,

M

\

!

|

|

To

prove that a given sequence is a null sequence, it is indispensable > 0, the corresponding w y can actually be proved to exist (for instance, as in the examples that follow, by actually designating such a number). Conversely, if a sequence (xn ) is assumed to be a null sequence, it is thereby assumed that, for every t, the corresponding n may really be regarded as existent. On the other hand, the student should make sure that he understands The meaning is clearly what is meant by a sequence not being a null sequence. xn this it is not true that, for every positive number *, beyond a certain point 12.

to

show

that for a prescribed e

:

|

6

and

This mode of expression

is

\

due to A. L. Caitchy (Analyse algebrique, pp. 4

2G). 9

There need of course be no question here of the sequence being monotone. some xn 's of index 5* w may already be < c.

Also, in any case,

|

|

20

Chapter

Principles of the theory of real numbers.

I.

always < e; there exists a special positive number e,,, such that xn is not, beyond c after every // there is a larger index n (and therefore an in// always v n ]> c finite number of such indices) for which 3. Finally we may indicate a means of interpreting geometrically the special character of a null sequence. Using the graphical representation 7, 5, the sequence is a nuii sequence if 10 e . Let its terms ultimately (for n > n n) all belong to the interval -fof the us call such an interval for brevity an e-neighbourhood origin; then we may state (x n ) is a null sequence if every c-neighbourhood of the origin (however small) contains all but a finite number, at most, of the terms of the sequence. Similarly, using the graphical representation 7, 6, we can state: (x n ) is a null sequence if every *-stnp (however narrow) about the a\ts of absci^ae contains the entire graph, with the exception, at most, of a finite initial portion, the e-strip e). being limited by parallels to the axis of abscissae through the two points (0, 14. The concept of a null sequence, the "arbitrarily small given positive is

|

tiny

<

,

\

() ;

.

|

|

1

.

.

.

c", to which we shall from now on have continually and indispensably to appeal, and which may thus be said to form a main support for the whole superstructure of analysis, appears to have been first used in 1055 by J. Walks (v. Opera Substantially, however, it is already to be found in Euclid, Elements V. I., p. 3S2/3).

number

We

comprehend what

are already in a better position to

in the idea, discussed above, of a

V2

or

is

involved

or log 5. In forming on the one hand (we keep to the instance of V2) the numbers

* 1 =l-4;

meaning

TT

=

1-414;

*4 == 1-4142; ...

^-

1415;

y,

*a

*o=l-41;

for

on the other, the numbers yi

=

I'O;

y*

-

1-42;

=--

1-4143;

.

.

.

we

are obviously constructing two sequences of (rational) numbers (x n ) and (yn ) according to a perfectly definite (though possibly very laborious) method of procedure. These two sequences are both monotone, (x n ) Furthermore x n is n for every //, but the increasing, (y n ) decreasing. the numbers e. i. differences,


yn form, by 10,

8, a null

xn

=-

sequence, since

dn

dn

=

n

.

These are

clearly the

facts which convince us that we "know" V2, and can "calculate" it no one has yet had the as we said before and so on, although ?

value

V2

obviously

we

refer

more suggestive representation on the number-axis,

then,

completely

again to the

(cf. fig.

1, p.

within

25):

his

view,

so

to

the points x l and

y

speak.

If

determine an interval

10 The word interval denotes a portion of the number-axis between a definite of its points. According as we reckon these points themselves as belonging pair Unless otherwise stated, the to the interval or not, this is termed closed or open. interval will always in the sequel be regarded as closed. (For 10, 13 this is immaterial, by 10, 9.) Supposing a to be the left end point, b the right end point, of an interval, we call this for brevity the interval a ... b.

2.

! .

d

of length Since

the points

l ;

the second interval

lies

and V 3 determine an the

generally,

intervals

wholly within the of length

interval

x n and y n

/2

of length

Similarly, the points

first.

d3

an interval

X3

completely within /2 and determine an interval fn completely

how

only remains to examine

It

similarly,

jy 2

,

,

lengths of these intervals form a null sequence; the one surmises, themselves shrink up, about a definite contract to a quite definite point.

number, this

points

x 2 and

21

The

Jn - V

inside

Sequences of rational numbers.

purpose in view, we

near this surmise

more

state,

to truth.

is

With

generally, the following:

To express the fact that a monotone ascending sequence 11. a and monotone descending sequence (y n ) are given, whose terms for (x n ) the condition n satisfy every xn n Definition.

^y

and for which

the differences

dn=y n form a

null sequence,

we say

Xn

for brevity that

we are given a nest of

n th interval stretches intervals (Intervallschachtelung)*. nest be has d The will denoted by ( /) or and x to n length itself yn from n y n )by (# The conjecture which we made above now finds its first confirmaTJie

.

|

tion in the following:

Theorem the intervals of

There is at most f a given nest, that is .

one to

(rational) point s belonging to all 12. say satisfying, for every n t the in-

equality

*n^s^ yn If there were,

Proof: it,

and

besides

$,

>

another

number

f

s

differing

from

also satisfying the inequality

for every

,

then, for every

,

besides

xn


,

* A set or series of similar objects is said to form a nest or to be nested (ineinander geschachtelt) when each smaller one is enclosed or fits into that which is next in size to it. The word nest is here used with the additional (ideal) characteristic implied, that the sizes diminish to zero. When this is not implied, we shall use the explicit phrase that each is contained in the preceding (or we might say that they are nested). note here for future reference that this theorem continues to hold unf

more

We

altered

when 2

the numbers which occur are arbitrary real numbers.

(051)

22

Chapter

we should

3, I, 2

by

have

also

and

Principles of the theory of real numbers.

I.

(v. 3, I, 4)

3, II, 5, the inequalities

would therefore hold

for every n.

=

Choosing

(a fortiori not for every n beyond a certain // the hypothesis that (dn ) is a null sequence. distinct

the

to all

points belong

r

dn would never This contradicts The assumption that two s

s

|,

|

intervals

<

be

)

.

inadmissible

therefore

is

11 .

Q. E. D.

Remarks and Examples. Let*n

1.

= "-"--, y = ^J;

that

We can at once verify that we actually have a ^ xn+i "^ yn+i ^ Vn ^or every n an< since, for however > be chosen.

xn

5=1

The number

of

the

all

*

.

.

of intervals 2

every n

/n 's,

>

since

~~-

-

n

1

fn be

A

numbers form a null sequence, we have a nest of intervals. shows that the sequence of the x n 's consists of the numbers

these

~~

0>

4

4'

=

1 ~"

2

2

l

J

10

~

~

From

belong to

distance

T6

~*~

""

6T

G4

*

*

~

""

32

tmd

considera-

'

^

~~

8

2

8'

,

*

and con-

1

' *

32*

Now ,

' ' '

Ci

16

P= 1

A ~

1

3

1\ ^

1

3

4*4*-)

what the proof indicates is that if $ and the intervals, then each interval has a length at least equal to the between s and s' (v. 3, II, 6); these lengths cannot, therefore,

s'

|

|

a null sequence. 12

13

Here we let the index start from (cf. 7, 2). For any two numbers a and b, and every positive integer k the formula ~ ~ a - b k = (a - b)(a k ~ l + a k ~* ... + a b k 2 + * 1 ) t

b+

fc

is

n

a graphical point of view,

all

s

+

^ 8

1,1,1, 4

4

16'

2

each taken twice running.

form

t

~

<

k>n

little

and that the sequence of yn 's begins with

each taken twice running; tinues with

11

<

/

:

obviously each contained in the preceding; and since Jn has length dn

$'

?

since

here,

<

=

other than 1 can belong therefore to all the intervals. is the interval defined as follows 12 ... 1; / l the left half the right half ofy^ y3 the left half ofy 2 ; and so on. These intervals are

Let

A; Jz

tion

dn

we have dn

,

n

,

No number

for every n. 2.

here belongs to

1 .

"-J-

nest

^

t

- 5J=J

to say,/,,

is

known 1

Whence, more

to hold.

+

a

+

.

.

.

+

a k~*

=

! l

particularly, for

~

** and a o

+

fc

a

a*

=t=

+

1,

. . .

the formulae

+

ak

=

" \1

a* a

.

a.

Irrational

3.

numbers.

23

J is the single number which belongs Hence, for every n xn < J < y n thus s " all the intervals. Here, therefore, (/n ) "defines" or determines* the number i, or (yn ) shrinks up to the number J. 3. vf we are given a nest of intervals (/n ), and a number s has been recognised as belonging to all the /n 's, then by our theorem, 5 is quite uniquely detert

\

'

to

We

therefore say, more pointedly, that the nest (/n ) "defines" or ( /n ). also say that 5 is the innermost point of all the intervals. "encloses" the number s.

mined by

We

If s

4.

and y n

But

we

festly,

any given rational number and we put, for n

1

,

2,

.

.

.

,

~

xn

1

+

s

s itself.

is

then (xn

-,

\

yn )

is

evidently a nest of intervals determining the

this is also the case if

we

s

n

number

Manis. put, for every n, x n -^ s and y n intervals defining a given

most various ways, form nests of

can, in the

number.

This theorem, however, only confirms what we may regard

one

as

half of our previously described impression; namely, that if a number s belongs to all the intervals of a nest, then there is none other besides s is uniquely determined by the nest. with this property, The other half of our impression, namely, that there must also always be a (rational) number belonging to all the intervals of a nest, is erroneous^ and it is precisely this fact which will become our induce-

ment

This the following example shows. As on

yl

numbers.

for extending the system of rational

1

>;

yz

for every n.

=

In

1-42;

.

fact, if

.

Then

.

there

is

p. 20, let

xl

no rational number

1-41 14; x.> which x n !L A

for

s>

.

.

;

.;

yn

"?

we put vn ' x

~ 3>n v

v 7 Vn

v a x n

2

form a nest 11 But xn f x^ < 2 for all n, all n (because this was how xn and y n were chosen), i. e. and yn yn x n f < 2 < y n '. On the other hand, if xn ;< s ^-_ yn we should have, by squaring ' ' 2 s y n for all n. By our theorem 12 this would in(as we may, by 3, 1, 3), xn 2 = volve s 2, which is however impossible, by the proof given in footnote 17 on p. 12. Here, therefore, there is certainly no (rational) number belonging to all the then the intervals /n '

2

--

>

'

xn '

.

.

.

yn

'

also

.

2 for

^

?

intervals.

we

In the following paragraphs,

will investigate what, in a case

such

as this, should be done.

Irrational numbers.

3.

We

must come to terms with the fact that there is no rational whose number square is 2, that the system of rational numbers is too defective, too incomplete, too full of gaps, to furnish a solution for the 14

For it follows from x n positive, so that squaring (cf. 3, further

< is

yn

'

xn

2 for every n,

'

--

yn

(y n '

+ xn

^ xn I,

x n )(y n '

<

certainly the case for every

--^n

n

l

3) is .v

,

>

i.

< y n+ ^ yn

n );

e.

since

i

allowed

<

that

xn

therefore, since s,

a certain

provided

w

.

J)n

'

^ .v

r}

<

all *v'

the

n+1

numbers i

and y n are ;

and

are

< y' nf ^ yn this,

';

certainly

by 10,

8,

Chapter

24:

Principles of the theory of real numbers.

I.

2 2. Indeed, this is only one of many equations for whose equation x solution the material of the system of rational numbers proves insufficient.

Almost

the numerical values which

all

we

are in the habit of denoting

and so on, are non-existent in the system of by \/n rational numbers and can no more be immediately "obtained", or "determined", or be "stated in figures", than can V2. The material is too coarse log n, sin a, tan a

t

for such finer purposes.

The

brought forward in the preceding paragraphs

considerations

means for providing ourselves with more suitable material. point We saw, on the one hand, that, behind the conviction that we do know V2, there lay no more, substantially, than the fact that we possess a method by which a perfectly definite nest of intervals may be to

2 2 of its construction, the solution of the equation x lr> occasion on the other that if a the course gave saw, hand, s of at all encloses number nest (/n ) (this still any capable specification

obtained

for

;

We

.

this number s is quite uniquely so ( /n ), unambiguously, indeed, that it ia entirely I indifferent, whether give (write down, indicate) the number directly, with the tacit addition that, by the latter, or give, instead, the nest (/) In I mean precisely the number s which it uniquely encloses or defines.

implying that

it is

number) then

a rational

-

defined by the nest

sense, the two data (the two symbols) are equivalent, and may a certain extent be considered equal 16 so that we may write in-

this

to

,

deed: (/n) 15

<

I2

JQ k

The

x

=-

-= 0,

.

1,

.

.

or

kernel of this procedure and accordingly put #

>

22

2,

=*

2,

.

.

.

,

10,

9,

1,

|

=

yn )

fact as

y

~

2.

s.

follows:

We

determine by

trial

We

ascertain

that

then divide the interval k

and taking the points of

into 10 equal parts,

We

in

is

2,

y

(x n

division,

whether their squares are

1

>

+

for

,

2 or

<

2.

find that the squares corresponding to k 0, 1, 2, 3, 4 are too small, those 5 G, 10 too large, and accordingly we put Xi =1-4 and . , corresponding to k xl . y l into 10 equal parts, and go y t == 1-5. Next, we divide the interval /j.

=

.

y

.

.

.

with regard to the new points of division and so on. The known process for extracting the square root of 2 is intended mainly to make the The corresponding treatment of, successive trials as mechanical as possible. for instance, the equation 10* = 2 (i. e. determination of the common logarithm of 2) involves the following nest of intervals: Since 10 < 2, 10 l > 2, we here pu: XQ = 0, y = 1 and divide / = # y into 10 equal parts. For the points of

through a similar

test

.

division,

<

2 10 or

The

we next

test

whether

>

2 10 .

/l

As

.

10*/ 10

lftt

interval

.

<

2 or

.

.

.

yl

is

2,

that

is

to say,

~

whether 10

fc

^

0-4. trial, we shall have to put x^ 0-3, y^ again divided into 10 equal parts, the same pro-

a result of this

xl

>

3 k cedure instituted for the points of division . and, in consequence, x z put ^ -}30 and y a to 31 and so on. This obvious procedure is of course equal to

much

too laborious for practical calculations. 16

The

justification for this

is

provided by Theorems 14 to 19.

3.

Irrational

25

numbers.

we will not say merely: "the nest (/n ) defines the number "(/) is only another symbol for the number $", or in fine, s" the number is exactly as we are used to look upon the decimal "(/n ) or as being fraction 0-333 ... as merely another symbol for the number number itself. the precisely It now becomes extremely natural to introduce tentatively an Consequently,

s" but rather

,

analogous mode of expression with regard which contain no rational number. Thus

to

of intervals

those nests

x n yn denote the numbers constructed previously in connection with the equation x 2 = 2, one might seeing that in the system of rational numbers there is not a single one whose square decide to say that this nest (x n y n ) " determines the "true" "value of V2 though one incapable of being that it encloses this means of rational numbers, symbolised by if

,

=2

\

X

-J

U

Fig.

value unambiguously

in fine,

1.

"it is a

number", or, for brevity, "it is the If (/n ) other case. (x n y n ) is

J

newly created symbol for

number

itself".

And

similarly in

this

every

any nest of intervals and no rational number s belongs to all its intervals, we might finally resolve to say that this nest encloses a perfectly definite value, though one incapable of of it determeans rational numbers, being directly symbolised by one mines a perfectly definite number, though unfortunately non\

it is a existent in the system of rational numbers, for this number, or briefly: is the number itself;

newly created symbol and this number, in contradistinction to the rational numbers, would then have to be called an irrational number.

Here

certainly the Is further justification ?

question

Can

arises:

this

be

done

without

more ado, May we, designate these new symbols, the nests (xn y n ), as numbers? The following considerations are intended to show that to this course there is it

without

allowable ?

\

no obstacle whatever. In the

first

instance, a simple graphical illustration of these facts (see fig. 1) gives every appearance of justification to

on the number-axis our resolution. the

number-axis

If, (e.

by any construction, we have marked a point P on g. by marking off to the right of O the length

26

Chapter

Principles of the theory of real numbers.

I.

O

of the diagonal of a square of side U) then we can in any number of ways define a nest of intervals enclosing the point P. may do so in this way, for instance. First of all we imagine all integers

We

marked on the

^

such that our point exclusive.

are

p

+

P

Accordingly

J =x

interval

Q

k

.

.

(with k

-

.

yQ

=

be exactly one, say

the stretch from

we put x

+

-=

p,

y

10 equal parts

into

0, 1, 2,

p

these, there will be exactly one, say p,

in

lies

=p +

and y^

inclusive

Of

axis.

.

.

kJ

.

,

,

*

.

to

that

exclusive. -y~

P

The

interval

the

of division will again

between x t

lies

(/>+!)

divide

and among them, there

10),

such

-

17

p inclusive p + 1, and The points

p xl

J^

.

k* -[-

.

.

y^

again divided into 10 equal parts, and so on. If we imagine this process continued indefinitely, we obtain a perfectly definite nest (Jn ) all of whose intervals Jn contain the point P. No other point P' besides P can lie in all is

the intervals

Jn

.

For,

if

that were so,

tain the

whole stretch PP', which

intervals

(jn

has length

J

form a

all is

the intervals would have to con-

impossible, as the lengths of the

null sequence.

P

on the number-axis (rational or arbitrarily given point of thus nests intervals there are obviously, indeed, any number not) And in the which contain that point and no other. of such nests For every

i. e. in the graphical representation on the numberpresent instance, the converse appears most plausible; if we consider any nest axis of intervals, there seems to be always one point (and by the reasoning above, only this one) belonging to all its intervals, which is thus deter-

mined by our

it.

We

believe, at

any

rate, that

we may

infer this directly

conception of the continuity, or gaplessness y of the straight line

from

18 .

geometrical representation we should have complete reciprocity: every point can be enclosed in a suitable nest of intervals and every such nest invariably encloses one and only one point.

Thus

in

this

This gives us a high degree of confidence in the adequacy of our which we now forresolve to consider nests of intervals as numbers,

13.

mulate more precisely as follows: Definition. We will say of every nest of intervals (Jn ) or (x n y n ), that it defines or, for brevity, it is, a determinate number. To represent \

17

Instead of 10

detail, see 18

The

postulated of the

we may

of course take any other integer

^ 2.

For furthei

5.

proposition, by which the "continuity of the straight line" is expressly for a proof cannot be here expected, since it is essentially a description

form of our concept of the

Cantor-Dedekind axiom.

straight line

which

is

involved

is

called the

Irrational

3.

numbers.

27

it y we use the symbol denoting the nest of intervals itself, and only as an abbreviation replace this by a small Greek letter, writing in this sense 19 , e. g.

(Jn ) or (xn \yn ) in spite of all

Now,

we have

said, this

a.

cannot but seem a very arbi-

the question has to be repeated most insistently:

trary step,

will

it

These purely ideal objects which we pass without further justification? these nests of intervals (or else that still extremely have just defined can questionable 'something' which such a nest encloses or determines)

we speak of these as numbers? Are they after all numbers in the same more precisely, in the sense in which sense as the rational numbers, the number concept was defined by our conditions 4? The answer can only consist in deciding, whether the totality or aggregate of

yn) ( xn

all

conceivable nests of intervals, or of the symbols (/n ) or

introduced to denote them, forms a system of objects satis4 20 a system therefore these conditions to recapitulate these fying whose elements are derived from the rational numbers, conditions briefly r

<*

\

;

and

1. are capable of being ordered; 2. are capable of being combined four at the same time the fundamental the processes (rules), obeying by laws 1 and 2, I IV; 3. contain a sub-system similar and isomorphous

system of rational numbers;

to the

and

4. satisfy

the Postulate of

Eud-

oxus. If

well; acter,

and only if the decision turns out to be favourable, all will be our new symbols will then have vindicated their numerical charand we shall have established that they are numbers, whose

we

totality

Now

then designate as the system or set of real numbers. the decision in question does not present the slightest shall

diffi-

and we may accordingly be brief in expounding the details: are certainly or our new symbols (x n y n ) Nests of intervals constructed by means of rational number-symbols alone; we have there4. For this, we shall go to work in fore only to settle the points 4, 1 culty,

\

the following way:

Certain of the nests of intervals define a rational

something, therefore, for which both meaning and mode of We consider two such combination have been previously established.

number

21

,

rational- valued nests, say (x n

the

yn )

s

and (xn

f \

yn ')

=

s'.

With the two

we can immediately distinguish whether first s is <, = or > the second s'; and we can combine the two by four processes of arithmetic. Essentially, what we have to do is to

rational

the

\

number-symbols

s

and

s',

endeavour directly to recognise the former fact, and to carry out the latter processes, on the two nests of intervals themselves by which s and s' were 19

<7

is

20

The

81

We

an abbreviated notation for the nest of intervals ( /n ) or (xn y n). reader should here read these conditions through again. will describe such nests for brevity as rational-valued. \

28

Chapter

Principles of the theory of real numbers.

1.

given, and finally to extend the result to the aggregate of all nests of intervals. Each provable proposition (A) relating to rational-valued nests will ac-

cordingly give rise to a corresponding definition (B). We begin by setting down concisely side by side these pairs of propositions (A) and definitions (B)

14.

22 .

= 5 and (x n s = holds

Equality: A. Theorem. If(x n \y n ) rational-valued

nests

of

intervals,

then

s'

f

=

s' are two \y n ') and only if, if,

besides

*n

we have

^ yn

23

and xn <^ yn ' 9 '

for every n.

On

theorem we now base the following:

this

B. Definition. a .=

f

(x n

|

y n ')

Two arbitrary nests of intervals are said to be equal if and only if

cr

and

(# n |j> n )

or every n.

Remarks and Examples. ' on the one hand, y n and y n on the other, need of course have nothing whatever to do with one another. This is no more surg'A, prising than that rational numbers so entirely different in appearance as 375 should be referred to as "equal". Equality is indeed something which and

The numbers xn and

1.

\n

'

,

22

The import

of proposition and definition should in each case be interpreted number-axis. 23 Into the very simple proofs of the propositions 14 to 19 we do not propose to enter, for the general reasons explained on p. 2. They will not present the slightest difficulty to the reader, once he has mastered the contents of Chapter II, in relation to the

whereas at this stage they would appear to him strange; as exercises in that chapter. Merely as a specimen and

we

of those problems,

=

moreover they will serve example for the solution

prove Theorem 14: we have both xn ^ $ ^ yn and xn

will here

^ ^

'

'

s y n y whence at for n. y^ ' every s' must hold. For if we had b) If conversely xn 5$ yn for every n, then s x n ) is a null sequence, we could so choose s' s 0, then, since (yn s', i. e. s the index p, that

a)

once, x n

If s

< yn

'

then

s' t

and xn

'

^

^

>

>

yp

As however

-

s is certainly

xp

<s

^ yp

s/

this

,

r

XP

-

s

>

'

would imply xp

y* s'

-

*

>

0.

We

could therefore

choose a further index r for which

- */ < * imply y r < x^

y/ Since x r

'

^

$',

this

would

'

s'.

Choosing an integer

m

exceed-

p and r, we could deduce, in view of the respective ascending and descendwhich coning monotony of our sequences of numbers, that a fortiori ym < xm tradicts the hypothesis that xn ^ y^ for every n. Thus s ^ $' is ensured. By interchanging throughout the above proof the accented and non-accented ' < yn for every n, then s' ^ s letters, we deduce in the same manner that if xn ' then s ~ s If then we have both x n ^ y n and x n y n holding for every ing both

'

,

'

,

necessarily follows.

Q. E. D.

Irrational

3.

is it

numbers.

29

not fixed a priori, but needs to be established by some form of definition, and perfectly compatible \vith marked dissimilarity in a purely external aspect.

i>

The two

2.

nests

I

anc* *^

)

3

^

~ are ctl ua l

m

accordance with

our present definition

By

3.

we may

14,

denoting

In particular,

s.

4.

-

f

xn

< xm

|

=

0)

--=

s

(s

J left

\

and

s),

the latter symbol

their right

endpomts

0.

for

|

y n '), xn

for every

then

feast

we

//,

yn ) s',

=s

if

f

and (x n y n ') and only if

s'

are

\

f

xn 5^ y n for every

but not

;/,

one M.

Given any two nests of intervals a shall say a o-', if

=

(x n

\

y n ) and

<

'

for every

for at least one m,

\

<

'

<**

f yn

If (x n then we have s

nests,

^ yn

r

(x n

e.

(0

Theorem.

B. Definition.

i.

=

-\-

,

two rational-valued

a

s

ha\e both their

w/ remains to establish but the proof is so simple that vve will not that (cf. Footnote 23), in consequence of our definition, we further 7 a (Footnote 24), b) a -= a' always implies a' = a, and c) a a a' a"

Inequality: A.

-

(s

= a".

involve a

e y>n

e. g.

intervals

It still

go into it have a) a

*

write

whose

a nest all of

ym

--

;/,

xn

but not

'

^ y n for every n,

x m '.

Remarks and Examples. 1. It is clear that by 14 and 15 the totality of all conceivable nests is ordered. 7 a or, for at least For if a and a' are any two of them, either there is equality, a 7 ' one p, we have y v <* .Vj/, implying a < a or finally, for at least one r, y r < .v |f The last two cases cannot occur simultaneously, since, for m implying a' < a. greater than r and />, we should then have, a fortiori, v ?// <. v ', which is impossible. Thus between a ard a' one and only one of the three relations ,

,

7/1

always holds, and the totality of these new symbols is thus ordered by 14 and 15. 2. Here again it would have to be established in all detail that the laws of order 1 continue to hold good with the adopted definitions of equality and inequality. Taking as model the proof in the footnote to Theorem 14, this presents so few essential difficulties that we will not enter into it further: The laic* of order do, effectually^ all remain valid. 3. In consequence of 14 and 15 we now have, therefore, for every n An

What does

this

mean

r

It

means

<

c

yn

.

that each of the rational

cordance with 14 and 15, not greater than the nest a 24

~

(x n

numbers xn \

yn). Or:

is,

if

in ac-

we

con-

Here it may be clearly recognised that this "law" is by no means trivial: has indeed to be proved that with the given definition of equality every nest of intervals is effectually "equal" to itself, that is to say that the conditions of that definition are fulfilled, when the same nest is taken for both of the nests of intervals it

which we are comparing.

15

30

Chapter

any particular one of the numbers x n> say x p and denote

sider

then

Principles of the theory of real numbers.

I.

it

,

we may

Rem.

write (see 14, (v ;)

-

x

-)

for brevity

by

x,

3)

x

-

-

x

+ j

or

-

f

(x

x)

|

and our statement takes the form

<.!*,).

(*!*)

We may

prove

it

as follows.

If

it

yr and so a fortiori,

m

if

were not

<

i.

x,

greater than r

is

<

Jn

one

r,

< x^

y

*m.

In the same

certainly cannot be the case.

ingly, a is to be regarded as lyin^ between

tained within the interval

yr

and p

ym which

true, then for at least

e.

way we

<

see that a

x n and y n for each

yn Accordother word*, v con-

n, in

.

.

The fact that no other number a', besides a, can possess the same property If in fact there were a second nest of intervals a' is now easily proved. (\ n y n ') we also had x p ^ a' < y p then the left hand such that for every definite index '

-

\

/>

,

'

y n ') and so, by 14 inequality means, more precisely (cf 3), that (v^ v p ) r^ (v n ' and 15, xp ^ y n for every n. Since this must hold in particular for // p, we deduce x9 ^1 y v for every p, which signifies, by 14 and 15, that a ^ a'. In the same manner the right hand inequality is seen to imply that a' jj <* Thus necesa', which was what we set out to prove. sarily a 4. By 15, a is > 0, i. e. "positive", if and only if (x n y n ) > (0 0), that is to say, if for some suitable index p, xv > 0. But in this case, as the .v w s increase for every n > p. We may therefore* say a with n, we have a fortiori x n ^ (vn yn ) is positive if, and only if, all the endpomts ,vw y n are positive from and |

|

'

\

|

f

:

,

|

If

5.

=

a' '

>

0,

exact analogue holds of course for a 0. ' p, x n > 0, let us form a new nest (xn y n ') ' *V-i all equal to x p but every other xn and

^

and, for every n

by putting x

x\

.

\

.

.

,

xn and yn By 14, obviously a a'; and we may then there are always nests of intervals equal to it, for which the endpoints of intervals are positive. The exact analogue holds for a < 0. to the corresponding

yn equal say: all

or

<

The

after a definite index.

.

If a is positive,

So

them, our nests

far then, in respect of the possibility of ordering

of intervals It is

pletely.

may be

said to vindicate their character as

no more

difficult to establish

numbers com-

a similar conclusion with regard

to the possibilities of combining them.

16.

Addition: A.

Theorem

2r> .

If (x n \y n ) and (x n '\y n

f

)

are any two nests

+ yn w also one, and if the former are both and = s\ then the latter also rationalrational-valued and respectively = valued, and determines the number s + B. Definition. If (x n yn a and (x n y n ~ &' are any two nests of intervals and a" denotes the nest (xn + xn y n + y n deduced from them, then we write a" = a + a' and a" called the sum of a and a'. of intervals, then (x n

+ #n

'>

yn

')

s

is

s''.

f

\

)

\

',

ts

18

With regard

to the proof, cf. footnote 23.

')

')

Irrational

3.

numbers.

31

Subtraction: A. Theorem. If (xn yn ) is a nest of intervals, then so 17. x n ); and if the former is rational-valued s, then the latter yn ( s. also rational-valued, and determines the number \

is

|

is

B. Definition.

If a

note the nest of intervals

(

= (xn yn

yn )

\

is

nest of intervals

any

x n ) we

and

a' de-

write

t

\

= -a

a'

and say v is the opposite of cr. By the difference of two nests of intervals we then mean the sum of the first and of the opposite of the second. Multiplication: A. nests

positive

of

Theorem.

If(x n

replaced,

intervals,

\

y n ) and (x^ y n ') \

if necessary,

are any two

accordance

(in

18.

with

15, 5) by two nests of intervals equal to them, for which all the endpoints r then (x n x n \y n y n ') of intervals are positive (or at least non-negative), is

also

a nest of intervals; and if the former are rational-valued and respec-

and

s

tively

number

s

=

then the latter

s',

is

also rational-valued,

and determines

the

s'. f

r

B. Definition.

a and (x n y n ) a are any two If (x n y n ) positive nests of intervals for which all the endpoints of intervals are positive and a" denote the nest (x n xn \y n y n ') which is no restriction, by 15, 5 \

\

'

we

derived from them, then

write

=
a" and

call o-" the

The

^product

of a and

cr'.

which have

slight modifications

be made

to

in this definition if

are negative or zero, we leave to the reader, and henceforth consider the product of any two nests of intervals as defined.

one or both of a and

Division: A.

or'

Theorem.

// (x n

\

yn )

for which all endpoints of intervals are positive,

and

if the

former

and

valued,

is

determines the

B. Definition. which

rational-valued,

number

If (x n

\

=

(cf.

s,

positive nest of intervals

15, 5) then so

the latter

is

is (

Vn x n'J;

also rational-

-.

yn)

all endpoints are positive,

and

any

is

=a

and

is

any

positive nest of intervals for

a' denote the nest

(-\y n

),

then

we

xj

write

and say

a' is the reciprocal of a. By the quotient of a first by a second positive nest of intervals we then mean the product of the first by the reciprocal

of the second.

The

slight modifications necessary in this definition, if

case) or the

second of the two nests of intervals

a

(in the

one

(in the other) is negative,

19.

32

Chapter

I.

Principles of the theory of real numbers.

we may

again leave to the reader, and henceforth consider the quotient of any two nests of intervals of which the second is different from 0, as a defined. If (x n y n ) 0, then the above method fails to produce

=

\

a "reciprocal" nest: division by is here also impossible. The result of the preceding considerations is thus as follows:

By

14 to 19, the system of all nests of intervals is ordered in the sense of 4, 1, and admits of having its elements combined by the four processes in the sense of 4, 2. In consequence of the theorems 14 to 19, definitions

as stated in each case, this

system possesses further, in the aggregate of a sub-system, similar and isomorphous to the system of rational numbers, in the sense of 4, 3. It remains to show that the system also fulfils the Postulate of Eudoxus. But if (x n y n ) a and all rational-valued nests,

(x n

=

~v yn)

I

\

two

are any

which

positive nests for

tervals are positive (cf. 15, 5), let

f

xm and ym be a

all

endpoints of in-

definite pair of these

the theorem of Eudoxus ensures the existence of an integer which p xm > ym ', and the nest p a, or (p x n p y n ), in accordance

endpoints; p, for

\

with 15,

>

then effectually a'. next step should be to establish in

is

The

2) that the four processes defined in

This again

14, 4

and 15,

intervals

obey

not the slightest difficulty and will accordingly spare ourselves the trouble of setting it forth 26 The

the fundamental laws 2.

we

all detail (cf.

16 to 19 for nests of offers

.

Fundamental Laws of Arithmetic, and thereby

the entire

body

of rules valid

in calculations with rational numbers, effectually retain their validity in the

new

system.

our nests of intervals have

finally proved themselves in in the be numbers sense of 4: The system of all every respect nests of intervals is a number-system, the nests themselves are numbers 27

By

this,

to

.

26

As

regards addition, for instance,

Addition can always be carried out.

b)

The

tion.)

a

-f-

it

a)

a1

r

\-

result is unique; r' ,

if

the

i.

sums

e.

are

should be shown that: (This follows at once from the defini-

a a', T = T' (in the sense of 14) imply formed in accordance with 16 and the test

for equality carried out in accordance with 14. be shown further that c)

a

d) fe

+T=T a + a) + T = < a' implies -f-

In the corresponding sense,

it

should

always. g

-|-

+ <

(o-

T) always.

a -\- T a' 4* T always. And similarly for the other three processes of combination. 27 Whether, as above, we regard nests of intervals as themselves numbers, or imagine some hypothetical entity introduced, which belongs to all the intervals n (cf. 15, 3) and thus appears to be in a special sense the number enclosed by the nest of intervals and, consequently, the common element in all equal nests this at bottom is a pure matter of taste and makes no essential difference. The equality a -- (xn y n ) we may, at any rate, from now on, (cf. 13, footnote 19) read indifferently either as "a is an abbreviated notation for the nest of intervals (xn yn )" 9 or as "a is the number defined by the nest of intervals (xn y n)". e) a

J

\

\

\

Completeness and uniqueness of the system of

4.

real

33

numbers.

This system we shall henceforth designate as the system of real numbers. an extension of the system of rational numbers, in the sense in which the expression was used on p. 11, since there are not only rationalvalued nests but also others besides. This system of real numbers is in one-one correspondence with the whole aggregate of points of the number-axis. For, on the strength of the considerations set forth on pp. 24, 25, we can immediately assert that to every nest of intervals a corresponds one and only one point, namely that common to all the intervals /n which on account of the CantorDedekind axiom is considered in each case as existing. Also two nests of intervals a and cr' have, corresponding to them, one and the same point, if and only if they are equal, in the sense of 14. To each number cr (that is to say, to all nests of intervals equal to each other) corresponds exactly one point, and to each point exactly one number. The point corresponding It is

,

manner

in this

to a particular

number

is

called its image (or representative)

point, and we may now assert that the system of real numbers can be uniquely and reversibly represented by the points of a straight line.

Completeness and uniqueness of the system of real numbers.

4.

Two

Our starting point in doubts remain to be dispelled 28 3 was the fact that the system of rational numbers, by reason of its "gaps", could not satisfy all demands which would appear in the course last

:

of the elementary processes of calculation. Our newly created numberZ for the as we will call it is in this respect brevity system system certainly

more

Yet the

possibility

gaps

efficient.

like the old,

E. g.

it

contains

29

a

not excluded that the

is

some other way

or that in

number a for which cr2 2. new system may still show it

may be

susceptible of

still

further extension.

Accordingly, we raise the following question: Is it conceivable that a system Z, recognizable as a number-system in the sense of 4, and containing all the elements of the system Z, should also contain additional elements distinct

these?

from

28

Cf. the closing

29

For

=

*

words of the Introduction

(p. 2).

intervals constructed on p. 20 2 with the equation A? 3 = 2, then by 18 we have a a (x n yn *). Since, 2 2 2 2. Q. E. D. however, # n < 2 and y n > 2, it follows that a 80 I. e. Z would have to represent an extension of Z in the same sense as itself represents an extension of the system of rational numbers. if

CT

(x n

|

y n) denote the nest of

in connection

=

\

Z

34

Chapter not

It is

cannot be so, so that

difficult to sec that this

fact the following

Theorem

20.

Principles of the theory of real numbers.

I.

we have

in

theorem:

The system

of completeness.

/,

of all real numbers

in-

is

capable of further extension compatible with the conditions 4.

Proof: contains

all

Let

Z

be a system which satisfies the conditions 4 and If a denote an arbitrary element of Z,

the elements of /.

in which we choose for ft the number 1, contained in Z, then 4, 4 shows that there exists an integer p and also, therefore, in Z a, a. For these 3l we have and similarly another p' p' < a < p. p' Considering successively the (finite number of) integers between and />, starting with - />', we know that we must come to a last one which

>

>

^

is still

If this

a.

be called

g,

then

+

1 the method, already reg By applying to this interval g peatedly used, of subdivision into ten parts, a perfectly definite nest of And a repetition word for word of the intervals (x n y n ) is obtained. .

.

.

\

<

3 shows that the number thus defined can neither be

in 15,

proof

>

nor

Every element of / is therefore equal to a real number, so that Z can contain no elements other than real numbers. A final objection might be this: We have succeeded in forming the system Z in a comparatively natural, but after all an arbitrary, manner. Other measures, obviously, might be adopted for filling up the gaps in a.

the system of rational numbers. (In the very next section we shall come It is conceivable that across other, equally ready means to this end.) a different method would lead to other numbers, i. e. to number-systems

more or

differing, in

by

The

us.

less essential particulars,

question thus indicated

may be

from the one constructed given a precise formulation

as follows:

Let us suppose that we have somehow,

starting with the system

of elements of rational numbers, succeeded in constructing a system as is the case with our which, besides still satisfying the conditions 4, <

and therefore deserving the name of a number-system, also system Z, fulfils a further requirement, usually referred to as the Postulate of

completeness, on account of Let (x n with x n shall

|

,

the

yn) y n in

rn

accordance with 4, 3; the stipulation then runs thus: least one element # satisfying, for every n the con-

^ ^ cs

*)

At

y

n.

In exact form, our problem [

the

contains elements, corresponding to the rational numbers. be any nest and let \ n and n be the elements of associated

always contain at

ditions

On

theorem proved above.

^

strength of 4, 3,

this point, the Postulate of

is

now: Can such a system

Eudoxus gains

its

<5 differ in

axiomatic significance.

Completeness and uniqueness of the system of

4.

real

35

numbers.

any essential particulars from the system Z of real numbers, or must the two systems be regarded as substantially identical, in the perfectly definite sense that they can be brought into relation as similar and isomorphous to

one another?

The theorem stated below, by solving this problem in the sense which we should anticipate, closes the construction of the system of real numbers.

Theorem and isomorphous

of Uniqueness. to the system

Every such system

Z of real numbers

&

is

necessarily similar

as constructed by us.

Essen-

only one such Proof. By 4,

system therefore exists. contains a sub-system <', which is similar and 3, to the isomorphous system of rational numbers contained in Z, and whose elements may therefore be called, for short, the rational elements of ^ tially,

If

a

(x n

\

tion, in ??

is any real number, 5 rnust, according to our new stipulaan element a, which for every n satisfies the conditions

yn)

contain

^ Wn

*

if n and n numbers x n and y n

rational

\

are the elements of

\j

S

corresponding to the

.

Also, these conditions define

g

uniquely.

For

a second element

if

^

$ <* /, simultaneously with *, satisfied the conditions \ n n for every then it would follow, word for word as in the proof of 12, that for every n \^

,

i.

^

e.

the non-negative one of the two elements

&

$'

and

$'

.

an arbitrary positive rational number, and for the corresponding element in > (therefore in 5'); then, on account of the similarity and isomorphism of >' with the system of rational numbers, we must xp v holding r, the relation have, simultaneously with y p p r^ Let

r stand for

i

<

for a suitable index p.

If therefore tj

For every such

<

\j

r therefore

denotes one particular such

i

and

if r n ,

n

=

1, 2,

.

.

.

,

denotes the element (certainly present in >', by 4, 2) which, when repeated n times, yields the sum r lf we see, after writing down the above inequality

=

for r

vn

and adding

to itself n times, that for every n

it

n |

must

also hold.

that

= If

Since, however,

number

cr,

to it

associate

becomes

and isomorphous such a system 5* is n

similar

$' |

1,

2,

.

.

.

,

^ t!

satisfies

the postulate 4,

4, it

follows

*'.

we proceed

the real

d

=

to t

this

uniquely defined clement

clear that

the system susceptible

/,

g

and

contains a sub-system 5* $ of all real numbers. That

of further

extension compatible

21.

36

Chapter

Principles of the theory of real numbers.

I.

with the conditions 4, but must be identical with

cij),

was the import

of the previously established theorem of completeness. Thereby, it is to one another, an d %, similar and arc that 5 isomorphous proved

and therefore may be regarded,

Z

of

all real

numbers

in all essentials, as identical:

Our

system

in all essentials the only one possible satisfying both

is

4 and the postulate of completeness. After these somewhat abstract considerations, the main result of our

the conditions

whole investigation may be summarised

as follows:

numbers with which we are familiar, there exist Each of them may be enclosed irrational numbers.

Besides the rational others, the so-called

(determined, given, in

many

.

.

by a

.)

These

ways.

suitable nest of intervals and this indeed

irrational

numbers

in

fit

consistently with the

numbers, in such a manner that the conditions stated in 4 are by the joint system of all rational and irrational numbers, with

rational fulfilled

which, to be brief, all calculations may be effected, formally^ exactly as with the rational numbers alone, but with greater success.

This wider system is moreover incapable of any further extension compatible with conditions 4, and is in all essentials the only system of

symbols which

satisfies these conditions

4 and

also the postulate of

com-

pleteness.

We It

call it the system

of real numbers.

with the elements of this system, with the real numbers\ that

is

We

we work (at real number either

it

first exclusively) in the sequel. consider a particular as given (known, determined, defined, calculable, if .) a rational number and so can be literally written down with

is

.

the help of integers

.

inserting if need be a fractional bar or a minus we are given 32 a nest of intervals

or (and this holds in any case)

sign

defining the

We

number.

shall very

soon see, however, that

many

other ways and means,

besides the nests of intervals, exist, for defining a real number. In proportion as such ways become known to us, we shall widen the above-

mentioned conditions, under which we consider a number 32

the

I. e.

manner

by the complete just described*

explicit specification of the

as given.

(rational)

endpomts

in

Radix fractions and the Dedekind section.

5.

Radix

5.

A

fractions

and the Dedekind

37

section.

few of the methods for defining real numbers may be mentioned important from the points of view of both theory

at once, as particularly

and

practice.

In the

\

need not always be given in it may often be written in a more considered by us Thus, as we have already seen, a decimal fraction,

place, a nest of intervals

first

the form (x n

y n)

;

convenient form. e.g. 1-41421

.

.

.

may be immediately

,

interpreted as a nest of intervals,

with the assumptions

=l-4; #a=l-41;

1

ar

=

3

1-414;

...,

and, generally, x n equal to the decimal fraction broken off after the if" digit; y n being derived from x n by raising the last digit by one, 1

i.e.

--

yn

xn a

represent intervals

-f-

yw

-

1(

Practically,

peculiarly

clear

we may

thus say that decimal fractions

and convenient specification of nests of

33 .

It is obviously quite an unessential part that the base or radix 10 of the ordinary scale of notation plays in this connection. If g is any the exact we have for a scale of in analogue integer ^ 2, fractions To begin with, given a real radix g or radix fractions with base g.

number

o-,

an integer

p (>, =,

or

< 0)

is

uniquely defined by the

condition

p^cr The


|-1.

yo between p and p -f- 1 is next divided into g equal and each of these parts considered both hero and similarly

interval

parts,

as including its left endpoint, but not its following steps cr Then one. belongs to one, and to one only, of these parts, right i. I the numbers there is one and e. 0, 1, 2, g among in

the

.

which we only one for which #!

33

The drawback

of the digits,

i.

e

to

shall

it

is

call

that

for

.

.

,

brevity a

we can seldom

the law of formal ion of the

.v

"digit"

and denote by

perceive the law of succession w 's and >' n 's.

38

Chapter

The

/

interval

and a

x

Principles of the theory of real numbers.

I.

thus defined

we proceed

to divide again into

and

will, as before, belong to one,

g equal

parts,

one only, of these parts,

to

i.

e.

a definite "digit" x 2 will be found for which

The

interval /2 thus defined we proceed to divide again into g equal parts, and so on. The nest of intervals (/n ) (x n \y n ) determined by this profor which cess,

=

*

g

44+ + g f *

4+ gn - +

--- 4-

--"=*

zn

l

(n

number cr, so that M a of decimal fractions we may now write clearly defines the

o

----

p

(#

O-*!

I

|

=

1, 2, 3,

.

.

.)

But on the analogy

jy w ).

.

where of course the base g of the radix

fraction

must be known from

the context.

We

have therefore the

Theorem

22.

tially only one

We tation,

35

mention the following theorem relating further to

but shall make no use of

Theorem

31

Xn

<*"

yn

Every real number can be represented in one and way by a radix fraction in the scale of base g.

1.

2.

That we have

^ yn _

1

it

this represen-

in the sequel:

The radix fraction for a real number a

a nest of intervals

throughout, and

is

-

vn

yn

essen-

whatever be

immediately obvious, since xn _ 1

<

n forms a null sequence, by 10,

7.

The slight alteration in our method, required if all the intervals are considered as including their right and not their left endpomts, the reader will doubtless be able to carry out for himself. The two results differ if, and only if, the given r>

number a

is rational, and can be written as a fraction having, as denominator, a power of g so that the point a is an endpoint of one of our intervals. Actually the two nests of intervals t

p

-f

0-afi ar,

.

.

.

*r_i

(~r

~

J)

(g

-

1)

(#

-

1)

where the digit z r is supposed ^ 1, are equal by fractions which are not identical are unequal, by for himself that, except a radix fraction with base

m g

and 14. 14.

/

-I-

O^

absolutely unique.

.

.

.

*,._,

zr

00

.

.

.

,

In every other case, two radix The reader will easily prove

this case, the representation of is

ar t

any

real

number

a as

5.

the chosen radix

a

g

2g 2

will

prove periodic (or recurring)

rational**.

is

39

Radix fractions and the Dedekind section. if

and only

if

=

A

2 ; the promake is often g particularly advantageous choice to the method of a is then called number the cess for expressing briefly in that case can whose radix the bisection and fraction, digits resulting

only be

or

more general

1, is

called a binary fraction.

light,

is

we

this:

start

The method,

from a

in a

definite interval

somewhat

/

and, in

accordance with some particular rule or point of view, definitely select one of its two halves, calling it J\ we then again make a definite choice

and so on. By so doing, we lf calling it / 2 ; a in real well-defined number, determined with abevery case, specify,

of one of the two halves of

y

solute uniqueness by the method which regulates at each stage the choice between the two half- intervals 37 .

In radix fractions, just as in decimal fractions, we accordingly see a peculiarly clear and convenient mode of specifying nests of intervals. shall accordingly in future

They

be admitted for the definition of

real

numbers on the same footing as decimal fractions. The distinction lies somewhat deeper between nests of intervals and the following method of definition of real numbers. We suppose given, in any particular way as two classes of numbers A and B, subject to the following three conditions: 1) Each of the two classes contains at least one number. 2) Every number of the class A is 5^ every number of the class B. 3) If an arbitrary positive (small) number e is prescribed, then two a say, from A and numbers can be so chosen from the two classes, 39 that b', say, from B, ,

',

a

b'

Then

<

e.

the following theorem, holds :

Here for simplicity we regard terminating radix fractions as periodic with That every rational number can be represented by a recurring decimal fraction was proved by J. Walhs, De Algebra tractatus, p. 3<>4, 1G J3. That conversely every irrational number can always, and in one way only, be represented as a nonrecurring decimal fraction was first proved generally by O. Stolz (Allgememe Anth30

period

0.

(

metik

I, 37

88

p. 119,

1885).

An example was E. g.

A

given in 12, 2. contains all rational numbers whose cube

numbers whose cube

is

>

is

<

5,

B

rational

all

5.

30 \y e sav for s hort: the numbers of the two classes approach arbitrarily near to one another. In the example of the preceding footnote, we see at once that conditions 1) and 2) are satisfied; that 3) is also satisfied we recognise from the possibility of calculating (by the method of partition into tenth parts, for instance) two decimal fractions ,v n and y n with n places of decimals, differing only by a unit

in the last place,

and such that xn 3

<

5,

* yn >

5;

n being so chosen that

.

, (

n

<

e.

40

Chapter

Theorem

exists one and only one real number a such and every number b in B the relation

There

3.

for every number a

Principles of the theory of real numbers.

I.

A

in

that

a-^v^b is

true.

always

Proof. It is again obvious that no two different numbers cr,
|

^

>

respectively, contrary to condition 3. There exists then at most one

such number

We

a.

find

it

in the

A

and following way: By hypothesis, there is at least one number a l in 6 X then the common value is manifestly one number b in B. If a If a l 4= b ly and therefore by the number a which we are in search of.

=

,

^

numbers x l f^ a ly and y bl 2), a l < b ly then we choose two rational and apply the method of bisection to the interval /l which they determine; we denote the left or right half by /2 according as the left half By (endpoints included) does or does not still contain a point of the class B. the same rule we next select one of the halves of /2 calling it /3 and ,

,

,

so on.

The bisection,

intervals

/ /2 1?

,

.

necessarily form

.

.

(

From

their

./,

.

.

.

being obtained by the method of

,

A)

=

(x n

I

y n)

=*

mode

no number of

number of

,

a nest

A

of formation, they possess moreover the property that lie to the left of any of their left endpoints, and no to the right of their right endpoints.

B

can

this it follows at once that the number a enclosed by them number required by theorem 3. In fact, if, contrary to the assertion a > 0, in that theorem, a particular number a of A were > cr, so that a then we could choose from the succession of intervals Jn a particular one,

But from

is

the

sa Y /i> -~

XP

ypy Wlt h length


a.

Since xv 5g a

^ yp

,

this

would

imply

yp

or

<;

y9

xv

<. a

a,

i.

e.

y9

< a,

A

lies to the right of the right endpoint whereas, actually, no point of on in of If the other hand, cr, it would similarly any instance, b yp yp xqy whereas actually no point of follow that for a suitable index q, b

<

.

<

B

J

the left of the left endpoint of an interval q Hence we must ina u have b. Q. E. D. fg variably As a special corollary, we have the following theorem, which supplements Theorem 12, forming an extension of it to the case when the lies to

.

^

numbers there occurring are

numbers.

we

25 of next paragraph.

arbitrary real anticipate the obvious definitions 23

In the formulation,

Radix fractions and the Dedekind section.

5.

Theorem

4-

If (x n )

is

a monotone ascending, and (y n ) a monotone desx n <^ y n for every n, //, further,

cending, sequence of (any) real numbers

and

the differences

xn

yn

41

dn form a

;

then there

null sequence-,

is

invariably

one and only one real number a, such that for every n

We

then say, as before

a nest of intervals (x n

(cf.

Definition 11), that the two given sequences define that a is the number which it (uniquely) deter-

y n ) and

\

mines.

Proof.

If with all the left endpoints

x n we constitute a

class

A,

the right endpoints y n a class #, of real numbers, these clearly satisfy conditions 1) to 3) of Theorem 3, from which the correctness of the above statement at once follows.

and with

all

Remarks and Examples?. Instead of

1.

3),

is

it

more convenient

often

number should belong either

rational

to

A

or to

to stipulate that e.g.

B

(as

\\as

the

case

every the

in

In fact, in that case, since rational numbers arc example of last footnote). dense on the number axis, the requirement 3) is fulfilled of itself. To see this, we have only to imagine the \\hole number-axis subduidcd into equal portions of length < e/2. Now consider any one of the portions containing an element from A, and, to the right of it, take another portion containing an element from B together with these two portions, take the finite number of portions, if any, between them. One of these considered portions must be the first of them to contain an element b from B. Either this particular portion, or the preceding one, will contain an element a ^ a from A, and we have b ,

.

A

often

It is

2.

still

more convenient

to divide

till

real

numbers

into tsvo classes

In that case of course 3) is, a fortion, also satisfied of itself. 3. If the two classes A and B are given in one of the last-mentioned ways, then we say that a Dedekind section, is made in the domain of either rational or 10 The someuhat more general specification of real numbers, as the case may be two classes ll involved in our theorem 3 \\i\\ also for brevity be termed a section and denoted by (A B). Our theorem 3 can then be stated briefly in the form: A section (A B) invariably defines a determinate real number. And its proof consists simply in pointing out that the specification of a section carries with it the specification of a nest of intervals, which furnishes a number a with the properties required.

and B.

.

\

\

Seeing then that every section immediately provides a definite nest of we shall henceforth regard sections as permissible means of defining also, we now write, if the section (determining, specifying, .) real numbers; (A B) defines the number a, 4.

intervals,

.

.

|

(A\B) 40

Cf. p.

41

This was given

1

,

footnote

Vol. 35, p. 209, 1897.

a.

0.

in

the above form by A.

C\it>elli %

Giornale

di

Matematici,

42

Chapter

The

I.

Principles of the theory of real numbers.

of course equally true and even more easily proved. Given consider all left endpoints xn as forming a class A, and right endpoints a class B, and these two classes evidently furnish a section, which defines the same numher a as the nest itself. nest can accordingly be regarded as a particular kind of section. (>. By our last remark, the method of sections (for the definition of real numbers) is superior in generality to that of nests. It is also quite as convenient from the intuitional point of v lew. For if we take, say, the section (A B) in the somewhat more special form, mentioned in 2, of a section in the domain of real numbers, then what our theorem implies is this. If we imagine all points of the and B, thinking e. g. of points of the number-axis separated into two classes one class as marked black and those of the other as white; and if, when this is done, (I) there is at least one point of each kind, (2) every black point lies to the left of every white point, and (3) every point on the number-axis is effectually coloured either black or \\hite, then the t\\o classes must come into contact at a perfectly definite place, and to the left of this place all is black, to the right of it all 5.

a nest (x n

\

converse

yn)

=

cr,

is

we can

A

\

A

is

\\hite.

We

must take

care, however, not to accept the illustration just given as not already with the help of nests of intervals invented the class of real numbers, our theorem could not be proved at all any more than it could be proved that every nest defines a number. We simply agreed and were amply to regard every nest as a number. In exactly the same justified by the result and this is actually the course followed by JR. Dedekmd 42 way we can agree to regard every section in the in his construction of the system of real numbers domain of rational numbers as a "real number" and we should then, exactly as in our investigations in 3, only have to examine whether this is permissible; i. e. we should have to make sure whether the totality of all such sections (A Z?) forms which is not more difficult than a number system in the sense of conditions 4 the analogous investigations carried out in 3. 7.

a proof.

Had we

,

\

and for the present exclusively real numbers Henceforward form our working material. We may even, if we please, drop the word "real": For the present, "number" shall invariably mean a real number.

Exercises on Chapter

I.

1. From the fundamental laws 1 and 2 deduce the most important of the further arithmetical rules, e. g. (a) the product of two negative numbers is positive; -= b ; (c) for every a we have a c invariably implies a b (b) a .+ c

<

<

+

;

etc.

2.

When

in 3, II,

4 are the signs of equality correct?

3. Express the following numbers as binary and as ternary fractions in scales of notation of which the bases are respectively 2 and 3) : 1

3

1

1

42

und

irrationale Zahlen,

and

e.

;

few figures of the binary and ternary fractions for V2, V3,

Stetigkeit

e.

10

2' 8' TV 7' 17

find the first

(i.

Brunswick 1872,

ir

Arbitrary sequences and arbitrary null sequences.

6.

a n __ an

4. In the sequence 6, 7 prove xn

o

t

where a and

2

x -f- 1. (Hint: the sequences (a of the quadratic equation x the same law of formation as the sequence 6, 7.) 5.

Form

the sequence (vn ) of .v

nfl

numbers

axn

---=

-|

A

\

)

W

and

()3

have

)

by the formula

\: 1,

given, for

are the roots

ft

n

43

n _,,

where a and A are given positive numbers and the -- 1, a; (Here a and 1, j3; or are arbitrary. ax and the negative root of the equation x 2 give an explicit formula for x n

terms #, x l 1, 0; 0, 1 denote respectively the positive b ) In each of the four cases

initial j3 -}-

;

.

/2 ... is a sequence of nested intervals (i. e. each contained about whose lengths nothing further is known, then there is at one point which belongs to all the /n 's. 6. If

/

,

/!,

,

in the preceding) least

7.

A

real

number

or

is

irrational, if

we can

find an ascending sequence of if, \\hcn p n stands for

integers (
8. Prove that (v n

|

yn )

is

a nest in each of the following examples:

n

b)

<

A:,

<

3-,

d)

< ^

Xt

<>'!

e)

<

.Y!

<

>'!

g)

<

v,

<

Vi

c)

.....

,

x,

<-

and

for every n

^

1,

v,

,

,.

v nfl

*'r n -

v nM

i

,>' wf i

-

A W -H

-

,

(v w

1 (x n

} (V M

--

,

f Vn).

y n +i

V n ),

V/M

i

^vn .v n

i (V w

,3'nM

y n vn H

h

3'n+i

,

3' w ),

=

2

V, H _,

-f- .v n );

~ VY M r

v/

vn

^

(v nf i

+

3' w

.v w

1

1

:

J

yn );

-- Vw ''Vw

.

3'w+i

Evaluate the numbers defined in examples

and

(a)

and

(g).

(Cf.

problems 91

92.)

Chapter

Sequences of 6.

We

II.

real

numbers.

Arbitrary sequences and arbitrary null sequences.

now resume our

and generalise them 2, be to which there occur arbitrary real numbers. by allowing all the numbers as with rational numbers, Since, with these, we may operate precisely 2 in all of both the definitions and the theorems will, essentials, remain unchanged. We may accordingly be brief. considerations of

44

23.

Sequences of

II.

Chapter

real

numbers.

Definition 1 If to each positive integer a definite real number A:,,, then the numbers .

3,...,

2,

1,

corresponds

are said to form a sequence.

may, of course, also serve here. Similarly, the Remarks We give a few more examples, in which it is not immediately apparent whether the numbers in question are rational or not.

Examples

7,

10

6,

1

12,

retain full validity.

Examples. 0,:W10 Let a i. were obtained in a footnote

1.

digits

.

.

.

xn

equal to the decimal fraction whose first few from the equation 10 l 2; and put

e.

,

(p. 24)

an

-~=

2.

With the same meaning

3.

Apply the method of

n

for

for a, let

=--

xn

1, 2,

;},

.

.

.

=

.successive bisection to the interval

...

/

1,

then twice running the right half, then for the next three Denote steps again the left half, then four times running the right half, and so on. the number 2 so defined by 6 (\\h\t is its value, approxim itely 5 ), and put foi x n taking

first

the

left half,

,

successively,

+*,-*,+;, 4.

-j, +*, -*, +i. -;,

With the same meaning 1

-

b,

+

1

1

b,

for b,

-

*....

-i

put for x n successively,

b*,

,

1

b\

|

1

- b\

1

+

63,

.

.

.

W

T

ith the same meaning for a and 6, let v t b'j the middle point of the stretch 5. between them, i. e. x l J (a f 6); x z the middle point between je and 6, # 3 that between * 2 and a, x4 that between #, and b; i. e. generally, x n+l the middle point between x n and either a or b according as n is even or odd. t

,

t

exists,

1. sequence (x n ) such that the inequality

is satisfied

2.

A

sequence (x n )

All remarks

1

is

said to be bounded if a constant

for every n. is

said to be monotone increasing if

every n\ monotone decreasing,

of

y

A

Definitions:

K

made

in 8

if

and 9

xn

^ xn+1 for every

x n 5^ x n+l for

n.

retain their full validity.

For the meaning of the mark

cf.

the preface, as also later the beginning

52. 2

,

,

Written as a binary fraction, 6

^

01 10001

1 1

10 ...

Arbitrary sequences and arbitrary nyjl sequences.

6.

45

Examples. 1. The sequences 23, 1, 2, 4 and 5 are evidently bounded. Sequence 3 is not bounded, and in fact neither on the left nor on the right; for we certainly have

<

- and therefore

<

6

,

m ^> 2 >

m, and accordingly

,-

<

Terms

m.

K

K

or howof the sequence may therefore always be found, which are > For 5, the boundedness follows from the is chosen. ever large the constant

K

fact that all the

The

2.

terms

between a and

lie

sequences 23,

<

y

b.

and 2 are monotone decreasing: the others are not

1

monotone.

The definition 10 of a null sequence and the appended remarks also remain which the student should read through again carefully unchanged.

A

Definition.

sequence (xn ) shall be termed a

subsequently to the choice

may always is

null sequence

if,

=n

(e)

valid for

any

of an arbitrary positive numbers, a number nQ

25.

be assigned, such that the inequality 3

fulfilled for every

n

>

.

Examples. 1.

The sequence which

real a, for 2.

n

.

>

23, 2

is

|

a

\

23,

<

1 is

a null sequence, for the proof 10, 7

is

1.

also a null sequence, for here

|

xn

\

<

n

,

therefore

<

e,

provided

1 .

e

these will later on play a dominating part of quite simple theorems, which will be continually applied in The following two, in the first place, the sequel, will also be proved here.

For null sequences

a

number

are obvious enough:

Theorem x ( n')> or,

for

1.

is

If (xn )

a

null sequence

and

the terms of the sequence

wery n beyond a certain value m, satisfy the condition

\

xn

f \

^

|

xn

\

9

more generally, the condition \

in which

K

sequence. 3

is

an arbitrary

(Comparison

Xn '\^K-\xn \, then

(fixed) positive number,

xn

'

is

also a null

test.)

Given any positive real number e, a positive rational number e' < e can be in fact, by the fundamental law 2, VI, we can find a natural number

designated;

n

>

,

and

e'

satisfies

the requirements.

From

this

it

follows that, for rational

sequences, the above definition is equivalent to the definition 10, in spite of fact that only rational e were allowed there.

the.

26.

46

Proof. and

>

e

|

The

xn

'

\

xn

is

satisfied

\

we can

>m > m, so

for n

assign H O

of n

\

|

we

then

f

is

)

,

\

Theorem

2.

If (x n )

is

only a special case of the preceding:

is

a null sequence, and (a n ) any bounded sequence,

xn

On

\

.

Q,

following theorem

form a

^K

'

numbers.

> n xn < /C Since for these values therefore a null sequence. < (xn

then the numbers also

real

given, then by the assumptions

that for every n

|

xn

If the condition

is

also have

Sequences of

II.

Chapter

f

= a n xn

null sequence.

we

account of this theorem

be multiplied by a bounded

say for short:

A

null sequence

1 *

"may

factor.

Examples. If (x n)

1.

is

a null sequence,

io* lf is

10*3,

fa

10

fa

*6 ...

also a null sequence. If (x n ) is a null sequence, so is

3.

A

If (xn ) is a null sequence, (c

a n ) for

particular, f-J, (c

The

of (x n )

a

is

any such

is

1.

<

etc. are null

1,

If (x n )

c, is certainly therefore also a null sequence. In

sequences.

>

certainly

sub-sequences (x n

n

>n

null sequence, then every sub-sequence (x n

)

<

,

|

xn

\

<

z,

then

we

have, ipso facto,

k2

,

when n

is.

and (xn "),

)

sequences, then so

is

<

these sub-sequences.

(x n )

k3

<

If (x n ') and (x n ") are both null

itself.

. . .

<

kn

<

.

xn ' are said to

f

Let an arbitrary sequence (x n ) be separated into two so that, therefore, every term of (x n ) belongs

2.

and only one of

4

a

n,

f

If ki the numbers

is

for every

If,

Theorem to one

\

is

null sequence 4 .

Proof.

since k n

a

|

xn )

next propositions are less obvious:

Theorem

27*

all

sequence,

hounded.

for

(| x n |). of whose terms have the same value, say

2.

.

.

=

is

any sequence of positive

x kn

form a sub-sequence of the given sequence.

(n

integers, then

=

1, 2, 3,

.

.

.)

47

Arbitrary sequences and arbitrary null sequences.

6.

>

be chosen, then by hypothesis a numa number e and also a number n exists, such that for every n > n, |# n'| <e, ^ nc terms #n ' with ber n"y such that for every n > w", #"!< " index <^ n' and the terms # n with index
Proof.

If

<

|

i.

e.

definite indices, in the original

of these indices, then for every n

sequence (xn M O obviously )

>

nQ

If

.

,

|

xn

<

\

the higher

is

e, q. e. d.

is a null sequence and (xn ') an arbitrary then (xn ') is also a null sequence. e. w , xn Proof. For every n Among the indices belongthe terms x lt #a which number of finite the to ., x n places ing occupy in the sequence (#n'), let ri be the largest. Then obviously,

Theorem

3.

rearrangement* of

// (#n )

it,

>

|

<

\

,

.

.

n > n', |#n'| < e; hence (x n ) is also a null sequence. Theorem 4. // (x n ] is a null sequence and (xn ') is obtained from by any finite number of alterations*, then (xn ) is also a null sef

for every

f

it

quence

t.

The proof

follows immediately from the

integer />^0, from if

every x n

the index

n if

for f

n

n

in

fact,

for

that

some n onwards we must have xn n l has remained unchanged, and #,

^> the sequence (x n')>

a suitable

= xn+

'

.

For

has received

?1

then in point of fact for

every

> ri, we put p = Wj Theorem 5.

sequence (# n )

is

n

// (xn') and (xn ") are two null sequences and if the onwards so related to them that from a certain

m

then (x n ] is also a null sequence.

Proof Having chosen e > 0, we can chose n " For these e < xn and a?n -< e. every n > n Qt

+

'

e

ipso facto,

6 If ki t k 2 , . teger occurs once

is

said to be a 6

We

< xn < +

,

that is |

xn

\

<

e',

>>

m

ris

so that, for then have,

we

q. e. d.

fe n ... is a sequence of positive integers such that every and only once in the sequence, then the sequence formed by .

,

,

rearrangement

in-

of the given sequence.

concept as follows: If we alter any sequence, by omitting, or inserting, or changing, a finite number of terms (or by doing all three things at once), and then renumber the altered sequence, \vithout changing the order of the terms left untouched, so as to exhibit it as a sequence Cv '), then >\e shall say, (xn ') is obtained or has resulted from (xn ) by a finite number of alterations. will describe this

rt

7

It is precisely because of this theorem that one may say of a sequence that the property of being a null sequence concerns only the ultimate behaviour of its terms (cf. p. 10).

48

Chapter

Sequences ot real numbers.

11.

Calculations with

null

sequences,

founded on the

are

finally,

following theorems:

Theorem

88.

1.

and

// (xn )

(xn') are two null sequences, then

=

xn -f- xn', is also e. the sequence whose terms are the numbers yn Two mill a null sequence. Briefly. sequences "may" be added term

i.

by term.

Ife>0

Proof. (cf.

n

>

!,

xn

|

|

<

?,

has been chosen arbitrarily, then by hypothesis a number w 2 exist such that for every

number n 1 and

10, 4 and 12) a

and

for every n

>

2,

|

xn

<&

' \

2i

?

and 2g

//!

I

(yn )

(yn ')

then for n

2

yn

= \

I

*.

>n

+ *.'

is

a

number

Q

+

*

= I

I

therefore a null sequence

is

If w

.

I

1

*'

I


8 .

Since, by 26, 3 (or 10, 5), ( a?/) is a null sequence if is as the then above also a null sequence, (xn by n')

=

fa^') i.

e.

is,

we

have the theorem-

(y n ')

Theorem 2. // xn'). Or (xn

==

and

(a?n )

briefly:

are

(x n ')

null

null sequences

sequences, then so is be subtracted term

"may"

by term

Remarks. Since we may add two null sequences term by term, we may also do so with three or any definite number of null sequences. For supposing this prov1.

ed

for

(p

I)

null

~

1

sequences

(a^ ),

(#")>

>

(&%*

X)

)

,

i.

e.

supposing the

sequence

to be already recognised sequence (xn ), for which

is

also a null sequence.

a null sequence,

as

The theorem thus holds

Theorem

1

ensures that the

for every fixed

number

of null

sequences. 2. That two null sequences "may" also be multiplied term by term, is immediately clear from 26, 1, since null sequences, by 10, 11, are necessarily bounded. 3. Term by term division on the contrary, is in general not allowed, as t

is

11

already obvious, for instance, from the fact that

stantly

=

1

.

If

we

take xH

*=

n

9

xJ =

For the

last

inequality 3, II, 4

is

=}=

is

0,

con-

Xn =

n*

,

vide a bounded sequence. 8

when xn

used.

x ~ do not even pro then the ratios xmf

Powers, roots and logarithms.

7.

Special null sequences.

case of other sequences (xn ) also,

4. In the

instance about the sequence

of the

)

(

little

can be said

reciprocal values.

\xn / an obvious, but often useful theorem: o Theorem 3. // the sequence (\ x n \) of absolute values have a positive lower bound, if, therefore, a number y

in the first

The following

of the

>

49

exists,

is

terms of (xn such that for >

every n,

then the sequence

{

)

\x n J

In fact, from

|

of reciprocal values is bounded.

xn

|

>y>

it

at

xn

once follows that

for

K=

we

have


every n. In order to increase the scope both of the application of our concepts and of the construction and solution of examples, we insert P. for

paragraph on powers, roots, logarithms and circular functions. 7.

Powers, roots and logarithms.

Special null sequences.

As, in the discussion of the system of real numbers, it was not our intention to give an exhaustive treatment of all details, but lather put fundamental ideas alone in a clear light, assuming as known, the body of arithmetical rules and concepts, with which after all everyone is thoroughly conversant, so here, in the discussion to

thereafter,

of

we

powers, roots and logarithms,

elucidation of the basic facts,

ourselves to an exact

will restrict

and then assume known the

details of their

application. I.

If

x

is

Powers with

an arbitrary number,

^

1 already. By x we mean the to agree, besides, that

x

k symbol x for positive the product of k factors, all equal

2 is defined as exponents k Here we have therefore only another

integral to x.

integral exponents.

we know

represents the

so that x 9

is

number

1,

For arbitrary

and

if

x

=}=

0, it is

x~* the number -^ (k

p^O.

we merely emphasize

integral

fundamental rules

notation for something

itself,

defined for every integral

with integral exponents, 1.

number x

that the

=

we know

convenient

1, 2, 3, ...y,

For these po \\crs*

the following facts:

exponents p and q ($0)

the

three

hold:

* xp is a power of base x and exponent p. This continental use of the word power cannot be here dispensed with, in spite of the slight ambiguity resulting- from by far the most frequent use of the word in English to designate the exponent. This sense should be entirely discarded from the reader's mind,

notably for

35, 2 a

and others.

(Tr.)

29.

50

Chapter

from which

all

lations with

powers

2.

in

Since,

Sequences of real numbers.

TI.

may be deduced, which

further rules

regulate calcu-

.

a power with integral exponent, merely a repeated is involved, its calculation has of course to

multiplication or division

be effected by 18 and 19. If therefore x is positive and defined for instance by the nest (x n \y n ), with all its endpoints ^> (cf. 15, 5), then we have simultaneously with

x*

-fcJyJ' for all positive integral for x <^ restrictions

=

(

xk \y k n n)

once >

at

exponents: and similarly or k
with appropriate

.

For a positive x we have furthermore

3.

xl

according as

we at once deduce from #^1, And quite as simply we find:

as

If

a;

x^ y

a

and

For

we

multiply

(v.

3,

I,

3)

by

x".

the integral exponent k are positive, then

according as

x*^x 4.

if

positive

a^^Sg.

exponents n and arbitrary a and 6 we

integral

have the formula

+ where

[? R )

,

for

l^Lk^n,

W_ fn\

and

will

(Q]

be

put=l.

-

- 1) (n - 2) 2

3

shall is

.

.

.

(n

I

fn\ jn

t-y*.

- fe-f 1) k

...

Roots.

a be any positive real number, and k a positive integer, then

denote a number whose & th power

solely the existence question: Is there

extent

i

H

(Binomial Theorem.) II.

If

-ik

b

has the meaning

n (n 1

n-lt

(n\

(*)*

is

This

it

is

=a

What interests us here such a number, and to what .

determined by the problem thus set? dealt with in the

9 In for the base x or y this, the value responding exponent is positive.

is

only admissible

if

the cor

Powers, roots and logarithms. Special

7.

Theorem. There

is,

=y IP

one and only one

invariably,

satisfying the equation

ft

null sequences.

positive

=*

51

number (a

f

> o)

-

and call { the & th root of a. One such number may immediately be determined by a We use the nest of intervals, and its existence thereby established < a, but, p denoting any positive decimal-section method. Since 0* there is one and only one integer g ^> integer > a, p p > a 10 . for which k ,

We

write g

Proof.

=

16

^

,

.

^<(g+1) ,

g

fc

he interval / determined by g and (g -f- 1) we divide into 10 equal parts and obtain, in the manner now repeatedly worked out, a defiwhich we may denote, say, by z v nite one of the digits 0, 1, 2, .., 9, and for which I

.

and so on. We therefore obtain a nest of intervals y^ whose endpoints have definite values of the form

and so on,

= (xn (^J

|

and *

a -L 6 i jo

yvn If

f

=

(aj^

|

yj be

^ 10**--]r_____~rL -L-

the

2

**-_ J_ r

1

?

10 ,,_i

10

number thereby determined, then

endpoints of intervals are ^> 0,

at

it

since here

all

once follows by 29, 2 that

k k by construction, x <^a <^y for every n, hence, by have we must ,. *

But,

5,

Theorem 4,

= *.

this number f is, moreover, the only positive solution of the problem, follows directly from 29, 3, since it was there pointed out that for a positive ={=, necessarily f* 4 *> i e. 4=^is an even number, is also a solution of the then If &

That

^

problem. ing

We

pages,

shall not,

10

however, take

but interpret the

meaning only mined by

s

30 11

positive

For a

.

the

th

number

= 0,

this into

root f,

of

a

account

positive

in the follow-

number a

as

completely and uniquely deter-

we may

also put

Va =

19

<.

the last of the numbers 0, 1, 2, ..., p whose &th power is accordance with this we have, for instance, ^ x* not always =#, but always = x 19 For negative a's we will not define y a at all; we can, however, if 11

g

is

In

.

|

h

is

odd,

write

\

|/T=

fc

30.

We will

Sequences of real numbers.

II.

Chapter

52

not enter further into the rules for calculations with roots, familiar to every one, and will only prove the

but consider them as

following simple theorems: 29, 3 gives at once the

Theorem

il.

a

a

^

1.

Theorem

2.

we have, more

and a x

we have

Further

.

>

a

//

>

If a

^ * ^ Va

*

>

Va

0, then

according as

,

l

the

0, then

\V a)

and

a monotone sequence;

is

precisely, 3

>>!, a
a>\a>V a /

to*

=1

//*

,

Proof

of course

^s

a>

3,

>1,

^f

a


/

sequence

By 29,

a

3

r-

(For a

if

=

1

.)

>

involves a71 ^ 1

1

by the preceding theorem, taking w (w

th

n

roots

l)

-j-

a

>1, and

thereiore

,

n-H

n

Va > l/a>l. Since for a

<1

aW

the

Theorem

3.

ir

equality signs are reversed,

Hence

whole statement.

If a

>

,

finally

we deduce

=#

a"

n.

as

1

a nw/J sequence (monotone by the preceding theorem). Proof. For a=l, the assertion is trivial, as then x n

/om

>

proves the

then the numbers

xn

a

this

the

1,

Va > 1,

and therefore

follows:

By

the

glVCS

a

Consequently

a;

n

=

e.

xn

= Va

of Bernoulli

inequality

1

(v.

> 0,

10,

7),

then n

Va

If

we reason

= + 1

B

= (l+*J">l + nan >***.. n

|

i.

= Q.

|

< ~,

therefore (xj, by

26,

1 or 2,

is

a null

sequence. If

is

0
a null sequence.

then

If

we

a

>1,

and so, by the

le^ult obtained,

multiply this term by term by the factors n

it

which certainly at once follows, (l

as

a null sequence,

form a bounded sequence, as a < V a by 26, 2, that

Vaj, q. e. d.

and therefore also (#n),

<

1

,

Va, then

Powers, roots and logarithms. Special null sequences.

7.

53

Powers with rational exponents. again regard as substantially known, in what manner one may from roots with integral exponents to powers with any rational pass III.

We

exponent:

By

aq

,

with integral

tive a, the positive number

>

p~Q,

> 0,

q

uniquely

we mean,

for

any posi-

defined by

1L If

p

> 0,

then a

also be == 0;

may

a q must then be taken to have

the value 0.

With these

definitions, the three

formulae

=a+ r

a r>

a?

r

ar

';

fundamental rules 29,

= (a

br

b)

r

r

(a

;

Y=a

1, i.e. the

rr>

for any rational exponents, and therefore calculations these powers are formally the same as when the exponents are

remain unaltered, \vilh

integers.

These formulae

contain, at the

same

time, all the rules for

may now be Of the less known

with roots, since every root

written as a

rational

results

exponent.

working

power with a

we may

as

prove,

they are particularly important for the sequel, these theorems:

Theorem 1. When a > Similarly, when a < 1 (but

1

then a r

,

>1

,

>

and only if, r 1 if, and only

if,

then a r is

positive),

.

<

if,

r>0. Proof. than 1; 0.

by

By 31,

29

a and

2,

same

the

V'a

are either both greater or both less

true of

is

=a

a and \V a)

r

if

and only

if

p>

Theorem positive, then

la.

a

r

//

^a

1

number

the rational

r ,

according as a

r

> 0,

and both bases are

a^.

The proof is at once obtained from 31, 1 and 29, Theorem 2. If a > 0, and the rational number r lies rational r " 13

a

=

,

or

numbers r' and and conversely,

then a r also always whether a be <,

between the

between a r

=or>l,

If, firstly,

a

>

1

and

r'

< r",

and

'

and

/<,

then

The term "between" may be taken, as we

or exclude equality on both sides, the

lies

>r".

Proof.

13

r",

3.

r powers a also

3

=

excepting

please, either to include

when a =

1,

and therefore

1.

(061)

all

32.

54

Chapter

By Theorem and

case, this

Sequences of

II.

numbers.

real

already proves the validity of our statement for this

1, this

proof is quite as easy. precisely, the

proof we deduce, indeed, more Theorem 2 a. If a>l then

the larger (rational)

to

9

value

the

<1

a

the

of If larger power. corresponds then the larger exponent gives the smaller power.

base a=%=!

If the (positive)

exponent also (but positive)

In particular:

then different exponents give different

9

Hence we deduce, further, powers. Theorem 3. // (rn ) is any (rational) null sequence, numbers form a null sequence. Proof.

By 31,

>

therefore e

If

3,

and

ij

(fl>0)

monotone, then so

is

If (r^

\ty~a

-

\y

1

n

and

for

>

n

1

\Va

,

/l a

V*

I

n.,, -

that

n

!

n>n

is (#n ).

are null sequences.

l)

be given, we can so choose M A and n% for

then the

=* n -l,

xn also

From

in the other possible cases the

I

1

|

m

If

\a

is

m

and

I/

m

\a

-1

2,

-Wl n >n

and

that for every

m

a r then 1

.

Wl

,

-I -|

.

w>n

between

lie

and

e

1

By hypothesis we

-|-g,

i.

e

+e

1

if r

lies

can, however, so choose

be-

#

,

,

r<> ,

therefore

is

-<^<

or

these w's,

between

1

;

and 1-J-e.

e

Hence,

for

.

a n

proving that (a

r

1)

is

1 I

I

(rn )

and

between the same bounds,

lies

'. for

e

numbers

then the

9

i

a m and a

By Theorem

both lie between

I/

i

tween

and n

an integer larger than both n l

< e, That

a null sequence.

it

is

monotone,

if

follows immediately from Theorem 2 a. These theorems form the basis for the definition of

is,

IV.

For this we 88. Theorem. // points) and a is

Powers with arbitrary

(x n

real exponents.

state the

first

\y n )

is

any

nest of intervals (with

positive, then

for a ;> 1,

and

for

a

= (a*n o = (a

a

o

v

\

)

\

a* n )

Vfl

rational end-

7.

is

Powers, roots and logarithms. Special null sequences.

also a nest of intervals.

then o

=a

And

if (xn \y n) is rational valued

55

=

and

r,

r .

Proof. That in either case the left endpoints form a monotone ascending sequence, the right endpoints a monotone descending seVn> n a. By the same theorem, a* < a quence, follows at once from 32, 2 a n in the other (a < 1), for every n. Finally, that in both cases the lengths of the intervals form a null sequence, follows, with the aid of 26, from

in

the

one case

and aVn

(a J> 1)

<

xn ) by 32, 3, is a null sequence, because (y n the second rational and null with a terms; sequence by hypothesis factor is bounded, because for every n

for here the first factor, is

< a*n in the

one case

<; a

yi

(a 2> 1),


Now

if

(a <jl).

(# w

|jy w )

and so by 32, 5,

Theorem

2,

4,

=

ar

then r

y,

necessarily a

In

of

consequence Definition 14 If a .

lies

this

=a

between xn and y n

.

we may ^n )

Q = (xn

and

number, then:

for every n,

r

theorem,

> 0,

,

a Vn , for every n; hence by

a* and

between

lies

I

agree to the following is

an arbitrary

a

> 1

real

'

a*

=

a*n <7,

a Vn

it

e.

i.

if

This definition can of course only be regarded as appropriate, concept of a general power thereby determined obeys subs tan. same laws as the type of power so far considered, that the tially if

the

with rational exponents.

That

this

is

so, in

the fullest sense,

is

shewn

by the following considerations. 1.

For

new

rational exponents, the

definition gives the

same

result

as the old. 2.

If e

(?',

then

15

a?

a?'.

33 of theorem and definition is, from the point method, of exactly the same kind as those set forth in 14 19: What is demonstrable in the case of rational exponents is raised, in the case of arbitrary exponents, to the rank of a definition, whose appropriateness has then to be verified. 16 This assertion, formally rather trivial in appearance, when put somewhat more explicitly, runs thus: If (xn y n ) = (> and (xn f y^ = (>' are two nests of intervals, which may be regarded as equal in the sense of 14, then so are those nests of intervals equal (again in the sense of 14), which by Definition 33 14

of

view

This combination of

\

give the powers a e and a e '.

\

34.

Sequences of real numbers.

II.

Chapter

56

3. For two arbitrary real the three fundamental rules

numbers Q and

culate

positive a

and

6,

now introduced we may calway as with the special types

with the general powers formally in precisely the same

hold, so

and

Q',

that

hitherto used. Into

the

emphasized on

extremely simple proofs of not enter further 16 p. 49,

;

these

we

facts

will

we

also,

will,

as

so far as

3 to general powers, now concerns the extension of theorems 32, 1 with content ourselves the statement and a few immediately possible,

We

indications of the proof.

from 82,

85.

have therefore the theorems, generalized

13:

Theorem 1. When a > 1, we have a Q > 1 if, and only if, Q > 0. Q Similarly, when a <. 1, (but positive), we have a < 1 if, and only if,

Q>0. For by 82,

xn

1,

we have

e.

a

>

number Q

is

g. for

1,

a*n

>

1

if,

and only

if,

>0. Theorem

positive, then

la.

aQ

the

//

^ a?,

real

according as a

^a

> 0,

and

both

bases

are

.

Proof by 82, la and 15. Theorem

2.

//

a

>

and Q

ways 82, 2.

It

more

yields,

Theorem 2 a. the larger

value

of

//

32, 16

rules:

3,

a

the

>

then

1,

power

if

\

Q

Q",

then a^ is al-

precisely

same

the

as

the

to

a

<1

larger exponent corresponds (but positive), then the larger

+

In particular: If a 1> then different And from this theorem, exactly as

follows the final

As a model we may sketch

If

and

Q' is

exactly, the

exponent gives the smaller power. exponents give different powers. in

between

is

The proof

between a&' and ae".

=

and therefore

(xn

\

the proof of the first of the three fundamental

' yn ) and Q' = (xn yn *), then by 16, o we assume a 1

Since all endpoints have, by 18,

>

(as

\

-J-

Q'

=

(xn

+ xn

' \

yn -f y^

:

powers with rational exponents) are positive, we a e. a e'

= (a Xn -a x*

\

a v -a Vn ").

Since, however, for rational exponents, the first of the three fundamental rules has already been seen to hold, this last nest of intervals is not only equal, in

the

sense of 14, to

by term.

that

e+e defining a

,

but even coincides with

it

term

Powers, roots and logarithms. Special null sequences.

7.

Theorem

3.

any null sequence, then

// (p n) is

form a null sequence. If (gn) is monotone, then so As a special application, we may mention the

Theorem

the

is

57

numbers

(xj.

// (#n) is a null sequence with all its terms positive,

4.

then for every positive a,

_ Xrf Xn' ~ n /*.

is

>

Thus

also the term of a mill sequence.

^n

(

null sequence.

for every

)

a

>

is

a

'

i

Proof.

>

be given arbitrarily, e a is also a positive number. By n Q (cf. 10, 1 and 12), hypothesis, we can choose n Q so that, for every n If s

>

For n

>n

,

by 35, la, we then also have, however,

which at once proves the whole statement. The above theorems comprise the main principles used

in cal-

culations with generalized powers.

V. Logarithms.

The

foundation for the definition of logarithms

>

>

and Theorem. // a respects quite arbitrary numbers, then one always

exists, for

b

which b*

1 are

lies

in the

real, and in all further 36. and only one real number f

two

= a.

Proof. That at most one such number can exist, already follows from 35, 2 a, because the base b with different exponents cannot give That such a number does exist, we show conthe same value a. structively, by assigning a nest of intervals which determines it, thus for instance by the method of decimal sections: Since b 1,

>

n

(b~

)

= fp-J

is

quently, since a

b~

a null sequence, by 10,

and there

exists,

conse-

are positive, natural numbers p and q for which

and p

7,


and

b"

9

<

a

or

b

9

> a.

now, we consider the various integers between p and -(- q in of &, there must be one, and can be only for which call it g one If,

succession, as exponents

b

a

a,

but

58

Chapter

II.

Sequences

of real

numbers.

determined we divide into 10 The interval JQ =- g (g -[- 1) thereby equal parts and obtain, just as on p. 51, a "digit" z , for which .

.

.

r

b'*"*r

but

,

repetition of the process of subdivision nest of intervals

By

xn ==

*-(*.|yJ. for

w "h

\

L_

we

S+ jo + g

+

+

find a perfectly definite

+ io-i ..+>-,

'

+

10*' ,

+

i f

which

for which, therefore, in

for every n,

This theorem

justifies

Definition.

//

a

accordance with 33,

us in the following

>

and

b

>

1 are arbitrarily given, then the real

number f , uniquely determined by b* t's

called the

logarithm of a

===

to the

(g is also called the characteristic, the mantissa, of the logarithm.)

#

base

and

b;

and, symbolically,

the set of the digits z l9

z,

z >A

...

We speak of a system of logarithms, when the base b is assumed fixed once for all and the logarithms of all possible numbers are taken to this base 6. The suffix b in log & is then usually omitted as superfluous. Very soon a particular real number, usually denoted by e, appears quite naturally as the most convenient for all theoretical considerations; the system of logarithms built up on this base is usually called the system of natural logarithms. For practical purposes, however, the base 10 is, as we know, the most convenient; logarithms to this base are called common or Briggs' logarithms. These are the logarithms found in all the ordinary tables 17 .

working with logarithms we assume, as we did with powers, to be already known, and content ourselves with a mere mention of the most important of them. If the base b 1 is arbitrary,

The

rules

for

>

17 As a matter of course, a system of logarithms may also be built up on a This, however, is not usual. The first logarithms calpositive base less than 1. culated by Napier in 1014 were, however, built up on a base b 1, which presents some small advantages, particularly for logarithms of trigonometrical functions.

<

Neither Napier nor Briggs, however, really used any base. The idea of logarithms as the inverse of powers only developed in the course of the 18th century.

Powers, roots and logarithms. Special null sequences.

7.

in what then numbers, positive

but assumed fixed

follows,

= log + log a". = log a; log 1=0; log log a = Q log a (Q arbitrary,

2.

Q

3.

4. log

a^

5.

log

0^0,

6.

If

log

according as a

0',

according as

and

b

if

a, a',

log 6

=

1.

a"

...

denote any

0'

log (a! a")

1.

and

59

are two

^

real).

5 a';

in particular,

0^1.

different

same number a

logarithms of the

37,

bases

to these

(> l), and two bases, i.

and

x

the

e.

then

=

1 as follows at once from (a =) b% by taking logarithms on both fr^ sides to ihc base b and taking account of 87, 2 and 3

7.

n

-)>

ff

provided log w

=

>

2, 3, 4, ...

that

,

is,

,

a null sequence.

is

n> b

In fact

^

<

,

e .

VI. Circular functions.

To

introduce the so-called circular functions (the sine of a given with the cosine, tangent, cotangent etc.) in an equally strict manner, i e. avoiding on principle all reference to geometrical intuition as element of proof and founding solely on the concept ot

angle

18

,

the real

number,

them

to

at this stage not yet possible.

is

be resumed later

24).

(

our

enrich

In spite of this,

and

applications

we

This question

will

will unhesitatingly enlist

enliven our

examples (but of

course never to prove general propositions), in so far as their knowledge may be presupposed from elementary work. Thus e. g. the following two simple facts can at once be ascertained: 37tt. are any angles (that is to say, any numbers), then <x 1. If a, ,, a n 2 ,

,

.

.

,

.

.

.

(sin

are

bounded 18

an)

and

(cos

)

sequences; and

in general be measured in radians If in a circle of radius the radius to turn from a definite initial position, then we measure the angle of turning by the length of the path which the extremity of the moving radius has traversed taking it as positive when the sense of

unity

Angles will

we imagine

turning is counterclockwise, otherwise as negative. An angle is accordingly a n a right angle the pure number; a straight angle has the measure -J- n or y

measure

-f-

-~-

or

-,-

a

It

number

.

To every

definitely placed

angle there belongs an

measures which, however, differ from one another only by integral multiples of 2jt, i. e. by whole turns. The measure 1 belongs to the angle, the arc corresponding to which is equal to the radius, and which thereinfinite

of

fere in degrees is 57

17' 44"-8 nearly.

Chapter 2. the

Sequences of real numbers.

II.

sequences

and are (by 26) null sequences, for their terms are derived from those of the null

sequence

by multiplication by bounded

f

J

factors.

VII. Special null sequences.

As a

further

the concepts

of

application

now

defined,

we

will

examine a number of special sequences:

88.

1.

= 0,

assertion

the

>

with Q

is

(a

is

n )

to

analogous

that

for

:

write,

=

n

and therefore

1+c

\a

\

sum

Since here in the denominator each term of the

have

a null sequence. of 10, 7 19 For

is

0<|
for

trivial;

(na n )

even

0,

= ,-4--,

101

then besides

1,

Our reasoning

Proof. a

<

// \a\

every n ni

i

>

is

we

positive,

1,

tr

1


i

therefore

>

wa ni

1-2 < ___.

Thus we have

\na 11 n

as soon as

\<.e,

i.

e.

(

(

'-^.

n

1)0

for every

The that for

thus

result

very remarkable:

is

proved

a large n the fraction

therefore very

much

however constant

.

greater than

(=

l)

for

o

n

its

= 0,

is

it

asserts, in

very small, and

its

denominator

This denominator

numerator.

and when Q

is

very small (and Nevertheless, our result is

only increases very slowly with n. shows that provided only n be taken sufficiently large, the minator is very much larger than the numerator 20 . The point positive),

fact,

it

deno-

% from

which n a |

n \

does indeed

Q

=p 19

1,

= i^r-y lie is

lies

below a given

e

we found n

very far to the right, not only very small

(i.

a

e. |

\

when

very near to

l).

Except that a and Q need no longer be rational.

e,

=1+ but also

i

when

Substantially this

Powers, roots and logarithms. Special null sequences.

7.

<

61

>

this is true However a 1 and e may be given, we have always, from a readily assignable point onwards, n a n s. From this result many others may be deduced, e. g. the still more

and only

:

|

\

|

\

<

paradoxical fact: 2.

//

|

a |

<1

and a

real

and

arbitrary, then

a n)

(n*

is

also

a null

sequence.

Proof. a1

a

if

2;

> 0, <

also

is

If a
evident from 10,

is

7,

because of 26,

j_

a

a l9 so that by 35, n By the preceding result, (n a ) a

write 1.

la,

\

|

is

the positive number a null sequence. By

35, 4 \

therefore, finally, (by 10, 5), n* 3.

If a

> 0,

then

|

\

,

the term of a null sequence

a null sequence

is

n* a n

or

\

a n itself is also

/*)

(

n

a

n^

i.e.

1

[na^ ]*,

22 ,

to

whatever base

21

.

b>l

the logarithms are taken.

Proof. fore

(j^n)

is

>

Since b

1,

> 0,

a

a null sequence,

by

we have

n n

<

la),

>1.

b

> 0, we have every n > m

Given

1.

say for

from a certain point onwards,

(by 35,

e'

There-

consequently

=

"

tP

(ft')

But, in any case,

the characteristic of log n (so that b m log n, and # fortiori g take n last value above, with our choice of w, is

if

g denote

therefore,

we

>

,

<e =

g

rg log #

+

for every

1, is

;/

>

> ;/

< wz.

f-

1).

If,

Hence the

= 6m

.

w e may also say: w a n -^ f"T^~ ^-^ .> more pronouncedly large, or, also more pro(1 -f- g) positive g by which we again (cf. 7, 3) mean nothing more nouncedly infinite, than n itself, For future and nothing less than that our sequence is precisely a null sequence. reference we remark here that the results proved in 1 and 2 arc also valid for a complex a, provided only a < 1. 21 With the same change of notation as above, we may say here: "(I + 0) n becomes more pronouncedly infinite than every (fixed) power however large of n 20

Writing as above n becomes for a

|

|

a

|

I

|

\

itself". 28 Or, in words, "log n becomes less pronouncedly large than every power, ever small (but determinate and positive), of n itself". 3 ( G 51 )

how-

Chapter 4.

//

and

cc

Sequences of real numbers.

IT.

arc arbitrary positive numbers, then

f>

"\

7 a null sequence

is

Proof.

35,

By

3.,

5. (a? n remarkable.

V

fi^

(

therefore, so

4,

however large

,

ft

be

> 0;

a null sequence, because

is ]

may

ij

a mill sequence.

is

For when n

is

we

will,

large,

(This result

is

so to speak, prove the stronger.)

For

>

n

by

also very

V

'

Proof.

.

have a large number under

it is the exponent of the is, true, also large; but it radicand or exponent not at all evident a priori which of the two

the

23

the given sequence.

is

)=(Vn

and however small

cc

we

1,

n

\n

have

certainly

> 1,

is

therefore

n

xn

= Vn the

all

1

terms

certainly

of

sum

the

Hence

;> 0.

are

in

Consequently we

positive.

particular,

or

-

n(n

"

1)

have,

in

9

24

-

..

_

1

n

Hence

so that (x n ) 6.

//

=

(#J

_ 1

V/w is

every (fixed) integer k,

also

is

in fact

by 26,

1

and 35, 4 a

a mill sequence whose terms are the

all

>

null sequence. 1,

then for

numbers

form a mill sequence 3

"Every power

pronouncedly large 84

The

log n, however large, (but fixed) becomes less than every power of n itself, however small (but fixed). of

when n >

n

for (n 1) which 6 it cannot exceed, is an artifice often useful in simplifying calculations. a& By the assumption that all a?n 's >> 1, we merely wish to ensure that ' are defined for every n. From a definite point onwards the numbers x n this is automatically the case, since (xn ) is assumed to be a null sequence and therefore from some point certainty xn <[ l f and hence xn 1. substitution,

1

,

of the value

^-

1

|

\

>

7.

From

Proof.

we put a

therefore,

the last

is

Powers, roots and logarithms. Special

=

the formulae set forth on

k

=

.

i/1

-f-

xn and

terms

the

since

6

xn

Irr 'I I

whence, by 26, the statement 7.

the

//

is

(xn )

>

2fl

r X n

I

I

all

=

and

positive

>

once follows.

log (l

+

6.,

then

.r, t )

form a null sequence.

Proof. e

at

< ^

where

13,

a null sequence of the same kind as in

numbers JfH

also

I

Footnote

denominator are

the

in

1,

p. 22,

follows that

it

1,

63

null sequences.

is

so that

If b

given,

we

we have

for every n

>w

zl ,

|

>1

is

the base to which the logarithms are taken, and

write

-=-

xn

b* \

>

2

<s

2

.

2

> 0. We

For those

w's

then choose n

we

have, a

so large, that

fortiori,

therefore (by 35, 2 or 37, 4)

with which the statement 8.

// (x n )

is

is

proved. again a null sequence of the same kind as in

6.,

then Hie numbers

also

form a null sequence, if Q denote any real number. Proof. By 7. and 26, 3, the numbers

form a null sequence. By 35, 3 and 37, 3 the same

6*"-l

We

assume

ft

= + sJ*--l = *n (l

>: 2, since for k

=

1

is

true of the

q-e.d.

,

the assertion

numbers

is

trivial.

64

Sequences of

II.

Chapter

8.

real

numbers.

Convergent sequences. Definitions.

considering the behaviour of a given sequence, we have been chiefly concerned to discover whether it was a null sequence or not. By extending this point of view somewhat, in a manner which readily

So

suggests

we

when

far,

shall

We

itself, we reach the most important concept of all with which have to deal, namely, that of the convergence of a sequence. have already (cf. 10, 10) described the property which a sequence

(xn ) may have, of being a null sequence, by saying that its members become small, become arbitrarily small, with increasing n. We may also without, in general, say: Its terms, as n increases, approach the value 0,

ever reaching it, it is true; but they approach arbitrarily near to this value in the sense that the values of its terms (that is to say, their differences 0) sink below every number e for the value in this conception

from

concerned with a sequence (x n ) terms from the definite number I

xn

|

(>

small.

If

we

substitute

we shall be any other real number for which the differences of the various ,

that

sink, with increasing

>

however

0),

is

to say,

by

3, II, G, the values

below every number

,

s

> 0,

how-

ever small.

We

state the matter more precisely in the following: Definition. If (x n ) is a given sequence, and if it

39.

definite

number

in such

a way that

to

,

we say that the sequence sequence \ it is convergent. The number is called

or that

or

limit of

zee

say that

limit

.

then

the sequence is also said to terms approach the (limiting) value

this sequence; its

This fact

is

related to a

-6

(*

forms a null

is

expressed by the symbols n -> 5 or lim n

x =

x

To make it plainer that the approach to and larger, we also frequently write

is

(x n ) converges the limiting value

to

converge tend to

,

,

1-,

and

have the

.

effected

by taking the index n

2

larger

xn ->^

n ->

for

or

oo

lim

xn

.

w->o&

Including the definition of a null sequence in the

we may

also say:

xn ->

for n -> oo (or lim x n n

always assign a number n Q

=

)

new

if for every chosen e

definition,

> 0,

we can

>x>

=n

Q (e),

so that for every

n

>

,

we

liave

xn ) or xn Or (f f |; by 10, 5 the result is exactly the same. Read: "xn (tends) towards f for n tending to infinity" in the one case, and "Limit xn for n tending to infinity equals f" in the other. In view of the definitions 40, 2 and 3, it would be more correct to write here "n -> + oo"; but for simplicity 1

|

2

the -f sign

is

usually omitted.

8.

Convergent sequences.

t>5

Remarks and Examples. Instead of saying "(#n ) is a null sequence", we may now, more shortly, write "xn -> 0". Null sequences are convergent sequences with the special limiting 1.

value

0.

Substantially, all remarks made in 10 therefore hold here, since we are concerned only with a very obvious generalisation of the concept of a null sequence. 3. By 31, 3 and 38, 5, we have for a > 2.

'Y/a 4. If (xn

|

|

for

For x n

xn

|

(7,

*

a

by 26,

so that both, 5.

-^

yn)

],

and

|

1

also |

yn

-

-> 1.

-\/n

then x n -> a and y n ->

For both


a

^

are \

\

-

yn

form null sequences together with (y n

- -_ /

=

and

f 1

|\n

-

n

that

,

is,

for the sequence 2,

xn

\

,

x n ).

14365

^,

y^^

,

.

.

ft

.

,

xn

->> 1,

forms a null sequence.

1 |

In geometrical language, x n -> f means that all terms with sufficiently Or more precisely (cf. large indices he in the neighbourhood of the fixed point 10, 13), every e -neighbourhood of f, the whole of the terms, with at most a finite 3 In applying the mode of representation number of exceptions, are to be found of 7, 6, we draw parallels to the axis of abscissae, through the two points (0, f e) if the whole graph of the sequence (xn ), with the exception and may say x n - > 6.

.

m

.

:

of a

,

finite initial portion, lies in

every s-strip (however narrow). oo , xn of expression: "for n f" instead of xn -> f, For an integer n oo does not exist and should be most emphatically rejected. We are concerned merely with a process of approximation, v n need never be f sufficiently clear from all that precedes, which there is no ground whatever for imagining completed in any form. (In older text books and writings we frequently 7.

The

lax

= =

=

mode .

find,

however, the symbolical

mode

"lim xn

of writing:

f", to which, since

it

W~00

meant only symbolically, no objection can be taken, excepting that oo" must necessarily create some confusion clumsy, and that writing "n regarding the concept of the infinite in mathematics. then the isolated terms of the sequence (x n ) are also called 8. If xn -* xn is called the error corresponding to and the difference approximations to is

after all

it

is

,

,

the approximation x n 9. The name "convergent" appears to have been .

first used by J. Gregory (Vera circuit et hyperbolae quadratura, Padua 10(37), and "divergent" (40) by Bernoulli (Letter to Leibniz of 7. 4. 1713). It was through the publications of A. L. Cauchy (see p. 72, footnote 18) that a limiting value came to be denoted generally by the

prefixed symbol "lim". The arrow sign (->), which is so particularly appropriate, into common use after 1906, through the works of G. H. Hardy, who himself

came

referred

To

it

back to J. G. Leatham (1905).

the definition of convergence

we

at

once append that of diver-

gence:

Definition of 39 3

is

called

1.

Every sequence which

is

not convergent

m

the sense

divergent.

Frequently this is expressed more briefly: In every e-neighbourhood of n "almost all terms of the sequence are situated. The expression "almost all" has, however, other meanings, e. g. in the Theory of Sets of Points. ?

40.

66

Chapter

With

this

11.

definition,

Sequences of real numbers.

the

sequences

tt, 2,

are certainly

4, 7, 8, 11

divergent.

one type is distinguished by its e. g. the sequences and behaviour, transparent (n*}> particularly simple n Their others. common property is and for a > 1, (logn), (n), (a )

Among

divergent sequences,

evidently that the terms increase with increasing n beyond every bound, this reason, we may also say that they tend to -| oo,

however high. For

they (or their terms) become infinitely large. This we put precisely in the following Definition 2. // the sequence (# M ) has the property that, given an

or that

more

arbitrary (large) positive number G, w assigned such that for every n

>

then 4

another number n Q can always be

we

shall say that (x n ) diverges to |- oo tends to oo ; and we then write divergent with the limit ,

+

xn ->

+

oo (for

n

> oo)

+

lim x n

or

is

definitely

are merely interchanging right

and

left

+

Km x n

or

oo

M

We

oo , or

+

5

>'

oo.

by defining further:

Definition 3. // the sequence (xn ) has the property that, given an G (large in absolute value), another number arbitrary negative number n Q can always be assigned such that for every n w

>

*<-
then

shall say that (x n ) diverges to

divergent

xn ->

5

with the limit oo (for n -> oo)

GO,

or

oo or

oo, tends to

is

definitely

and we write lim

xn

or

oo

lim

xn

~

oo.

n-

Remarks and Examples 1

tend to tend to is

>

OO. In general-

If # xn -> >-f-oo, then yn = QO, and conversely. in what therefore sufficient, substantially, to consider divergence to

2.

It

a for a>0, The sequences (n), (n*), (n n ) for a 0, (log*), (log n) H-OO; those whose terms have these values with the negative sign f

+CO

follows.

+

In geometrical language, x n * OO means, of course, that however a be chosen, all points x n except at most a (very far to the right) With the mode of linite number of them, remain beyond it on the right. 3.

point

G

my

,

4 Notice that here not merely the absolute values \xn \, but the numbers xn themselves, are required to be >> G. 6 It is sometimes even that with apparent distortion of facts, said, the sequence converges to -f oo. The reason for this is that the behaviour described in Definition 2 resembles in many respects that of convergence (39). will not, however, subscribe to this mode of expression, although a mis-

We

understanding would never have to be feared.

Similarly for

OO.

8.

67

Convergent sequences.

means

however

far above the axis of abscissae the whole graph of the sequence (xn ) excepting- a finite initial portion, lies still further above it. CO need not be monotone; thus for instance the 4. The divergence to

representation in 7,

6, it

we may have drawn

that*

the parallel to

it,

^

2 1 2, 2 s 3, 2 3 4, 2 4 ..., A, 2*, ... also diverges to + 00. 1 5. The succession 1, 4, ..., ( 2, +3, l)"~ n, ... does not diverge This leads us to the further to -foo or to OO.

sequence

1,

A

Definition 4. of definition

39,

sequence (x n ), which either converges in the sense

diverges definitely in the sense of the definiwill be said to behave definitely (for n+oo).

or

40, 2 and

tions

,

,

,

3,

All other sequences, which therefore neither converge, nor diverge definitely, will be called indefinitely divergent or, for short, Indefinite*.

Remarks and Examples. The sequences

1.

quences 0, quences 6,

and

4,

0,

1,

a<-l,

0,

2,

and likewise the

- 3,

0,

.

.

.,

se-

as also the se-

8 are obviously indefinitely divergent.

the contrary, the sequence (| n |) for arbitrary a, and, in spite of n n n irregularities in detail, the sequences (3 -f-( log n), 2) ), (n-\- ( l)

On

2.

all

(n

[(-I)"], [(-2)"], (a") for

1, 0, 2, 0, 3, 0, 4, ...

n l) w), show definite behaviour. The geometrical interpretation

9 -j-(

3.

diately from the fact that there divergence (v. 40, 3, rein 3).

Both from xn

4.

7

term

4=

,

that

xn

+

We

and from #n -> |

xn

\

>

G= s

oo

it

(v.

39,

follows 6)

evidently implies

xn

(-i) n

/n

n ,

we have

a?n

->0, but

(

\

xn JJ

imme-

nor definite

follows, provided

no way involves definite behaviour of

in

Example: For xn gent.

+ 00

-* 0; for

other hand, xn

the

*

of indefinite behaviour

neither convergence

is

<

every

On

*.

(\ x n /)

indefinitely diver-

have however, as

Theorem: then the sequence

is easily proved, the a null sequent e whose terms

// (x n ) is is

(

J

all

have the

and of course

definitely divergent;

same sign, to

-foo

or

\Xfi/

OO, according as 9

the

xn 's

are all positive or all negative.

We

have therefore to consider three typical equence, namely: a) Convergence to a number f, to accordance with 40, 2 OO, ')) divergence Since the behaviour b) shows some analogy wo modes of expressions in use for it vary. Usually, it i

m

i

.

ilivergence

(the

mode

of expression

mentioned

in

modes in

of behaviour of a accordance with 39;

and 3; with is

a)

true,

c)

neither of the

and some with c), b) is reckoned as

the last footnote cannot

be consistently maintained) but "limiting values" -J-oo and

oo are

at the

We

therefore speak, in the cases a) and b), of a deinite, in the case c) of an indefinite, behaviour; in case a), and only in his case, we speak of convergence, in the cases b) and c) of divergence. Instead of "definitely and indefinitely divergent", the words "properly and im-

name time spoken

of.

Since, however, as remarked, definite diproperly divergent" are also used vergence still shows many analogies to convergence and a limit is still spoken of in this case, it does not seem advisable to designate this case precisely as

that of 7

proper divergence. From some place onwards

this is certainly the

case

Chapter

(58

To

facilitate

we

occur,

finally

II.

Sequences ot real numbers.

the understanding of certain cases which frequently introduce the following further mode of expression:

// two sequences (% n )and(yn } 9 not necessarily conrelated to one another that the quotient vergent, are so

Definition 5.

Xn

yn tends,

zero 8

*-|-oo, to a definite finite limit different from two sequences are asymptotically

for

then we shall say that the proportional and write briefly ,

// in particular this limit is

asymptotically equal and

1,

then we say that the two sequences are

write,

*n Thus V"

^y-

for instance

__ a

**

4- 1

1 -f

di

more expressively

(5 w"

1

*

2 H-----h n

~

+ 23) ~ log n

,

\'n

I

+ 1 - ^/n ~v

,

1/n

l-4-2 2

2

ri

,

+ .**4-n ^- j n a

3 .

These designations are due substantially to P. dw Bois-Reymond (Annali matematica pura ed appl. (2) IV, p. 338, 1870/71).

To

these definitions

we now

attach a series of simple, but quite

fundamental

Theorems on convergent sequences. Theorem

41.

1.

A

convergent sequence determines

its

limit

quite

9

uniquely

.

Proof. (xn

is

')

If

xn

+!;,

and simultaneously xn

are null sequences.

then also a null sequence,

By 28,

i.

e.

|

',

then (xn

f)

and

2,

= f,

q. e. d.

10

8 xn and yn must then necessarily be =}= /n?w some place onwards. This not required for every n in the above definition. 9 A convergent sequence therefore defines (determines, gives . .) its limit quite as uniquely as any nest of intervals or Dedekind section defines the number to which it corresponds. Thus from this point we may consider a real number as given if we know a sequence converging to it. And as formerly we said for brevity that a nest of intervals (a;,, y n ) or a Dedekind section (A B) or a radix fraction is a real number, so we may now with equal right say that a sequence (xn ) converging to f is the real number f or symbolically: (#n ) = { For further details of this conception, which was used by G. Cantor to construct his theory of real numbers, see pp. 79 and 95. 10 The last step in our reasoning, by which the reader may at first sight be taken aback, amounts simply to this: If with respect to a definite numerical value a we know that, for every e>0, we always have a e, then we

is

.

|

\

.

,

|

|

<

A

Theorem if

xn

|

|

5g

2. convergent sequence (x n ) is invariably bounded. And /. we have u then for the limit If x n -> , then we can, given e 0, assign a number m,

K,

>

>m

such that for every n

|

xm

|

K

number

a

is

l

f-e<*n < +

and greater than

,

+

|

|

Now

for every n. |

|

then

y

e,

and therefore

Theorem

(

xn

|

Theorem if

>

which

xn -> f

2a.

have

\

\

from zero and

> K,

\

Proof. We

therefore

|

xl

[,

|

x2

.

|,

.

.

,

*

< *i

i

\.

\t\-\*n \^\* n -t\<\e\-K

xn

|

values

|

|

in the sequence,

m

then obviously

K be any bound of the numbers xn If we had K > and therefore, from some place onwards

let

|

e.

greater than the

I

>K

^

|

|

Proof.

If therefore

l>y

Convergent sequences.

8.

\

implies

xn ->

|.

\

\

\

(v. 3, II, 4)

)

is

limit

its

K.

contrary to the meaning of

by 26, 2

a null sequence

when

If a convergent sequence (x n ) has all

3.

g

or in other words, a number

xn

is

is also

y

>

its

such that \

xn

\

terms different

() \x n ^y>

4= 0, then the sequence exists,

) is.

(#n

is

bounded;

/

for every

possess a positive lower bound. e Proof. By hypothesis, J 0, and there exists an integer 12 e and therefore x n x for n . that such m, n m, % g every x numbers x x If the smallest of the (m m 2 |, 1) positive |,

n; the numbers

\

\

|

>

= > <

|

|

\

|

+

and

i |

^

be denoted by

|

= l-,

y,

>

\

.

then y

> 0,

and

.

\

.

|

|

for every n,

\

xn

\

,

|

\

\

^ y,

q. e. d.

given a sequence (# n ) converging to , we apply to the null se1 to 5, then we immediately obtain quence (xn ) the theorems 27, the theorems: If,

the only number whose absolute value is less than c is true for every e > 0. But if a 4= 0, so that a is certainly not less than the positive number e J a |.) Similarly, if we know of a definite numerical value a that, for every e > 0, we always have a K. The method of reasoning e, then we must have further a 0" involved here: "If for every z > 0, we always have a e, then necessarily a necessarily have a

every positive a > 0, then |

0.

|

is

|

<

=

|

|

|

|

For

(In fact

e.

^K+

g

|

|

<

same as was constantly applied by the Greek mathematicians (cf. Euclid, Elements X) and later called the method of exhaustion 11 Here the sign of equality in "| f *g K" must not be omitted, even when, for every n xn < K. is

precisely the

|

t

12

\

\

For n

^

m,

all

the xn 's are therefore necessarily 4=

0.

Theorem

4.

// (xn') is a sub-sequence of (x n ), then

xn

Theorem

5.

Sequences of real numbers.

II.

Chapter

70

+t;

xn

implies

'>.

sequence (xn ] can be divided into two subthen (x^ itself converges to to ,

// the

of which each converges

sequences

Theorem

6.

.

an arbitrary rearrangement

// (#') is

of

x n , then

'

x n ->

xn -> f

implies

.

Theorem 7. // x n >f and (#n') results from (#n ) by a finite number of alterations, then x n'+$. Theorem 8. // # n *l and #n "-*f, and if the sequence (x^ is to the sequences (xn') and (x n ") that from some place onwards, related so '

(i.

e.

n^>m,

for every

say

t)

' rr X n

+.

< Xrn ^ < Xvn" ^

>

then x n Calculations with convergent sequences are based on the following four theorems:

Theorem and

9.

xn

>f

and y n * r\ always implies

the corresponding statement holds for term

(x n

+ yn

)

~*

by term addition

f

+^

of

*

any

of convergent sequences. fixed number say p are null sequences, then so, by Proof. If (xn rf) |) and (y n In the same way, 28, 2 gives the is 28, 1, yn ) (f -{- 17)). ((xn Theorem 9 a. xn + f and yn +r], always implies (xn y n ) + f rj

+

.

always implies xn yn

Theorem 10. >| and yn +ri> the corresponding statement holds for term xn

and of

any fixed number In

particular:

say p

xn *

+r)>

by term multiplication

of convergent sequences.

implies

cxn

+c,

whatever

number p

denote.

Proof.

We

have

and since here on the right hand side two null sequences are multiplied term by term by bounded factors and then added, the whole expression is itself the term of a null sequence, q. e. d. Theorem 11. xn * and yn +r] always implies, if every xn =^Q and also f 4= yn

Proof.

We yn

18

Or

three,

or

jv

'

**~*f have ri

any

___

y

S-x H

definite

rj

__

number.

(yn

~

>y)

g

- (xn - g)

17

8.

Here the numerator,

Convergent sequences.

same reasons

for the

71

as above, represents a null

are, by theorem 3, bounded. Therefore sequence, and the factors S' xn the whole expression is again the term of a null sequence. Only a particular case of this

Theorem

1 1

14 .

a

the

is

xn

-

and

> g always implies, if every x n

4=0,

also

are

!

,

These fundamental theorems 8

11 lead,

by repealed

application,

following more comprehensive Theorem 12. Let R = R (x (l) z 2) x (3) ., xW) denote an exnumber a of additions, subtractions, multifinite pression built up, by to the

,

plications,

and

divisions, 1

numerical coefficients *;

,

the letters

from and

.

,

x (1) ,

o?

(9) ,

.

...

x &, and arbitrary (

9

let

be

p given sequences, converging the sequence of the numbers

(1)

respectively to

,

f

(3) ,

.

.

.,

f&

} .

Then

provided neither in the evaluation of the terms R n , nor in that of the (2) (p) is anywhere required. division by number R( (1) , > , ), These theorems give us all lhat is required for the formal manipulation of convergent sequences:

We

more

give a few

Examples. 1.

->

if

implies,

a>0,

42,

invariably,

a*"-*a. For

a*- a* fs

a null sequence by 35, 3 2. a:-*-f implies, if every

Proof.

We

log

is

(<***-*--

and also ac m

x)

are >-0, that

-* log |

.

have log

which by 38, 7

.

^

o:,,

- log

log

^

=

loff

a null sequence, since xn

(l

>

+

*"

implies

~-~- >

1

.

14 In theorems 3, 11 and lla, it is sufficient to postulate that the limit of the denominators is 4= 0, for then the denominators are, from some index m onwards, necessarily 4= 0, and only "a finite number of alterations" need be made, or the new sequence need only be considered for n > m, to ensure this being the case for all. lfi More shortly: a rational function of the /> variables (1) v w , . . . , (p) with .\;

arbitrary numerical coefficients.

,

.x-

72

Chapter

Sequences of real numbers.

II.

Under the same hypotheses as

3.

Proof.

We

we

also have, for arbitrary real Q,

have

=

Q

x%

\

in 2.,

l

\

which by 38, 8 is

(This

is

a null sequence

16 ,

since

>

1

*"-p-^

to a certain extent further completed

by 35,

and tends

to

as

n ~> QO.

4.)

Cauchy's theorem of limits and its generalisations. There is a group of theorems on limits 17 essentially more profound than the above, and of great significance for later work, which 16 and have in recent originated in their simplest form with Cauchy times been extended in different directions We have first the simple

Theorem

43.

1.

// (#

,

x19

~. X n

also

a null sequence, then

...) is

%o ~r x i ~r

9

n

>m

we have

la;

I

"r

> 0, < --

then .

m

>w

that fraction

first

For these

remains

<

n's,

that

on the

further

-|-.

hand

right

determine n

,

ltt

Examples

2.

1.

that the function a x

//

xn

*,

*'

for

But then, for every n

then so do the arithmetic

now

side

> nQ

|

Theorem

*

so that for

and our theorem is proved. Somewhat #n
*

we then have

'

have

Q

T- 2 n + 1'

fraction

we can

-

can be so chosen,

n+1

Since the numerator of the

r\ '

-

n

contains a fixed number,

%

n-f- 1

form a null sequence. Proof. If s is given

every

n

the arith-

means

metic

,

we

more

means

mean in the language of the theory of functions continuous at every point, the functions log a; and X Q

to 3. is

at every

positive point. The reader may defer the study chapters, they come into use. 17

18

of these

theorems

until, in

the later

Augustin Louis Cauchy, born 1789 in Paris, died 1857 in Sceaux. In alg&bnque, Paris 1821 (German edition, Berlin 1885, Julius Springer) the foundations of higher analysis are for the first time developed with full rigour, and among them the theory of infinite series. In what follows we shall frequently have to refer to it; the above theorem 2 may be found on his

p.

work Analyse

59 of that treatise.

By theorem

Proof.

1,

/fa-e + fe-g)+...+(*.-m is

a null sequence when (xn

From now

73

Convergent sequences.

8.

)

is,

q. e

= ^ _ |) '

d.

theorem, the corresponding one for geometric

this

means

follows quite easily.

Theorem

Let the sequence (y ya , ^77, and have all its .) Then also the sequence of geor\ positive.

3.

members and metric means

/

From yn

Proof.

deduce, by 42,

By theorem

a; By 42,

2,

this

.

-,"/:

since

^,

the

all

numbers are

positive,

we

that

2,

follows that

it

_ *i*+n -+* _ log ^yi y

1,

.

,

limit

its

2

...^

= log y '- log n

17.

once proves the truth of our statement.

at

Examples. 1.

'+!'- -4 ----f

2.

V

because

*0,

w

-

l--"-~-*

=

8.

--

4.

Because

-

n_ yn -->

-

/ (

-- \ i

1

-^

)

-

-

(v.

-2 or,

1'

46 a

because

because

in the

n

_

M JLy n r

next

may

also

),

.

we have by theorem 3, .

also

i

!^, e

'

n a relation which

n_ y n -* 1

--"

-

V^T-

therefore, i

1,

-*0. n

be noted in the form

_

"^n\^.

n ".

74

Chapter

Sequences of real numbers.

II.

more

far-reaching, and generalisation of Cauchy's

Essentially

following

yet as

1

is

proved,

easily

theorems

and

2, due

the to

$. Toeplitz:

Theorem

Let (X Q

4.

the coefficients a flv of the

,

#j

,

.

be a

.

.)

null sequence and suppose

system

(A)

satisfy the two conditions:

Every column contains a null sequence,

(a)

fl

>0

np

when

kaol Then

also a

^-

< \

By

P^O

=

,

<*nO

the

formed by

< K.

numbers

+ *nl X + an* X

X

remains \

l

*

H-----H

<*nn

Xn

null sequence.

Proof. \

for fixed

>-{-oo.

+ KiH-----\-\ann

the sequence

Xn

x

e.

There exists a constant K, such that the sum of the absolute any one row i. e., for every n, the sum

(b)

values of the terms in

is

n

i.

If

e is

given

> 0,

'Ihen for those

the hypothesis

>n

so that for every n for these w's |

xn '

is

, {}

it

we may now we have a nQ x

50 that for every

(as

m

is

fixed)

e,

choose n

-----1- a ~{ nm x m our theorem is proved.

\

|

then -< is

m

n>m

w's,

(a),

\

In applications

determine


.

> m, Since

useful to have the following

Complement. If, for the coefficients a^ are substituted other numbers a^ a*i *^ x ^, obtained from the numbers a^\ by multiplication t

=

19

Theorem

has been generalised in several ways, in particular en Satning af Cauchy, Tidsknft for Mathematik, (5) Vol. 2, pp. 81 84. 1884) and O. Stolz (t)ber erne Verallgemeinerung eines Satzes von Cauchy, Mathemat. Annalen, Vol. 33, p. 237. 1889). The above formulation, due to O. Toephtz (Uber hneare Mittelbildungen, Prace matematycznofizyczne,

Cauchy's

by J. L. W. V. Jensen

1

(Cm

Vol. 22, p. 113 119. 1911), is in a certain sense a final generalisation, for this reason that it shows (1. c.) the conditions, recognised in Theorem 5 as sufficient, to be ' also tiecf \\ary, tor \ n - to imply x n -* in all cases (cf. 221, and the work of /.

Sthur: Cber hneare Transformationen in der Theorie der unendlichen Reihen, Jour. angew. Math., Vol. 151, pp. 79111. 1920).

f.d. reine u.

8.

then the

M

XA

by factors

75

Convergent sequences.

in absolute value less than a fixed constant a,

numbers

/0m

a null sequence.

The a^'s

Proof theorem 4;

for,

o

if

is

p

From Theorem Theorem

-+Q by 26,

5.

4

we may now deduce xn

//

an^

a^

>f,

tfci

also the sequence formed by the

We now

Proof.

whence our statement by theorem 4.


the

coefficients a^ v satisfy,

Theorem 4,

(b) of

1,

remain

n

(a) and (b) of and the sums

conditions

the

satisfy

a'np

i+"- +

+

the conditions (a)

also fixed,

besides

further condition

//t

numbers

have

once follows,

at

in

consequence of condition

(c),

Before giving examples and applications of these important theorems, the following further generalisation, which points in a

we may prove new direction.

Theorem

6.

the

//

coefficients

besides the conditions (a), (b)

and

(c)

a fiv of the system (A) satisfy, mentioned in Theorems 4 and 5,

the further condition, that (d)

the

numbers in each

Proof.

the

of

sequence, i.e. for fixed p, a nn _ p then it follows from x n -^>

"diagonals" of

A

form a null

>0 when n+-\-<x>, and yn

+r] that the

numbers

Since

x "V

= (x \~v

v jnv

-

we have Zn

=

n J|j

#n'

v=0

10

In the applications,

11

For

ynv\Z

we

shall generally

positive a^v, this theorem

may be

"Uber Summen der Form a b n -f a t 6,,^ di Palermo, Vol. 32, p. 95-110. 1911).

+

have found

-

-f-

An =

1.

a paper by the author " aw 6 (Rend, del circolo mat. in

76

Chapter

Theorem 4 and its complement, the factors yn _ y are bounded. and sequence f) the second sum be written in the form

Here the for

sum

first

if

tends to zero, by

a null

is

(x v

And

Sequences of real numbers.

II.

v=0

v=0

we

by theorem numbers a'nv

see,

for the

that

5,

and thereby also zn , tends +$rj; satisfy, in consequence of (d), precisely

this,

= ann -

v

the condition (a) there stipulated.

Remarks, applications and examples. 1 is a particular case of Theorem 4; we need

44. Theorem

1.

only put, in

the latter,

a0 = a ni = Theorem 2 (a), (b),

(c) 2. If

it

follows

22

,

(n

>

= 0,

The

5.

1, 2,

.

.

)

conditions

fulfilled.

aa

are any positive numbers, for which the sums

. . .

,

from xn ->

we need

In fact,

^~T\

way from Theorem

derived in the same

is

are

= ann =

-

f that

only put, in theorem 5, an

_x

/

'~on

\ -

= 0, 1,2, = 0,1

... n

the statement is correct. The conditions (a), (b), (c) are fulfilled. == 1 , we again obtain Theorem 2. The 2 a. The theorem of no. 2. remains true for f = + oo or f = oo same remark holds for the general theorem 5, provided all the a^v's are >: there. For if xn + oo and, as in the proof of Theorem 4, m be so chosen, > G-|- 1, then for those n's given G>0, that for every n^>m we have to see that

For

<x n

.

+

rt

we have xn ' In

>(G -f 1) (amm+l +

-f ann )

. . .

consequence of the conditions so choose n that for

and

(a)

therefore

- a no

every

. . .

\

in

(c)

-

x \

n>w

- an m

\

xm

. \

Theorems 4 and 5, we may we have aj/>G. Hence

*'-> + 00. u

3.

+

Instead of assuming the an 's positive and an -> GO it suffices [by (b)] a a n -> -f O, with the proviso, however, -f a,

to require onlv that

that a constant I

|

|

|

|

+

K exists, such that

o

+

I

(For positive a n

,

I

i

J=l

I

+

.

gives

-

.

23

+

I

.

.

+

,

|

|

for every n

n

I


all that is

a

' |

+

a,

+

.

.

.

+

an

|.

here required.)

84 Of course it also suffices, that the a n 's be from O. 50, provided only o n ->-foo. The #n "s must then be considered from that point onwards, after which an is 0. 88 If oc m is the first of the a's to be then the xm "s Jensen, loc. cit. =j= 0,

>

are defined only for

w>w.

Convergent sequences.

8.

4. If in 2. or

we

3

o

put, for brevity,

n

ce

77

yny then we

xn

-

i

and provided the an 's satisfy the conditions given in 2. or 5. If we write further y +y l -f+yn = ^n, and + then the last result takes the form:

-*,

--

Thus we have,

6.

..

lim Similarly

= An

cc n

A n _^

for instance,

+ 2-I-...4-* = lim K

1

by

..

(n

>

= ^4

a

1,

+ ** = 4

+

satisfy the conditions

)

5.:

n

-

wa

w^

<* t

v _v J-_Jua-*f, ^n -n i

provided

-^n

and provided the numbers given in 2. or 3.

3.

- .

.

v

obtain:

a

(n

l)

-

= hm s n 2n

1 = -^-. -^

-

2

1

we have lim

+ 2 +...+n --- = lim w -n*----n a

l

9

,.

-

--

3

-

a

-(w

-

3

1

=

3

I)

and generally LF

,.

lim

*

it

p denotes a 7.

of the

-f-

Zr

-j-

.

.

.

-J-

!

:

n*

lim-

positive integer.

Similarly

we

we

find, if

sequence of numbers

1

(

anticipate the proof in -\

n

\

log

1-f-

n log 2 -{-...+ log ^ .

!

fulfil

seeing that

(a), (b) it is

=

convergence

!

= lognln

. .

1

'

and

(c)

I.e.

loort

Ino- -M! /-v/

of the theorems 4 and 5; for

and therefore

while

toi

of the

_

V^

The numbers

the conditions

*np+Qi

)

46 a

/

log n

nlogn 8.

W = lim

every n.

Therefore

o;n

--? always

implies

<

l

(v -

38

if

'

2>

p be

fixed,

78

Chapter

II.

Sequences of real numbers.

The same

specialisations as were given in course also be applied to theorem 6. following theorems: 9.

may

of

From xn

(a)

*>

and y n x,

(b) If

(#) and

(yn)

-^-rj

?__! 4-

and 8. for theorem 5 merely mention the two

2., 3.

1.,

We

it

always follows that

a-g

y n _ 2 -f ... j-xn y

fr

are two null sequences, the second of which

fulfils

the extra condition that for every n

remains less than a fixed number K, then the numbers

form a

null sequence. (For the proof we put a nv = The reader will have noticed that it is in

10.

rows of the system (A) of theorem 4 should break

y n - v in theorem 4.) no wise essential that the

off exactly at the

n ih term.

On the contrary, these lows may contain any number of terms. Indeed, we have mastered the first principles of the theory of infinite series, we see that these rows may contain even an infinity of terms (a no ., a nv /tlT ,

.

.

provided only the other conditions imposed on the system be fulfilled. theorem hereby indicated will be formulated and proved in 221.

9.

We

are

The two main

now

after shall ,

.

.

.),

The

criteria.

to attack the actual

sufficiently prepared problems of There are two mam points of view from which we propose, in what follows, to examine the sequences which come before We have above all to consider the us.

convergence.

Problem

a given sequence (xn ) convergent, or definitely (Briefly: How does the sequence behave And if a sequence has pioved to to with respect convergence?) that existence of a limiting value is ensured, so the be convergent, we have further to consider the A.

7s

or indefinitely divergent?

Problem

To what limit $ does the sequence (#n ), recognized to be convergent, tend? A few examples may make the significance of these problems clearer: If for instance we are given the sequences B.

examination of their construction shows that there are always two (01 more) forces which here, so to speak, oppose one another and thereby One force tends to increase, call forth the variation of the terms.

The two main

9.

the other to diminish them,

the two will get the upper

79

criteria.

and it is not clear at a glance which of hand or in what degree this will happen.

Every means which enables us

to decide the question of convergence or divergence of a given sequence, we call a criterion of convergence or of divergence; these serve, therefore, to solve the problem A.

The problem B is in general much more difficult. In fact, we or else is trivial. The latter, might almost say that it is insoluble, because a convergent sequence (xn \ by theorem 41, 1, entirely determines its limit f which may therefore be regarded as "given" by the ,

On account, however, of the sequence itself (cf. footnote to 41, 1). boundless complexity and multiplicity of form which sequences show, this conclusion does not seem very satisfactory. We shall wish, rather,

consider the limit | as

not to

Dedekind fraction,

section, or

still

in particular a

"known",

until

the question of

better a nest of intervals, for instance

a radix These latter especially are the number with which we have always been in

this

light,

numerical calculation of the limit 1

considerations of very

is

usually in

second-rate

are precisely equivalent. (nests, sections, sequences, .) that the representation of a real number by a .

further,

If

we observe

sequence may of representation, our problem B

be considered as the most general mode may be stated in the following form.

Problem

call

imporiance, for from a modes of representation for a real number

theoretical point of view, all .

we may

.

This question, one of great practical significance, theoretical

before us a

decimal fraction.

methods of representing a real most familiar. If we regard the problem it

we have

Two

convergent sequences (#J and (#) are given, or not both define the same limit, or whether or not the two limits stand in a simple relation to one another? B'.

how may we determine whether

A

few

l-

Let

examples

will serve to illustrate the kind of question referred to:

_/i J.1Y

1

^

'

45.

fi^ *\

(v. 46 a and 111) seen to be convergent. denotes the limit of the first sequence, that

Both sequences are quite easily But

it is

not so apparent that

of the second 2.

is

= f *.

Given the sequence _!_ 1

in

if

which the numerator

of

3 '

~2~'

^5

17 '

(e.

g. 41

= 2-17 + 7),

41^ '

29

'

"

each fraction

rator of the last fraction preceding to

one

"12

is formed by adding twice the numethe numerator of the last fraction but

nnd similarly for the denominators.

=

The question

of

1 Numerical calculation of a real number representation of that number by a decimal fraction. For further details, see chapter VII T.

80

Chapter

II.

Sequences of real numbers.

convergence again gives no trouble, nor does the numerical evaluation of the but

limit,

how

are

we

to recognise that this limit

and

let xn be the perimeter of the regular polygon with n sides inscribed in the circle of radius 1. Here also both sequences are easily seen to be conare their limits, how does one see that here ' = vergent. If f and

8?

f

These examples make

it

seem

sufficiently probable, that

Problem

B

We

therefore considerably harder to attack than Problem A. confine our attention in the first instance entirely to the latter, and to begin with make ourselves acquainted with two criteria, from which all others may be deduced.

or B'

is

First

46.

main

criterion (for

monotone sequences).

A

monotone bounded sequence is invariably convergent; a monotone sequence which is not bounded is always definitely divergent.

A

monotone sequence always behaves definitely, and then and only then convergent, when it is bounded, and then and only then divergent, when it is not bounded. In the latter case the diveroo according as the monotone sequence is gence is towards -f- oo or (Or, therefore:

is

ascending or descending.) Proof, a) Let the sequence (#n ) be monotone ascending and not

bounded.

^

Since it is then (because x o^) certainly bounded on n cannot be bounded on the right; given any arbitrary (large) positive number G, there is then always an index n Q , for which the

left,

it

But then, since the -sequence

monotone increasing, we have for and fortiori, so, by Definition 40, 2, actually xn -+ oo. and Interchanging right left, we see in the same way that a monotone descending sequence which is not bounded must oo. Thus the second part of the proposition is also diverge to proved. every

n

>n

,

a

+

b)

There

xn

is

> G,

Now is

let (x n ) be a monotone ascending, but bounded sequence. then a number K, such that x for every n, so that n <; |

=

\

K

K

for every n. The interval J . aj therefore contains all the terms x of (xn ); to this interval we apply the method of successive bisection: denote the right or the left half of / by / according as the .

We

.

9

,

right half does or does not still contain points of (#J. From / we select one half by the same rule, and call this /3 ; and so on. The 2 intervals of the nest so constructed have the properly , that no point

The reader should

illustrate the

circumstances on the number-axis.

9.

The two

mam

criteria.

81

of the sequence lies to the right of them, but at least one lies inside each of them. Or in other words: the points of the sequence (while monotonely progressing towards the right) penetrate into each interval,

but do not

emerge from it again; in each of these intervals, therefore, may therepoints from a certain index onwards come to lie. fore, if we suppose the numbers n if n^ y properly chosen, say that:

We

all

.

In J k more xn 's.

all xn 's

lie

now

n

with

>n

k

,

.

.

but to

the

of

right

Jk

no

lie

number determined by

the nest (/M ), it can at a; 0, choose the index p given w *f. For np all the xn 's lie, so that the length of / is less than 6. For n must have we for these with in so that ns f, together /, If

is

f

the

once be shewn that

>

if e is

>

,

* is therefore a null sequence, and x , q. e. d. n a and we see that monotone suitable of left, By interchange right bounded must also be descending convergent. Thus every sequences of the theorem is part proved.

(xn

)

Remarks and Examples. 1. I

%n

|


We

K

,

first

draw attention again

we may have

to the fact that (cf. 41, 1)

for the limiting- value

the equality

|

|

even when

=K

.

Let

As

monotone

the sequence is ed.

increasing-,

Of

// is therefore convergent.

for every n,

which

e.

gf.

tional value, or whether in short: connection

n

for

its

limit



-

^

n -f- T^^ 1 f we know no more, so

and as xn

= 3 becomes

37

~^<

bears a close relation to a an answer to problem B

1.

*

s a l so far,

Whether

it

bound-

than that

has a ra-

number appearing

in any other cannot here be perceived at once. Later on we shall see that is equal to tt e natural logarithm of 2. I. e. the logarithm of 2 whose base is the number e introduced in 46a below. 3.

Let

increasing chose

o?n

(cf.

Jo

=(l+s + -5--f-H \ -

6, 12). Is then for

w>2;

The sequence

it

n/),

so that the sequence (xn)

bounded or not?

n>2

is therefore

If

G

is

is

monotone

given arbitrarily

> 0,

OT

not bounded and consequently diverges

+ -f

oo

.

82

Chapter

Sequences of real numbers.

II.

4. If o = (xn yn ) is an arbitrary n'est of intervals, the left and right endpoints of the intervals respectively form two monotone, bounded and therefore |

convergent sequences.

We

then have

lim rn

As a

16a.

= hm yn =

^v

We on

~'

we ^

p. 78)

We

first

n

*i

(cf.

the general

remark

increases.

the second sequence 2

that

is

monotone

n I>

in fact equivalent

is

J^AAI/

'

=

descending, that is to say that for

This inequality

x * ;

*.-

the sequences behave as

proceed to show

two

the

consider

will

v ~\

have no means of perceiving immediately

how

.

\

and

*

=a

yn )

.*\

__-

"

\

example,

particularly important

sequences whose terms are

(xn

3

to

or to

But the truth of equality 10,

7

//w's

we

inequality have, for a

>

is

evident, I,

a

--\=

by Bernoulli's and every n > 1,

since,

in-

or in particular

As, moreover, yn

>1

the sequence (yj is monotone desIts limit will ofter therefore convergent

for every n,

cending and bounded, and 4 occur later on; it is, since Rulers time, denoted by the special letter As regards this number, we can only deduce for the present that

which for

e.

g.

n

=5

becomes .

3

That

^

66

is to say, each inequality follows from all the others. Euler uses this letter to designate the above limit in a letter to Goldbach Nov. 1731) and in 1736 his work: Mechanica sive motus scientia analytice 4

(2.*).

e.

exposi ta,

m

II, p.

251.

9.

The In

fact,

first

# n _x

The two main

83

criteria.

of our two sequences, on the contrary, here means 5

is

monotone ascending.

< xn

+ (1

l\n

/

\n--l

1

,T--]

or

2

'

T=

l~^< (" \ n n7

e-

2

But, again by 10,

The sequence

7,

(x n )

is

we have

/

( \

~

l

actually for every #

therefore

monotone

Vfv

>

1,

increasing.

As, in any case,

i+ (1

\

n

n+i

i)

we

have, for every w, A: W ^JVi, iAs, finally, the numbers

c.

(jc w )

also

is

bounded and hence

con-

we conclude

once

vergent.

all positive and (by 26, 1) form a null sequence, that (x n ) has the same limit as (j' n ). Thus

are

lim x n

And

for this

=

lim j> n

number e we have furthermore,

=

at

.

as has

appeared in the proof, in

a nest of intervals defining it. 3, (It provides, for instance taking n 2 5 shall however become acquainted later e we the inequality of H t-; on ( 23) with other sequences converging to e which are more convenient

< <

y

for numerical calculation.)

This

is

the

number

e that (cf. p. 58)

forms the base of the natural

We

shall accordingly agree to use the symbol log to mean logarithms. this natural logarithm to the base e, unless the contrary is expressly stated.

The fact

that

fruitfulness of the first it

allows

us to

main

criterion is

due above

all

to the

deduce the convergence of a sequence of

numbers from very few hypotheses, and these such as are usually very On namely, from monotony and boundedness alone. easy to verify it still relates only to a special, even though and important kind of sequence, and therefore

the other hand, however, particularly 5

frequent

Cf. footnote 3.

84

Chapter

ot real

Sequences

IT.

numbers.

appears theoretically insufficient. We shall therefore ask for a criterion which enables us to decide quite generally as to the convergence or divergence of any sequence. This is accomplished by the following

Second main criterion

47.

An

st

form).

(1

convergent if and only if, given arbitrary sequence (xn ) a number n n (e) can always be assigned such that for any two indices n and n' both greater than n , wz have in every case

s

>

We

is

=

,

,

X n >\<e.

\Xn first

give a few

Explanations and Examples. 1.

and the

The remarks 10, 1, 3, 4 and 9 are also substantially applicable here; reader is recommended to read them through once more in this con-

nection. to put it in intuitive language: all o;n 's with 2. The criterion states very high indices must he very close together. and let every term after these be the arithmetic 3. Let o; = 0, x t = 1 mean between the two terms which precede it, i. e. for n"^2 ,

s

= In this evidently not monotone sequence it .. #8 = o;4 = on the one hand, that the differences between consecutive terms form sequence; for it may be verified quite easily by induction that

so that xa

,

,

jjr

,

.

.

is clear,

a null

xn + 1 and so tends to 0. all

On

the following ones

choose p so large that

xn

_ 2"

the other hand, between these two consecutive numbers lie.

2p

<

,

^>0, we

therefore, after s has been assigned

If

we have I

Xn

- Xn |< 9 '

nd mam criterion the sequence (xn ) provided only n and n' are ^>p. By the 2 is therefore convergent. The limit { also happens to be easily obtainable. A little reflection in fact leads to the surmise that f = J-. In point of fact, the formula

*w

2

~

2

(n 1 )**

~3~3*

1

2*

can immediately be proved by induction and shows that xn null sequence. Before trying to fathom the meaning of the 2 nd further,

we proceed

Proof, brevity

8

it

its

This

That the condition

follows that

true for if

actually a

main

criterion

to give its

a) e condition

is

is

n=

is

and

of the

necessary,

1.

i.

theorem e.

that

fc


,

it

is

us call

let is

** + * & true for n = k

From gfc+a -s + 1 =

proved for every n

it

always

it

for

fulfilled

^-f.S-JIJLzA &

-|-

1

.

The two

9.

if

(# M )

is

e

|

xn

is

|

also

<

is j

< -^

,

--

is a null seen thus: If ", then (x n ) n 0, we can so choose n that for every n -

>

>

besides w,

If

.

85

criteria.

is

convergent,

sequence; given

mam

we

also have

>W

n

,

then

;r |

,

n

j

and so

which proves this part of the theorem. condition is also sufficient is not so easy to see b) That the eWe again prove it constructively, by deducing from the sequence (xn ) a nest of intervals (/J and then showing that the number determined thereby is the limit of the sequence. This is done as follows: e provided xn must always be being chosen, xn Any e > some exceed and the indices n n' both sufficiently large value. only If we suppose the one fixed and denote it by p, then we may also

<

'

|

>

say: Given any e far to the right as

If

we choose 1)

There

0,

we

There

can always assign an index p (actually, as P please) so that for every n

>

=

is

-r

-77,

4

&

... then ..., 7^, u

,

we

get:

an index p^ such that

n

for every 2)

we

successively is

\

>p

an index p

n

for every

>

we have

1 ,

p^

which we

,

t

<~ may assume > p xpi < xn -^ |

we have

,

xn

xpi

.

\

and so on. A step of this kind gives: which we may assume k") There is an index p k

such that

,

\

|

lt

th

>

,

n

for every

we form

Accordingly 1.

for in

The

n>p whole

with n >>

>p

we have

k,

|

the intervals

xPl

xPi

Jk

xp

xn

p k ^ If such

that

< o*

|

:

xn 's /t ; | in the x It therefore contains particular, therefore, point p ^. lt or part the interval xPt #P2 J, in which all x 's interval

|

.

.

.

call

-f-

.

As

.

it

contains

all

the

+

.

n

they lie in the common part of the two intervals. This common part we denote 2) by /a and may state: /2 lies in f and contains all points x with n and p k> p^. If in this result we replace p^ and p^ by p k _ lie.

p.2

these points also

lie in

/

x ,

>

and denote therefore k) lies

in

by /

the portion of the

/k-1

we may

fc

,

points xn with 4

n

>

interval

then state:

/

fc

o:^

lies

in

^

.

.

.

xp

/fc-1 and

^

+ ^ which contains

. fc

(G51)

all

86

Chapter

But (Jk

Sequences of real numbers.

then a nest of intervals;

is

)

II.

~

for

each interval

the

in

lies

k>

preceding and the length of

Now

f

if

number

the

is

Jk

is

<^

.

thus determined,

we

assert,

finally,

that

*-* In

an arbitrary

if

fact,

< e. We

large that

>

e

be now given, we choose an index

r so

then have

&

for every

n

> pr

" , |

xn

f

>

<e

is |

since f, together with all x n 's for n p r lies in This proves all that was required 7 of Jr is e. ,

<

48.

,

/r and

the

length

.

Further examples and remarks. easily now be seen to be convergent

The sequence 45, 3 can we have here, if n'>w: 1.

1

I

If

For

l)'-n-i\

(

inside the bracket, we take the successive terms in pairs, value of the bracket is positive, so that 3) that the

we

see

(cf.

later

81 c,

It

we now let the first term we see further that

stand

by

itself

and

t ike

the following- terms in

pairs,

Therefore |

is

xn

ay

is \

<,

f provided n and n are both

>u

The sequence

;j

therefore convergent.

#

If

2.

=

(l

not convergent.

-f-

--

+

With the

H

J

,

we have

aid of the 2 nd

the fact that here the e- condition

is

already seen in 46, 3 that (xn )

main

criterion, this is dcducible

not satisfied for

<<

.

is

fiom

For however n

It

may be

chosen,

we have

for

n

>w

and

n'

2 n (also therefore

>w

)

< 8.

The sequence is therefore divergent, and in fact definitely evidently monotone ascending. The previous example shows at the same time that the contrary of the

not therefore divergent, since 3.

it

is

fulfilment of the $- condition is the following (cf. also 1O, 12)": Not for every choice of can n be so assigned that the e- condition is then fulfilled;

s>0

there exists on the contrary (at least) one particular 7

number

e

>

such

that,

We

terion.

shall become acquainted with other proofs of this fundamental criThe proof given above leads immediately to the definition of the limit

by the

aid of a nest of intervals.

criterion p. 303.

may be

1897).

A critical account of earlier proofs of the found in A. Pnngsheim (Sitzungsber. d. Akad. Mlinchen, Vol. 27,

The two

9.

number n

above every

,

87

criteria.

however large (therefore infinitely often) two positive in-

n and n may be found f

tegers

mam

for

which

4. The 2 nd main criterion is now usually, after P. du Bois Reymond (Allgemeinc Funktionentheorie, Tubingen 1882), called the general principle of converIn substance, it originated with B. Bolzano (1817, cf. O. Stolz, Mathem. gence. Ann. Vol. 18, p. 259, 1881) but was first made a starting point, as an expressly formulated principle, by A. L. Cauchy (Analyse algebrique, p. 125).

Our main criterion may also be given somewhat different forms, which are sometimes more convenient in applications. We suppose f the notation for the numbers n and n so chosen that n n, and n k where k is again a positive integer. therefore we may write n'

= +

We

>

,

then formulate thus the

Second main criterion (Form la). The necessary and sufficient condition for sequence (xn

]

is that,

From clusions.

chosen,

this

every

finite later

further .

.

,

con-

kn ,

n

.

.

.

>n

*+*- *!<

sequence of differences

forms a null sequence.

we

we can draw

can always always have

.

this implies that the

understood, of (X M ). In

(e)

quite arbitrary natural numbers k lf & 2 , have, in view of the above, for every I

But

e

statement of the criterion

we suppose then we must If

convergence of the

> 0, a number n = n n > n and every k^>l we

given any

be assigned so that for

the

49.

In

order to

make

ourselves

more

readily

a difference-sequence it, dn is therefore the difference between xn and some determ. Our criterion may then be formulated thus: will call the

sequence (dn )

for short

Second main criterion (2 nd form). The sequence (#J

and only

is

convergent if difference-sequences is a null sequence. Proof. The necessity of this condition

have

still

to

show

that

it

is

sufficient. difference-sequence tends to 0, and

We

if

59. every one of

its

we have

just proved; we accordingly assume that

have to show that (xn ) conwere divergent, there would, by 48, 3, exist a particular number e such that above every number nQ} however large, two numbers n and n' n -f- k would always he, for which the

every

verges.

But

if

(#n)

=

difference

*

was

88

Chapter

Sequences of real numbers.

II.

Since this must be the case infinitely often, "there would tion to the hypothesis

(x n ) must therefore converge, q.

to 0;

(dn ),

8

exist difference-sequences

in contradic-

which did not tend

e. d.

Remark. If (,vw ) is convergent, and we choose a particular difference-sequence we therefore certainly have dn -> 0. But it should be expressly emphasized

On

the contrary, alone the convergence of (x n ) need not follow. that from dn -> for this, it is only sufficient that every arbitrary difference-sequence (not merely a particular one) should prove to be a null sequence. If for instance the sequence (1, 0, 1,0, ],...) is considered, every differencey

s (from some point onwards) are even numbers is a null Nevertheless the sequence in question is not convergent. Similarly in

sequence for which sequence.

all

kn

the divergent sequence (xn ) with x n

+

1

J

-f-

.

.

.

evety difference-sequence

-f-

which the indices k n are bounded forms a null sequence.

for

Extending somewhat further the

we may

criterion,

finally

formulate

Second main

51.

obtained formulation of the

last

thus:

it

criterion (3 rd form).

9 is any sequence of positive integers which y> k k are and to -|ni GO, 2 k^ any positive integers (withdiverges out any restriction), and if we again call the sequence of differences ~ X 'n+ *n X 'n n

If "i>

-

i'2

>

.

,

.

.

.

.

.

,

l

for short a difference-sequence of (x n ), then for the convergence of (x n ) it is

again necessary and sufficient that (dn ) is in every case a null sequence. Proof. That this condition is sufficient is obvious from the pre-

ceding form of the criterion, since (d ) must, in the present case also, n. And that it is necessary always be a null sequence when v n is chosen 0, there certainly exists, if may at once be seen. For if e is chosen ri

>

convergent (v. Form and every k 1, we have

la), a

is

(x n )

number m, such

that for every n

>m

^

I

I

As

v n diverges ->

-|-

for

v ^n+k

Y ^n

GO, there

must be

>H

we have

n

O,

But then, by the preceding, we have,

i.

e.

(dn )

is

a null sequence, q.

^

I

^-

I

a

number n such vn

always

for n

>w

,

>

that

m.

always

e. d.

8 For if we denote by n it n 2 the infinite number of values of n for j, which that inequality (each time with a suitable choice of k) is assumed to be possth lh w a th terms were all in ible, a difference-sequence would exist whose Wj 3 absolute value z ^ 0. This could not then be a null sequence. & Equal or unequal, monotone or not monotone. ,

.

.

.

,

^

()

,

,

.

.

.

10.

Limiting- points

and upper and lower

and upper and lower

10. Limiting points

89

limits.

limits.

The concept

of the convergence of a sequence of numbers as two preceding paragraphs admits of another, somewhat more general mode of treatment, by which we shall at the same time become acquainted with some other concepts, of the utmost

defined

the

in

importance for

all

comes

that

we have

In #9, 6,

after.

already illustrated the fact of a given sequence

being convergent by saying that every e- neighbourhood (however all the terms of the sequence with the possible small) of f must contain a of finite most. There in eveiy number at is therefore exception

(#

)

neighbourhood of , however small, certainly an infinite number of terms of the sequence. For this reason, f may be called a limiting point or point of accumulation of the given sequence. Such points may, as we shall at once see, occur also in the case of divergent sequences, and

we

Definition.

define therefore quite generally: number shall be called a limiting

A

point*

of

every neighbourhood of f , however small, contains an infinite number of the terms of the sequence; or, therefore, if, for 0, there is always an infinite number of indices n any chosen e a given sequence (#J

if

>

for

which

Remarks and examples. between

this defimt.on and the definition of limit given as already indicated, in the fact that here r n <^F needs to be fulfilled not for every n after a certain point, but only for any infinite number On the of w's, and therefore in particular for at least one n beyond every w of a conveigent sequence (.) other hand, in aceoi dance with &9, the limit 1.

The

distinction

in 5JO lies,

|

|

.

always a limiting point of the sequence. 2. The sequence 6, 1 has the limiting; point 0; 6, 4, the limiting points and 1. (Every number which occurs an infinite number of times in a sequence (xn is ipio iacto a limiting point.) 6, 2, 7 and 11 have no limiting point; 6, 9 and 10 have the limiting point 1. 3. We now form an example of more than illustrative significance: If p is an integer 2, there is obviously only a finite number of positive fractions for which the sum of numerator and denominator = />, namely the fractions is

)

>

I

-

&

1

in their

,

....

Of these

.

p

=

2, 3, 4,

W

.

.

.

1,2,

which contains

all

positive

.

out

all

those which are not

consider in succession all the fractions thus This gives the sequence, beginning with

1,3, -1,4, 2>-J.T ..... rational numbers.

we insert the same number with we have in the sequence *

left

now

lowest terms, and

formed for p

we suppose

1

If

after

each of these numbers

sign changed and start with

German: Jliiiifunffswert, Haitfungspunkt

or

as first term,

Hdu/ungsstelle.

(Tr.)

53.

90

-1,

0, 1,

(b)

2,

Sequences ot real numbers.

II.

Chapter

-2,

-A,

*-,

JL A2 _A "2*3'

-3,

3,

_JL

'

3

JL 4

*

J-,

'

-4,

-3.4,

' '

'

thus formed obviously all rational numbers occurring, each exactly once. For this remarkable sequence every real number is a limiting point; for every neighbourhood of every real number contains an infinity of rational

numbers

12). (cf. p.

We

shall frequently make use of the principle of arrangement in order therefore formulate it somewhat more generally: applied in this example Suppose that for every k of the series k = 0, 1, 2, ... a sequence 4.

We



(&)

(fc)

&<

)

&&

* *

t

/Jfe (.**

*

~~ "| 1*

)

P &)

*

*

1 '}

We can then, in many different ways, form a sequence (xn) which conis given. tains every term of each of these sequences and contains it exactly once. The proof consists simply in assigning a sequence (xn ) which fulfils what For is required. low the other:

this

purpose

r (t)

The "diagonal" then contains

of this

all

we

write the given sequences in rows one be-

..(*)

^(fc)

system which joins the element

elements x*

which A

for

n

-f

= p,

x^

to the element

and no

others.

1

x^

They are

number. These terms we write down in succession, taking /> 0, 1, 2, p ., and describe each of the diagonals say from bottom to top. Thus we obtain the sequence 4- 1

in

.

a:<

> '

"'O

x (l) '

x 1(0} *

z (2) *

a:

(1)

a:

(0)

*g

1

x<

*

'

rE< 1

.

2) '

*

*

*f

which evidently fulfils the requirements. (Arrangement by diagonals*). Another arrangement frequently used is that "by squares". Here we first

write the elements

x^

p) ,

a;j

,

...,

of the

x^

p

ib

row, then the elements

1 in the above system: as^"" *, . . ., ad*. These standing vertically above x 1 terms are then written down in succession for p = 0, 1, 2, . groups of ., and this gives, beginning with

2+

:r

(0)

^0

*

rr (1)

.

'

x^ 1

tf

(0)

1

(2) x *0

'

x1(2}

x2(2)

'

x2

f

X2M '

X (Q)

the arrangement by squares**. If some or all of the rows in the above system consist of only a finite number of terms, or if the system consists of only a finite number of rows, then the arrangements described above undergo slight and immediately ob vious modifications. *

German: Anordnung nach

Schrdglinien.

** German: Anordnung na<,h Quadraten.

(Tr.)

(Tr.)

Limiting points and upper and lower

10.

An example

5.

exactly

1

/>-

similar to

numbers

of the

the following: For every

3. is

form

-r-H--

integers k for p = 2,

and

m

3, 4,

.

.

equal to p.

is .

we

,

We

2

we

for

which the sum

down

suppose these written

4

4 '

'

3

2"'

'

j5

Y'

^G' "

_5 '

4'

6

sequence has the limiting points

find that this

of the positive in succession,

obtain the sequence

33 '

If

there arc

p^.2

Wl

ft

/

91

limits.

0,

'

--,

1,

.

^-,

-j-,

..

and no others.

As

in the case of the limit of a convergent sequence, the limiting an arbitrary sequence may very well not belong to the sequence Thus in 3. the irrational numbers, and m 5. the value 0, certainly do itself. not belong to the sequence concerned. On the other hand, in both cases the value -J, for instance, is both a limiting point and a term of the sequence. 6.

of

points

We

proceed to give a theorem which is fundamental for our 10 due purpose, originally to B. Bolzano though its significance was first u K. Weierstrass . fully recognised by ,

Theorem.

Every bounded sequence possesses

at

least

one limit- 54.

ing point.

Proof. nest

of

contains

we left

We

again determine the

intervals. all

By hypothesis

the terms

the

of

number

in question

there exists

an

given sequence (#

tj

by a

interval

)

To

suitable

/ which

this

interval

apply the method of successive bisection and designate as /x its or right half according as the left half contains an infinite

the terms of the sequence or not. By the same rule we half a definite of as and so on. Then the intervals designate /t /Q , of the nest (/J so formed all have the property that an infinite

number

number

of

of terms is contained in each, whilst

there

endpoint

The

sequence.

>

is

always

point

at

thus

most a defined

is

to

the

number

left

of their left

of points

of the

obviously a limiting

point;

finite

given arbitrarily, choose from the succession of interwhose length is vals J The terms of (# M ), in K. n one, say ] , number infinite, which belong to the interval / then lie ipso facto

for

if

e

is

}

<

which proves all that we require. , of the definitions of limiting point and limit (or similarity in of the difference spite emphasized in 53, 1 ("every limiting value) limit is also a limiting point, but not conversely'') naturally creates a certain relationship between them. This is elucidated by the in

the

e-

neighbourhood of

The

following 10

Rein analytischer Beweis des Lehrsatzes, dafi zwischcn je zwey Werthen, entgegengesetztes Resultat gewUhren, wenigstens eine reelle Wurzel der Gleichung liege, Prag 1817.

die

em 11

In Ins lectures.

92

55.

Chapter

II.

Sequences of real numbers.

of a sequence (a?n ) may be re Every limiting point the a suitable as limit of sub-sequence of (#n). garded Proof. Since for every e 0, we have, for an infinite number

Theorem.

>

<

of indices, e, we have, in particular, for a suitable \xn || xkl A 1? we have similarly x^ 7e. 1; for a suitable n f 2 and in geneial, for a suitable n kv v -i |

|

=

<

>

=

n

= k^,

|

|

< |,

>

1

For the subsequence (x n') == (x^ thus picked out, we have xn'+t;, forms a null sequence. as (xjt n |), by 26, 2, The proof of the theorem of Bolzano-Weierstrass gives occasion for a further most important remark: The intervals Jn of the nest there constructed not only had the property that within them lay an

number

infinite

terms of the sequence (xn ), but as

of

they had the further property that to the

one

definite

any

of

the

intervals

there

lay

From

terms of the sequence.

only of the

we

noticed,

of the left cndpoint of

left

always a finite number however, it follows

this,

no further limiting point can lie to the left of the limiting ' already determined. For if we choose any real number point we have e e, we f ') 0; choosing an interval J of length ^(f ' to the the of whole of the the have e- neighbourhood lying point a finite therefore and of the left of left containing only endpoint / ' to the left number of terms of the sequence. Therefore no point of f can be a limiting point of the sequence (#J, and we have the at

once

that

<

=

56. *

Theorem.

%

ing point

(i.

e.

Every bounded sequence has a one farthest to the left).

we

interchange right and quite similarly the If

57.

,

<

<

left in

well- defined least limit

these considerations,

we

obtain

-

12

Theorem.

Every bounded sequence has a well-defined greatest limiting one to the right). farthest point These two special limiting points we will designate by a special 13

(i. e.

name.

58.

Definition. be

called*

its

The least limiting point of a (bounded) sequence will lower limit or Mines inferior. Denoting it by x,

we write

Hm

re

=x

or

lim inf x

=x

12

Or by reflection at the origin. These theorems are again obvious except in the case in which the sequence (xn ) has an infinite number of limiting points, like e. g. the sequence 53, 5. For among a finite number of values there must always be both a greatest and a least. 13

*

(Tr.)

The German

text has "untere Haufungsgrenze, unterer Limes, Limes inferior",

the

omitting

(possibly

and lower

Limiting- points and upper

10.

n *<x>). we write

subscript

miting point of the sequence, lirn

=

xn

is

p,

lim sup xn

or

p,

//

=

93

limits.

the

greatest

li-

/*

n->

n->

call /t* the upper limit or limes superior of the sequence (#n). have necessarily always x^f*. contains an infinite Since every e- neighbourhood of the point number of terms of the sequence (zj, and since on the other hand

and

We

number

only a finite

sequence can lie to the K (or similarly fi)

of terms of the

the left endpoint of any such neighbourhood, characterised by the following conditions:

The number x

Theorem. the

(or

for

lower (or upper) limit of 0, we have given an arbitrary e

but for at most a finite number

of

<x

xn

>

f*

~~ e f )

n's,

e

> +

(or

fi

z).

we

give a few examples and explanations of this theorem, us complete our definitions for the case of unbounded sequences.

Before

let

Definitions.

I.

If a sequence

unbounded on

is

the

left,

then

we 60.

a limiting point of the sequence and if it is unbounded on the right, we will say that -}-oo is a limiting point of the sequence. In these cases, however large we choose the number

oo

will say that

G > 0,

is

;

the sequence has an infinity of terms

If therefore the sequence (x n )

2.

the least limiting point, so that

is

x

15

below

G or

unbounded on the

is

we have

above

left,

+

then

G. oo

to write

= lim x n =

co .

n->+oo

Similarly

we have

to write fji

if

the sequence

is

we choose

large

x

G

n< *

or x

=. lim x n

unbounded on number G >

the

n>+ G

= + oo

the 0,

In these cases, nowever have, for an infinity of indices,

right.

we

-

The German

text has "obere Haufungsgrenze, oberen Limes,

Or:

an index n Q from and

Limes superior".

(Tr.) 14

>

There

is

after

which we never have xn another n for which xn

+ e) but beyond every index n, there is always <>*-). 15 (

/*

< <

x x

e

+e

Here therefore and similarly in the following definitions the portion of the straight line to the right of plays the part of an s-neighbourhood of that of an s-neighbourhood of oo. oo, the portion to the left of

+

59.

>

+ 14

of

also

is the

p)

(J if and only if, an infinite number of n's, xn < * or G (

sequence

still

left is

+G G

Chapter

94 3.

right

If,

its

is bounded on the left, but not on the ooj has no other limiting point, then -f- oo is but at the same time its least limiting point, and

the sequence

+

and (besides

not only

we

finally,

Sequences of real numbers.

II.

greatest,

lower

shall therefore equate the

#

limit also to -f-oo:

= lima;n = +00; n->4-oo

and correspondingly

we

have to equate

shall

lim xn

fj,

=

the

limit to

upper

oo,

oo

n->+co if

the sequence

is

bounded on the

has no other limiting point. if,

G > 0,

given any

on the

left,

(latter) case

and (besides oo) if and only

occurs

the inequality

xn holds for an infinite

right, but not

The former

>G

number of n xn

j

s,


(

Xn< -G)

but the inequality (x n

for at most a finite number of n's, that (-00), Cf. 63, Theorem 2.

is

>~G) to say therefore

when x n ->

+

GO

Examples and explanations. 61.

1.

In consequence of the preceding definitions, every sequence of

numbers

uniquely, two determinate symbols * and p oo and which bear the re(which may now, it is true, stand f or -f- oo or And the following examples show that * and n lation x ~5 M to one another 16 . may actually assume all finite or infinite values compatible with ihe in

now

of

defines, absolutely

itself

}

,

equality x

2.

<

|i.

The reader should note

particularly that

it

is

not

contradictory to

theorem 59 that an infinite number of terms of the sequence should he to the Thus for instance we have, for the sequence left of x or to the right of p. '

^e.

for the

sequence

-2, +-J,

~i

+A, _ |.

18 We say of every real number that it is + oo and reason we occasionally designate it expressly as "finite".

<

this

f

>

f

... evidently

oo

,

and

for

10.

s

Limiting points and upper and lower

95

limits.

and to the right of and both to the left of lies an terms of the sequence (and between x and p lies no term of the sequence I). It is therefore not at all necessary that there should be only a finite number of terms of the sequence outside the interval * .../^. Theorem 59 only asserts in fact that at most a finite number of terms of the sequence s or to the right of /w-f-e. can lie to the left of 3. "A finite number of alterations" has no effect on the limiting points of a sequence none, in particular, on its upper and lower limits. These K

1

p s= -fnumber

,

infinite

1

>

fj,

of

therefore represent an ultimate property of the sequence. 4. Since a sequence (xn ) determines both the numbers x and /w with complete uniqueness, and since their value, in connection with our definition, was also enclosed by a well defined nest of intervals, we have herein a new legitimate means of defining (determining, giving) real numbers: a real number shall henceforth also be regarded as "given", if it is the upper or lower limit of a This means of determining real numbers is evidently still more given sequence. general than the one mentioned in 41, 1 since now the sequence utilised need not even be convergent, or be subject to any restriction whatever 17 .

As may be Theorem. also, in the case

a) the

and

JLI

yw ;

at least

55, we have also the following

=

lim xn , is of the sequence (xn), /j the two conditions oo, characterised by following

The upper limit

limit

invariably < b)

seen, in the light of /i

:

=j=

f

'

of every

convergent sub-sequence

(xn

)

of (a?J is

but there exists

one such

stib- sequence,

whose limit

is

equal to //;

correspondingly for the lower limit.

A concept

related to that of the upper and lower limits, though be sharply distinguished from it, is the concept of must one which upper and lower bounds of a sequence (# M), which is derived from the following consideration: If no term of the sequence lies to the

=

lima;n , so that for every n, #<[/*, then /i is a bound the sequence, of but one which cannot be replaced 4) (8, smaller one; fi is therefore in this case the least bound above.

right of

above

//

by any But such a least bound also exists if there is a term of the sequence then by 59 there is certainly /i, p. For if for instance x is only a finite number of terms in the sequence which are ^> xp and We among these there is necessarily (8, 5) a largest one, say x i. e. then have, for every n, xn <^ x x is a bound above of the sebut again one, which cannot be replaced by any smaller quence, one. Every sequence bounded on the right therefore possesses a definite least bound above. Since, in the same way, every sequence bounded

>

>

,

.

,

17

Whereas therefore a

nest of intervals (with rational cndpoints)

was

at

count as the only means of defining a real number, we have now deduced quite a series of other means which we now admit as equally legitimate: Radix fractions, Dedekind sections, nests of intervals with arbitrary real endpoints, convergent sequences, upper and lower limits of a sequence In first

to

these cases, however, (with rational endpoints)

all

we saw how at once to assign a nest which encloses the given number.

ol intervals

62.

96

on the

left

Sequences of real numbers.

II.

Chapter

must have a

definite greatest

bound below, we

are justified

in the following

We define

Definition.

upper bound *

the

of a sequence bounded bounds above (invariably determinate by our pre* liminary remarks), and similarly as the lower bound of a sequence bounded on the left the greatest of its bounds below. sequence unbounded

on the right the

least

of

as

its

A

said to possess the upper bound to possess the lower bound oo

on the right left,

is

+

<x>,

one unbounded on the

.

The

concepts of upper and lower limits are due to A. L. Cauchy (Analyse Paris 1821) but were first made generally known by P. du BoisBoth nomenclature Reymond (Allgemeine Funktionentheorie, Tubingen 1882). and notation have remained variable up to the present day. The particularly con-

alg<5hnque, p. 132.

venient notation

hm

and

hm

used in the text was introduced by A. Pnngsheim

(Sitzungsber. d. Akad. zu Munchen, vol. 28, p. 62. 1898), to of upper and lower limits are also due **.

whom

the designations

should be expressly pointed out again that the upper (and similarly the is not necessarily determined by the tail-end of the sequence. Thus

It

bound

lower)

the upper

bound of the sequence

the sequence

is

f

J

and

is 1,

is

obviously altered

if

the

first

term of

altered.

The

previous investigations of this paragraph were carried out quite 8 and 9, and independently of the considerations on convergence of give us, for this very reason, a new means of attacking the problem of of 9. It may be shewn that the knowledge of the lower convergence

A

the knowledge, therefore, of and upper limits x and /x of a sequence two numbers whose existence is a priori ensured entirely suffices to

decide whether or

how

the sequence converges or diverges.

We

have

in fact the theorems

63*

Theorem

1

upper limits x and therefore,

given

e,

*

there

p

The sequence (x n ) is convergent if and only if its lower and are equal and finite. If A is the common value (different,

+ GO

from

Proof,

.

a) is

or

Let x

at

=

most a

GO) of //

and

finite

x and

their

/z,

then xn ->

common

number of

A.

value =- A.

w's for

Then, by 59,

which

untere Grenze (frontier). The word "frontier" is not usual though sometimes found in French. The distinction between any bounds and the narrowest bounds is emphasized chiefly by the article the in the latter case; the upper bound and the lower bound always denoting the latter. For fear of ambiguity, however, the word "bound" in the general sense is avoided as

German: Obere,

in English writings,

much

as possible in English text-books.

**

We

(Tr.)

have omitted reference here to the untranslated term "Haufungsgrenze" of the German text: "Die im Texte benutzte ausfuhrlichere Bezeichnung Hdufungsgrerize soil nur den Unterschied zu der soeben defimerten unteren und oberen Grenze starker betonen". (Tr.)

and similarly

For every n

most a

at

^

some w

n

>n

b)

If,

(s),

is satisfied

we

,

Y.

=

most

A,

therefore have

or

,

|

#n

A |

<

e,

>

<

< + # n
for an infinite

number

the latter

(>A-e)

of

but the inequality

's,


(>

A

+

number of n's. The former

a finite

Theorem its

of #'s for which

is

xn for at

number

convergent and A is its limit. 0, we have, for every A, then, given e conversely, lim x n the A Therefore #n E A inequality

the sequence

e.

finite

< #n < A +

A i.

97

Limiting points and upper and lower limits.

10.

~

/z

This proves

A.

The sequence (x n )

2.

all

that

)

inequalities (with

we

is definitely

<) imply

required. divergent

if,

and only

if,

+ oo

or

18 upper and lower limits are equal, but have the common value oo. oo. In the former case it diverges to oo, in the latter to

+

Proof,

a) If

x

=

60, 2 and 3, that, given

ft

+

G > 0,

oo

oo

(or

),

then this

we have from and

by

signifies,

after a certain w

> + G (<-G); we therefore then have lim x n = + oo oo). ~ + oo, then, given G > 0, we have for conversely, lim x n b) x n > -f G; therefore every n after a certain satisfied for at most a finite number of the inequality x n < + G *n

(

If,

//

,

is

whereas

n's,

the inequality x n

But

this implies,

by

x

satisfied for

+

oo

and

an

infinite

number

ipso facto also

fj,

oo.

of

=+

3.

w's.

oo.

that

.

,

Theorem its

is

60, that

And in precisely the same way we show + /x oo then x ~ p = oo lim x n = From these two theorems we at once deduce further:

Therefore x if

>+G

The sequence (x n )

is indefinitely

divergent if

and only

if

upper and lower limits are distinct. The content of these three theorems provides us with the following

Third main criterion for the convergence or divergence of a sequence: 64. The sequence (xn ) behaves definitely or indefinitely, according as its upper and lower limits are equal or distinct. In the case of definite behaviour, it

is

convergent or divergent, according as the limits is finite or infinite.

common value of

the upper

and lower 18

oo (which are cerIn occasionally speaking of the symbols -fand numbers) as "values", we make use of a mere verbal licence, to which no importance should be attached. tainly not

98

Chapter

Sequences of

II.

real

numbers.

The

following table gives a summary of possibilities as regards the convergence or divergence of a sequence and of the designations used in this connection.

A this

and

Infinite series, infinite products, continued fractions.

11.

infinite

numerical sequence can be specified in the most diverse ways; sufficiently evident from the examples which have been

is

given.

In these, however, for the most part, the n th term x n was for convenience given by an explicit formula, enabling us to calculate it at once.

This

by no means the

rule, however, in the applications of sequences of On the contrary, the sequences to be examined mathematics. parts themselves Besides several less important generally present indirectly.

in

is

all

kinds, three types especially give a brief discussion.

come

into consideration;

of these

we

will

now 66.

Infinite series.

I.

A

way.

sequence

is

These

are sequences given in the following any manner (usually by direct

at first assigned in

indication of

its terms), but without being intended itself to form the of discussion. From a it new object sequence is to be deduced, whose

terms we

now

denote by sn writing so == ao> s i ao a \\ ,

=

+

ao

^2

+a + i

#2>

and generally

sn It is the

7.

more

or

still

#1

-1-

a2

-f

.

4-

^4

a2 4

.

.

.

.

4 an

shortly

more

.

4-

an

(n

(sn )

a

a)

or

ao +

= 0,

1, 2,

.

.

.).

of these numbers which then forms the object of For this sequence (sn ) we use the symbolical expression

sequence

investigation. ft

"=

shortly

and more expressively:

n-O

4-

.

.

.

and

and

Infinite series, infinite products,

11.

this

new symbol we

continued fractions. 99

infinite

an infinite series

call

numbers

the

\

We may

* of the series. called the partial sums or sections

are

sn

therefore

state the

An

Definition.

68.

a symbol of the form

infinite series is

QC

Zan

or

l

~|-0 1

+*2 + -"

W--0

or 00

by which

+a +a + l

meant the sequence

is

f

2

sn -

+

'

of the partial

(s n )

+

*o

an

+

i

+

sums (n

<*n

= 0,

1, 2,

.

.

.)

\

Remarks and Examples. 1.

The symbols CO

00

00

^

fli -1

"n ;

-I-

fli

.

-I

.

.

-f

tf

-

M

m

an

4-

M

M

j- 1

00

shall

Ea n The

be entirely equivalent to

.

index n

is

called the index of summation.

w=-

Of

course any other letter

may

take

its

place

GO -27

CO

a

av \

The numbers a n are the term* wards. Thus the symbol

-f

{}

i

-f

+

<**

They need not be indexed from

of the series.

on-

00

27

aA

(a lt a^ -f a 2 , a l -f

denotes the sequence

a2

+

a 3t

.

.

.)

and more generally,

denotes the sequence of numbers sp sn

=

ap

+

+ ~ 0.

Here p may be any integer

,

s v+l , s P+Zt

+

a v+ 1

n

Finally

.

we

.

n

for

.

given by

^ P,P

-I-

!

also write quite shortly

av

when

there

is

or

assume, 2.

For H

e

^

)

which the index of summation has to

no ambiguity

as to the values

when

matter of indifference.

=

this is a

0, 1, 2,

"";

.

.

.

let

an be

= (- v n

>

s)

- (-

n i)

(2

+

i);

=4=

*

German

:

Teilsummen oder Abschnitte.

0,

-

I,

~

2,

...

'

]00

II.

Chapter

We

are then concerned with the infinite series

J i Esl + 7 + T +

>

o>

+ "'

1

1T2

^ r

+i+

i_j-...

~

l

*"+

^

:

111

o

c) i

Sequences of real numbers.

+ 2^ + 3^4 + "

0+1 + 2 + 3H + ~ d)

;

* ~~

~^

~2

"if

^

'

b)

c;

in these

.

-

=M+1

new

simply a

+ 3sTZ4 ^ + 2oT^3 ^ ^TTo2 ^ .

(n

d)

;

(s

+

=

H

1

-

(-l)n+1 ]

n

g)

=(-l) ("+

"'

~

a (a

1)

1

I

and as will be seen, very con for which sn is .)

.

.

.

+ 2)

;

45

cf -

>

3 and 48,1);

(see footnote 19);

+ 1) (a + + /I

\

^

2)

'

'

^

'

(a

+

n) (a

1_\ + _. +

+

/._ *

n

+

1) *

1

-.

a

sa

-2 = n(n+l).

(a

1)

/I

(*

,

1);

T

+

s

,

(

f)

1-3+5-7+9-.

g)

;

for the sequences

symbol

;

1.1.1

1

And we have venient

?

4~

^(-1)^=1-1 + 1-1 + ,

*

a

+n+

1"

We emphasise above all that the new symbols have no significance in themAddition, it is true, is a well-defined operation, always possible, with regard to two or any particular number of values, in one and only one way. The partial sums sn therefore, however the terms an may be given, have under all circumstances 3.

selves.

definite values.

But the symbol

fan

has in

n-O

itself

no meaning whatever,

not

even in a case as transparent, seemingly, as 2 a for the addition of an infinite number of terms is something quite undefined, something perfectly meaningless. It must be considered substantially as a convention that we are to take the new symbol to mean the sequence of its partial sums. ;

lu

Equal to

1

or

0,

according as n

is

even or odd.

11. Infinite series, infinite products, and infinite

The

4.

reader should take particular care to distinguish a series from a se-

A series is a new symbol for a sequence deducible by a definite rule from

20

quence

continued fractions. 101

:

it.

The symbol

with the sign of summation "JL can of course only be used when the terms of the series are formed by an explicitly assigned law, or when a particular notation is available for them. If for instance the numbers 5.

or the

numbers

are to be the terms of a series,

we

shall

have to use the

explicit

symbols

and 3

'"

7

+

8

+

15

+

24

+

+

2(3

3l

+

'

'

*

and write down as many terms as necessary, till we may assume that the reader has recognised the law of formation. For the first of these two series, this may the terms arc the reciprocals of the successive prime be expected after the term numbers. In the second example it will not be known even after the term }f how the denominators of the terms are meant to be the integers of the form to proceed

^

:

:

-

Pq in

1

(P,q=-

2, 3, 4,

.

.

.)

order of magnitude.

We

now adopt the further convention that all expressions used to describe the behaviour, in respect of convergence, of a sequence are to a n itself. be carried over from the sequence (s n ) to the infinite scries

2

Thereby we obtain Definition.

in particular the following

2

An infinite series a n is said to be convergent, definitely divergent or indefinitely divergent, according as the sequence of its partial sums shows the behaviour indicated by those names. If, in the case of convergence, s n -> infinite series

s,

then

and we

we say

that s

is

value

the

or the

sum of the convergent

write for brevity cr

Ea = v

v

s,

-0

00

t

a v denotes not only the sequence

so that

(s n )

of the partial sums, as laid

down

v~-0 2i

. In in the preceding definition, but also the limit lim sn , when this exists the case of definite divergence of (s n ), zve also say that the series is definitely

divergent

or ->

and oo.

are the lower is Y.

that

it

+ oo

or

oo

according as

sn

and upper

+

->

If finally, in the case of indefinite divergence of (s n ),

indefinitely divergent

and

diverges to

Y.

and p

we also say that the series between the (lower and upper) limits

limits of the sequence, then

and

oscillates

fji.

20

The

21

Exactly as

additional epithet of "infinite**

we may now,

may be

omitted

when

obvious.

in accordance with the footnote 9 to 41,

1,

write

69.

102

Chapter

Sequences ot real numbers.

II.

Remarks and examples. once obvious that the series 68, 2 a, b and h converge and have

1. It is at

for

sums

+ oo

;

+ 2,

2e

is

and

1

definitely divergent towards

number

the

and

between

oscillates

finally,

,

2c and d are

sum

convergent and has for 2 f

(s ve-i\ S2k)',

respectively;

a

s

and

1,

defined by the nest 2a oo and

2g between

H-oo. 2. As regards the term sum the reader must be expressly cautioned about a possible misunderstanding: The number s is not a sum in any sense previously in use, but only the limit of an infinite sequence of sums', the equation

=s

27

+a

a

or

n-O is

therefore neither

more nor

another

less than

lim sn

=

s

+

L -\

or

>

sn

=

H

way s

s

of writing

.

would therefore seem more appropriate

to speak not of the sum but of the or value of the series. However the term "sum" has remained in use from the time when infinite series first appeared in mathematical science and when no one had a clear notion of the underlying limiting processes or, generally, of the "infinite" at all. 3. The number 5 is therefore no sum, but is only so named, for the sake In particular, calculations involving series will in no wise obey of brevity. all the rules for calculating with sums. Thus for instance in an (actual) sum we may introduce or omit brackets in any manner, so that for instance, It

limit

1

_ i + i _ i = (i _

i)

+ (i _ i) = i _ (i _ i) _ i = o.

But on the contrary J;

n=o is

not the

same thing

1)"S3

(

1

1+

1+1

as

- 1) + (1-1) + (1-1)+...= + + 0+ (1 or as

==1-0-0-0

1- (1-1) -(1-1) -(1-1)

Nevertheless, calculations involving series will 'have many analogies with those involving (actual) sums. The existence of such an analogy has, however, in every particular case to be first established. 4. It is also, perhaps, not superfluous to remark that it is really quite 00

J

paradoxical that an infinite series, say J5o~"

should possess anything at

all

22

1

.

that

S

gTr+r *2k~~ $2k-i

= ~^9TTT>

we have sn ~*

(s^fc-i

are generalised,

if

5 |

e>

2Jt)'

\<

a<*6<---;

5

we deduce

that 5

P ositi ve and tending to

^'

^c

^ an<*

^j

**

similarly

from

>5 >5 >

0.

By 46, 4 and

s 2jfe

Finallv

41,

5,

where these considerations

Infinite series, infinite products,

11.

and

103

infinite continued fractions.

capable of being called its sum. Let us interpret it in fourth- form fashion by shillings and pence: I give some one first 1 s. then /2 s., then */ 4 s., then */ 8 s., and so on. If now I never come to an end with these gifts, the question arises, whether the fortune of the recipient must thereby necessarily increase beyond all bounds, or not. At first one has the feeling that the former must occur; for ultiit seems if I continue constantly adding something, the sum must mately exceed every value. In the case under consideration this is not so, since for every n 1

f

sn

The

=

1

+

total gift therefore

2

+

4

-f

. .

.

+

-

27j

2

2n

,

remains

never reaches even the amount of 2

spite of this, say that 2! 2 n

**

equal to

then

2,

we

s.

<

2.

And

if

we now,

in

are really only using an abbreviated

expression for the fact that the sequence of partial sums tends to the limit 2. the well-known paradox of Achilles and the tortoise (Zenon's paradox).

Cf.

5. In the case of definite divergence we can also, in an extended sense, speak of a sum of the series, which then has the "value" +00 or -co. Thus for instance the series

is

-*

definitely divergent, and has the write for short -f- oo .

"sum" hoc, because by 46,

.3

its

partial

2S

sums

We

oo

I

n=l which

In the

6.

"sum" then

only another

is

mode

of writing for

case of an indefinitely divergent

loses all significance.

we

in this

If

case

series

litn sn

x

however, the word and lini s n fi (> x),

the above, that the series oscillates between x and, //. But it (cf. 61, 2), that this refers only to a description of the ultimate behaviour of the series. In fact the partial suras s n need not lie between said,

in

must be carefully noted x and p.

Thus, for instance,

\ve can at

once verify that *

and therefore lim sn

=

= 1

,

if

+ lim s n

a

==

2,

+ =

+ -f-

1

.

and for w]>0,

= (But

all

i)"jqrj

(

= o,

1,2, ...)

the terms of the sequence

(sn )

2a If

therefore the payments discussed in 4. have the values 1 s., l/ s., the fortune of the recipient now does increase beyond all bounds. It is not at first at all obvious to what it is due that in the case 4, the sum does not exceed a modest amount, whereas in the present case it exceeds l

*/8 s.,

/4

s.,...

every bound. The divergence of this series was discovered by John_J$ejyuiuUL^ and published by James Bernoulli in 1689; but seems to have been already known to Leibniz

m

1673.

11. Infinite series, infinite products,

and

continued fractions. 105

infinite

they must be taken, in a precisely similar manner to the infinite series just considered, simply as a new symbolic form for the well-defined sequence of the partial products M r, /> *i />i Pz -^ u\ " 2 2

=

;

However we the number

=

;

-

;

-

with reference to the exceptional part played by in multiplication, have to make a few special conventions

shall later,

in this connection. If for instance

1.

product

fr

>+

1)

2

=

The

2.

%',

Pz

=

3

1

-

1,

5

4

4~,

42

32

22 r

represents the sequence of numbers 4 2-3

Pi

^

have, for every n

n~(iT+ 2)

-- ,L

n

we

/>3

'2-4*

3

-

nn

-,

52

( '

'

.,

i-

!)

then the infinite

2 '

'

n (n

-

= -2-4......

n

-

|-

'

'

2)

2(w |- 1)~ w~:p~2

~~

-

/>M

r>

-

-

additions and remarks just made in I retain mutatis mutandis their All further details will be considered later (Chapter VII).

significance here.

is

in. Infinite continued fractious. Here the sequence (v w ) under examination b lt formed by means of two other sequences (,, 2 .) and (6 ), by writing: .

#0

-

-

,

in the general case, being

the last denominator & n _ t of

is fairly

,

.

.

'V

and so on, xn

infitntum.

.

For the

usual.

"infinite

The most

.v

deduced from x n ,_ l by substituting for

n _, the value bn _ l -f

,

",

and proceeding thus ad

continued fraction" so formed the notation

natural notation for

it

would be

71-1

few special conventions have to be made, to take the fact into account that in division the number again plays an exceptional part. The subject of continued fractions we shall not, however, enter into in this treatise 24

Here

also a

.

Of that

by

the

three

modes of

infinite series is

by

assigning

far the

a

sequence

discussed

above,

most important

for all applications shall therefore have to deal mainly with

We higher mathematics. Since series merely represent sequences, the introductory 9 provide us with the points of view from which developments of

in

these.

will have to be investigated: Together with the which concerns the or problem convergence divergence of a given series, we have again the harder problem B which relates to the sum of a series already seen to be convergent. And for exactly the same

a

given

series

A

9

24 A complete account of their theory and applications is given by O. Perron, Die Lehre von den Kettenbruchen, 2 nd Edition, Leipzig 1929.

106

Chapter

reasons present does its

as

we

itself

sum

in

Sequences of real numbers.

II.

explained, the the form: A series

coincide with that of

other

sequence, or does such another sum or limit? 2B

of

any

second problem

there

it

2 an

known

is

to

will

be

generally convergent;

any other series or with the limit stand in any assignable relation tb

in contradistinction Since the problem A is the easier and since B it admits of a methodical solution, we will proceed in the first place to give our attention to this in detail. to

problem

Exercises on Chapter II 26 9. Prove Theorems 15 to 19 of Chapter

I

.

by the method indicated

in

the footnote to 14.

10. Prove in all details that the ordered arrangement, defined by 14 and 15, of the system of all nests of intervals, obeys each of the theorems of order 1. (For this cf. 14, 4 and 15, 2.) 11. Carry out the details of the proof required on p. 32; i, e. prove that the four modes of combining nests of intervals, defined by 16 to 19, obey all the fundamental laws 2.

12. For fixed

3,

with 2

<

1,

13. For arbitrary positive a and

/?,

(loglostt)"^^ (log

nf *

Vs~

14. Which of the two numbers (--}

25

Thus e.g. the

series

+ l-f 6\ +-.+ o

l

2

and

f

.

1

shown

to converge.

How /

given by the sequence

I

\

1

do

we

\\n -? -| nJ 1

+ l + -+... +

its

Similarly

two

selves of the convergence of the l

see that

+...

sum

^~2j

..-J

is

the larger?

r+"*

will easily

nl coincides with the

be

number

we may very soon convince

*

our-

series

and

1-.. + ..-. + -.... O

But how do we discover that

if

s

and

s'

are their sums, $

= ---s' 9

and 4s'

= ;r

o

e. equal to the limit in a third limiting process, which occurs in relation to (i. the circle; cf pp. 200 and 214)? 20 In several of the following exercises, a few of the simplest results with regard to logarithms, and the numbers e and yi r are Assumed known, although they are only deduced later on in the text.

Exercises on Chapter

15. Prove the following limiting

107

11.

relations:

*

r

Ln-f-

Note that a

wrong

examples whereas in

16. Let a be >0, x l convention that for n

a term by term passage to the limit gives gives a correct result

a) to d)

in

result,

e)

>

it

and the sequence

(XL) x^

t

.

.

defined by the

.)

ft)

b)'

Shew

that in case a) the sequence tends monotonely to the positive root of x a = 0, but with x n a = 0; that in case b) it tends to that of x* lying alternately to the left and to the right of the limit

jc^

+

x

17. Investigate the convergence or divergence of the following sequences' a)

XQ

b)

XQ , xit

,

Xi arbitrary; for .

.

every

n>2,

#n

=

.,

(&n-i

j-

H-a-a)t

>p

xp -. t arbitrary; for every n

+

,-,+

Xn-p

~ 1

*i

c) d)

xQ1 x

x

18.

,

*

ap given constants,

positive; for every

l

w>2,

arbitrary; for every

XL

If

a ai

we

Ex. 17, c

in

xn

n^2,

e. g. all

~ \xn ^

a? w

2:r

^-~*

xn

put, in particular,

l

equal to

#

=

1,

-3

j,

;

.r

a?1

'*~ 9-.

=

2, then the limit of

8

the sequence

is

= "y/ 4

19. Let a lt aa write, for

n=

1, 2,

,

. .

.

.,

ap be arbitrary given positive quantities and let us

. . .

^

^

1^

-*

=

sn

and

Vs7 =

a;M

.

Chapter

J03

Show

that

numbers

is

x

Sequences of real numbers.

IT

always increases monotonely and if one, say a lf all the others, then xn -> a as limit.

lt

of the given

greater than

(Hint: First show that

20. Somewhat n

similarly to last Ex., write

n

.

_

n __ t

"

* -

and show that

a:,/

decreases monotonely

=

sn

'

and

and -* ya,

= x/

(s n ')

a.2

... a p

.

<

21. Divide the interval a ... & (0 << a 6) into M equal parts; let or = a denote the points of division. Show that the geometric mean . ., x n = b Xj, x9 ,

.

.

(

.

.

n

.

and the harmonic mean

22. Show

-I-

1

IL a

log 6

log a"

Ex

5

(Answer:

If

that in the case of the general sequence of

-

"(-/*)"

Set a;>^0 and let the sequence

JJ.

b

"^ 1

^

-^

For what values of x

is

the sequence

(.r n )

be defined by

convergent?

and only

if

1

24. Let lim#n =

*,

hm

=/*,

Hm xn

\}mxn ' =

'

x',

f/.

What may

be

said of the position of the limits for the sequences

Discuss

possible cases.

all

25. Let

(a w ) be

bounded and (with the possible exception

of a

few

initial

terms) let us put

Then

(an )

we

put

if

and

(/?)

have the same upper and lower

_

.

n

26. Does Theorem 43, 3

n

nlogn/ still

hold

if

limits.

The same holds

_. nlogn

9=0

or

= + oo?

the sequences (xn) and (yn) given in 43, 2 and 3 are monotone, then so are the sequences (#') and (y n') mentioned there.

27.

If

Exercises on Chapter

28*

If

the sequence

monotone and

is

(-j~j

109

II.

&n

>>0, then the sequence

th term having w

H is

also

monotone.

29.

We

have

provided the limit on with (fc n ) monotone.

3O. For

the

positive,

and

exists

right

monotone

and (&) are null sequences,

(a,,)

c n 's,

-----\~Xn XI H

t

implies c

* is

provided \

31.

tsn /

If

6n

a?

+c

t

x H-----h l

bounded and Cn ~>

>0,

and 6

oo

-f

cn

.r

n

_^

(Here

.

Cn = c

+ ^H---- +& = ^-> + oo, " i

6n

(v n +i

~ Xn

)

->|

'

+

-f c t

-f-

-f cn .)

and a^-^ + oo, then

implies

tftp * nfi

32. For every sequence

(Cf.

Theorem 161.) 33. Show that

are positive, then for

if

*

I-

*t

+

'

^n Vr"|

J *o+ir+--- + ^n (#n ), we invariably have

__v

> ^

the coefficients a^ t of the Theorem of Toeplitz sequence (xn ) the relation

tft/ery

lim xn holds,

&i

where

a?/

^ lim

= an

o;

.T,/

< hm xn

+ an ^ +

----

hn*-

43, 5

Part

II.

Foundations of the theory of infinite series. Chapter

III.

Series of positive terms. 12.

The

comparison we

In this chapter

and the two

principal criterion

first

tests.

be concerned exclusively with

shall

series, all

of

2

whose terms

If a n is are positive or at least non-negative numbers. such a series, which we shall designate for brevity as a series of positive

an

terms, then, since

^ 0,

we have

= *n-l +

sn

<*n

^

s n~l>

so that the sequence (s n ) of partial sums is a monotone increasing sequence. Its behaviour is therefore particularly simple, since it is then determined

by the

Jd

first

main

criterion 46.

This

fundamental First principal criterion.

verges or else diverges to

sums are bounded

+

<x>

A

And it

.

once provides the following simple

at

series is

with positive terms either con-

convergent

if,

and only

if, its

partial

l .

Before indicating the first applications of this fundamental theorem, facilitate its use by the following additional propositions:

we may

Theorem

1.

If p

is

any positive V)

S an

1

Only boundcdness on

since an increasing sequence 2

More

shortly:

We

series

and

27

an

n=/> 2 ,

and when both

the right

is

two

TO

7i

converge and diverge together

integer, then the

series converge,

(boundcdness above) comes into question,

invariably

bounded on the

"may" omit an

reason, it is often unnecessary to indicate the limits of the index n is made to vary).

110

left.

For this summation (between which

arbitrary initial portion.

The

12.

Proof. and

f

sn

first

principal criterion and the

= 0,

If s n (n

~ />,/> + (n

.

J,

.

.

.)

two comparison

are the partial

.

sn

^<*o

.)

!+- +

-h

*-i

+ sn

whence, for ->oo, both statements follow, the terms a n to be non-negative.

Theorem

sums of

those of the second, then, for

1,

the

Ill

tests.

first series,

n^p,

',

even without requiring

Zc n

is a convergent series with positive terms, then so are any positive, but bounded, numbers 3. remain constantly
E y nc

2.

If

if the factors

ny

yn

K

2c

<

2y

<

Theorem so

2d n dn

is

3.

2dn

//

if

,

the

is

factors

a divergent series with positive terms, then d n are any numbers with a positive

lower bound d.

Proof.

If

sums

of

partial

G> 2 dn

be arbitrarily chosen, then by hypothesis the from a suitable index onwards, are all > G:d.

,

same index onwards, the partial sums of 2dn dn are then G. Thus 2& n d n is divergent. Both theorems are substantially contained in the following

From

>

the

Theorem

4.

// the factors

an satisfy

then the two series with positive terms diverge together. Or otherwise expressed.

2 an Two

2a

n a n converge and scries with positive terms

and

and 2a n converge and diverge together if two positive numbers and a" can be\assigned for which, constantly, (or at least Irom some '

an a'

the inequalities

4

n onwards)

ct

in particular therefore

an

if

'

<

~a

an

n

<

or,

a

<*>"

fortiori,

if

an

f

*a n

(v.

40,

5).

Examples and Remarks. 1.

K

If

is

positive terms, then the 2.

71.

a bound above for the pattial sums of the series

The geometric

sum

5 of this series is

series.

Given

a> 0,


(v.

46,

2a n

with

1).

and the so-called geometric

series

00

n=0

wu

have, 8

if

We

convergent,

a S>

1

1

then

sn

>

and so

(s n ) is

certainly not bounded; the series

shall in future usually denote by c n the terms of series assumed divergent.

a series assumed

and by d n those of a

Since, in this formulation of the hypotheses, division by a n occurs, the and never =0. is of course implied that a n Corresponding restrictions should be observed in the more frequent cases in the sequel. 4

assumption

>

112 is

Chapter

Series of positive terms,

III.

But

therefore in that case divergent.

=

sn

and therefore

we

1 -f

a

+ a'

2

if

a <<

1

=

1

-f a*

-f

,

then

a"* 1

^

,

(cf p. 22, .

footnote 13)

have, for every n, 1

.

so that the series

then convergent.

is

Since further 1

1-a

l-a forms a null sequence, by 1O, 7 and 26, is

we

1,

at the

sum

a simple expression for the

rarely the case

same time obtain

this

of the series:

cr>

00

The

3.

series

y]

" J^TI

- 1 --r-r n (n -f- I)

<

111 -

===

^

I

4-

^r-

& o

-f ^- o*4r

has the partial sums

-f-

As

the scries is therefore convergent. 1 These are constantly we can see at once that sn + 1 so that s = 1 ,

/

as

Harmonic

^---

4.

v/

we saw

5

diverge

to

in

46,

+ QO.

1

--

series.

But the

For

convergent.

its 1

n th

1

+ ?H 4

H

1 --h

n

is

divergent,

for,

sums

-

partial

1

.

=sl

happens,

series

V is

1

2, n n=sl

3, its partial

it

.

,

1

l

+-

sum

is

.1

.

t

hence

<

and therefore ^w

sum

s is

indeed certainly

A

series of the

*

<

.

form

Si

=

The

series

We shall find later (see

2 ~~^ 00

6.

2

is

called

1

~ s

*

n=on\ 2, 6

The

is constantly 2, so that the given series is convergent. not so readily obtainable in this case; we have however at any rate

and for n

^ 2,

Cf. footnote 2H, p. 103.

+

1

136, 156, 189 and 210) that s

an harmonic

1

o~i

61

=

series.

11 + + + 7

s

nas the partial sums

s

<

^-.

2,

The

12.

first

and the two comparison

principal criterion

Replacing each factor in the denominators by the

^

1

9 ^

Tl "

1 "

O &

O*

O &

.

l~

*

~T"

=2+ The

Z

+

.

.

+ sum

numbers

namely

2,

113

we deduce

that

n A

rt

M

with

series is therefore convergent,

coincides with the limit e of the

i

_J t)

least,

tests.

.

...

+

2^1

=

3

2

^ 3. We shall see

( 1 4-

^<

3.

later that this

sum

.

j

As we remarked above

that every series with positive terms represents a monotone increasing sequence, so we see, conversely, that every monotone in. .) may be expressed as a series with positive terms, creasing sequence (#, x lt 6.

.

provided x

is

We

positive.

need only write

for, actually,

and

all

the a n 's are

0.

T

From our fundamental theorem we shall in due course deduce criteria which are more special, but are also easier to manipulate. This we shall be enabled to do chiefly by the instrumentality of the two following "com'

*:

tests'

parison

Comparison Let

2c n

and

2dn

72.

test ofjthe_l^_hind.

be two series zvith positive terms, already

known

to

he the first convergent, the second divergent. If the terms of a given series a certain m, a n , also with positive tertns, satisfy, for every n

>

2

a) the condition

^

<*>n

2

then the series tain

an

is also convergent.

Cfi.

//,

however, for every

n> a

cer-

m, b)

we have

constantly

then the series

2 an

Proof.

By

must also diverge 70,

1,

it

6 .

suffices to establish the

convergence or di-

r/5

vergence of

2

an

.

In case

a)

the convergence of this series results oo

at once,

*

by 70,

German:

2,

from that of

Vergleichskriterien.

2

cn , because

by hypothesis we may,

(Tr.)

It was not, howGauss used this criterion in 1812 (v. Werke III, p. 140). nd kind, before Cauchy, ever, formulated explicitly, nor was the following test of the 2 Analyse algbrique (Pans 1821). fl

114

Chapter

for every

>

n

a n *= yn cn ,

write

m,

Series of positive terms.

III.

with y n <^l.

In

case bl the

di-

CO

vergence results similarly

=

write a n

7

from

dn ,

that of

because here

we may

n=tn+l (5

n

dn

with $ w ^>

,

73.

1.

Comparison

2d

test

nd kind. of the 2

again denote respectively a convergent and a a l of If the terms of a given series a certain terms m, satisfy, for every n^> positive Let

and

cn

n

divergent series of positive terms.

a) the conditions

then the series

2a n

is

also

convergent.

If,

however, for every

n^>

a certain m> we have b) constantly

2a

then

n

must

Proof.

also diverge.

In case

The sequence

a),

we have

of the ratio

for every

yn

=

is,

from a certain point

on-

terms are monotone descending, and consequently, since all Theorem 70, 2 now establishes the it is necessarily bounded its

wards,

positive,

In case b)

convergence. ratios

<J

n

=

we

have, analogously,

increase monotonely

9

~^ ]> ~a "+i

,

so that the

*

from a point onwards. But as they

are constantly positive, they then have a positive lower bound. Theorem 70, 3 now proves the divergence. These comparison tests or criteria can of course only be useful to us

we

if

are already acquainted with a large number of convergent series with positive terms. shall therefore have to

We

and dhergent

a stock as possible, so to speak, of series whose conor For this purpose the following divergence is known. vergence form a nucleus: examples may lay in as large

7

Or

else

almost more concisely

2

c n is also of the partial sums of case b), the partial sums of an

those of

2d n

do

so.

In case a) every bound above one for the partial sums of San and in must ultimately exceed every bound, since :

\

The

12.

first

principal criterion

and the two comparison

tests.

115

Examples.

the so-called harmonic

test,

2

was seen to be divergent,

1.

convergent.

3

the

By

first

comparison

series

!,'

^

^

therefore certainly divergent for a 2. It is, however, 1, convergent for a known in the case a ---= even integer how its sum may be related to numbers 4 occurring in other connections; for instance we shall see later on that for a is

only

sum

the

2.

7T

.

is

4

^.

By

the preceding, the convergence or divergence of 27

questionable in case for every a

*

1

1

To

:

<

a

<

>

only remains

prove as follows that the Aeries converges for any partial sum s n of the series,

bound above

obtain a

choose k so large that 2 k

We may

2.

-

Then

n.

Here we group in one parenthesis those terms whose indices run from a power of 2 (inclusive) to the next power of 2 (exclusive). Replace, in each pair of parentheses, every separate term by the first; this involves an increase ot value and we have therefore

*^ If

a

we now

>

1,

write for brevity

then

1

+

r,^

+

4

4

+

+

2 A -- 1

(>-.)

a positive

^,

number

certainly

<

1,

since

we have

and since this holds for every the series itself

2

2

is

convergent, q.

All harmonic

series

w, the partial e. d.

2 "^for a ^

In these, with the geometric series,

sums of our

series are

bounded, and

(Cf. 77.) 1

are divergent,

we have

and for a

>

1,

convergent.

already quite a useful stock of

com-

parison scries. 3.

Series of the type

where a and b are given positive numbers, also diverge for a a > 1. For since u wchave

and 70. 4 Droves the truth of our statement.

5

<

1,

converge for

74.

116

Accordingly the series 1

Series of positive terms.

III.

Chapter

11 +

+

3i

**

n

>

in particular, are convergent for a

z

a

+

o

1,

_

1

(2^nr

divergent for a 5^

1.

r>

2

4. If

cn

a convergent series with positive terms,

is

and we deduce from

n -o '

cn by omitting any (possibly an infinite number) of its terms, or any way terms with the value 0, thus "diluting" the series, then the resulting "sub-series" 2 cn is also convergent. For every number which is a bound above for the partial sums of S c n is then also a bound above for those of the new it

a

by

new

series

inserting in

f

series.

In accordance with tegral values,

e.

i.

this,

the series

the series

2 *-&>

where p runs through

all

prime

in-

1,1,1 ,1,J_, ^a T ga

2<x

i"

i"

i

7<x

>

H<x ~r

we

1 certainly convergent for cc (On the other hand, of course, 1 conclude without further examination that it diverges for a. !) is

Since

5.

2an

in particular the

is

already recognised as convergent for

V z l9 *$,

numbers 0,

>

-1

1 ~

1, 2,

10

,

"*"

. .

.,

9, and

,

cannot

we

infer

_!_4-JLx "*"""*" "*"""'

if

*

is

Thus we see

IO B

io a

denote any "digits",

*>

< < a -< 1

of

convergence

n^i io If

.

i.

e.

each of them be one of the

if

any integer ^-0, then, by 7O,

2,

the series

that an infinite decimal fraction

may also that every infinite decimal fraction is convergent and therefore represents a definite real number. In this form of series we also have, according to our customary order of ideas, is also

convergent.

be regarded as an

In this sense

infinite series.

an immediate conception of the value of

/

We

13.

prepare

comparison

tests,

The root the

by

test

its

we may say

sum.

and the

ratio test.

for a more systematic use of these two two following theorems. If we take as com-

way the

parison series, to begin with, the geometric series then we immediately obtain the

75.

Theorem

1.

//,

2

an of positive n with the series, a n <^ a

given a series

from some place onwards in

2an

,

with

terms,

0<0<1, we


1,

have, i.

e.

The root

13.

then the series is

test

ratio test.

divergence

known

to hold for infinitely for those values of n, a n

many

clearly suffices that }/~a^>.\

it

^ 1;

>

if

m

2an

is

convergent.

If

however,

s m will chosen so

is


The second comparison test gives immediately: Theorem 2. //, from some place onwards in the series,

series

sum

partial

1 occurs at least G times while large that the inequality a n sequence (s n ) is therefore certainly not bounded.

the

For we then

distinct values of n.

and a particular consequently exceed a given (positive integral) number G,

then

7

8 (Cauchy's root test .)

Supplementary note. For also have,

1 ]

from some place onwards*

It however,

convergent.

then the series is divergent.

should be

and the

an

>

.

The

0,

and

from some place

onwards 9

then the series

2 an

is

divergent.

(Cauchy's ratio

test 9

.)

Remarks and Examples. n 1. - M+1

In both

these theorems,

is essential

it

for

convergence

that

70*

_

and

^an

respectively should be ultimately lens than a fixed proper fraction a.

does not at all suffice for convergence that

V^<1, n.

An example

or

every

for

which we certainly always have

1

presents

and also

though the series diverges.

It is

not approach arbitrarily near to 2. If

8 9

1

once

in

the harmonic series

-^--l^l --

quite essential that the root

(

V^nJ or

f

?"-!J

is

and 2 show that the series 27 a *

Analyse algbrique, Analyse alggbrique,

p.

p.

<1, and

ratio should

1,

one of the sequences

then theorems

It

should have

~^<1

itself at

for

we

132 seqq. 134 seqq.

convergent, say with limit is

convergent

if

,


118 divergent

and

m

if

>

a

n

For suppose

1.

may be determined so n

And

since this value a

contrary a

every w

And

>1 >!,

then

,

> w',

Series of positive terms.

III.

Chapter

is g' g'

that, for every .

<1

=

y an -> a
<

<* -1-

theorem

,

1

=

1 --

-

a ;>

t

n>w,

= -- = a

we have

.

proves the convergence.

}> 0, and m'

^ 2

for instance; then e

,

may be

If

on the

so determined that, for

we have

since this value a

is

>>

theorem

1,

1

The proof

proves the divergence.

in the case of the ratio is quite analogous.

these two theorems prove nothing.

If

a=l,

3.

The reasoning

-^^

just

applied in

< 1,

in the

2.

is

obviously also legitimate when

>

or lim --^^ is 1, an of these limits or the If or lower is limit one other. the in upper upper =1, > 1, the lower 1, then we can infer almost nothing as to the convergence or divergence of Z a n The supplementary note to 75, 1, however, shows that, in the root llm

or lim

"y/a n

is

an

one case, and

lira

yan

<

.

test, it is sufficient

for divergence

10

that "lim

^/an

>

1.

just made in 2. shall not specially

and 3. are so obvious that, in similar mention them. cases in future, we 5. The root and ratio tests are by far the most important tests used in practice. For most of the series which occur in applications, the question of convergence or divergence can be solved by their means. We append a few examples, in which x, for the present, represents a positive number. 4.

The remarks

a)

2n a x n

(a arbitrary).

Here we have

?st_(!Ll)., an \ n J as !Lzt__

n

=

---* 1

1 ^

n

and

is

.*,, f

permanently positive

(v.

38,

8).

The

series is

and this without reference to the value of a convergent if For x = 1 our two tests are inconclusive; however 1. divergent if then get the harmonic series, with which we are already acquainted.

therefore

x>

*< 1, we

2

n=o

\

n

/

n=o

Here we have

10

Thereby the criterion

obtains* a disjunctive form.

San

is

convergent

n or divergent according as iverj

and

42.)

limyan

is

<;

1

or >>

1.

(Further details in

36

The

13.

Hence

and p

^

it

<

1,

>

divergent for x

1,

obviously diverges, since then

we

on

shall later

find for

its

whatever be w--1

sum

^

1

for

the value

*

Here we have

the

1

In the case of convergence

every n.

series

later

=

For x

the value of p.

-

convergent for x

this series too is

119

root test and the ratio test.

>

for every x

every x ^>

therefore convergent for

is

n is

d)/

M

#>0,

for convergent fe

as I/ ^

--

1

J^

e)

,

is

n

For the sum we

0.

shall

e x.

on find the value

convergent

11 ,

as again

i^ nn

\/a n

A'r convergent, because <^; ^ convergent, because = --

=

>0.

n -> 0.

n

f)

an

L1-'

< -^

for every

n>2;

divergent> becausc an

^V

_._ convergent, because an << n^ v'n(f+n*) .

.

.

g) 27..-

wards

p

(log n)

h)

<

>

0),

divergent, since

is

by 38, 4 from some n on-

n.

-

is

convergent, y^-n form

2j-.

generic term

fixed

(/>

vp

as

we may

at

once recognize by writing the

in the

1

11

In

Such and tion;

it

this

series,

summation may only begin with n

similar obvious restrictions

suffices, for

terms of the

we

shall in future

2,

since

log

1

0.

the question of convergence or divergence, that the indicated

In all from some place onwards, have determinate values. already agreed on p. 83, the sign "log" will always stand for the

series,

that follows, as

=

not always expressly men-

natural logarithm,

i.

e.

that to the base e (46 a).

20

]

On

is

Chapter

III.

Series of positive terms

the other hand

divergent, because by

38,4 and

Ex.

13,

(log log

onwards, so that the generic term of the series

< log n

>>

from some n

.

monotone decreasing terms.

Series of positive,

14.

is

nf

Before passing from these quite elementary considerations, we mention a particularly simple class of series of positive terms, namely those series whose terms a n , at least from some place onwards, form a monotone sequence. To this class belong nearly all will

the series given as examples

which occur

in applications.

above and also the majority of those For such series we have the following: 00

12 Cauchy's theorem of convergence .

77.

//

n=i

an

is

a series whose

terms form a positive monotone decreasing sequence (an \ then and diverges with

it

con-

verges

^2

*=o

fc

a9

k^a + 2aa +

4

JL

4

-f

Sas

+

Preliminary remark. What

is particularly remarkable in this theorem shows that a small proportion of all the terms of the series suffices determine the convergence or divergence of the whole series. For this

that

it

reason

it

is

to

also called the condensation theorem.

shows that the harmonic

It

gent, for

which

is

is

it

series J5J

,

for instance, is certainly diver-

converges and diverges with the series

And speaking

unmistakably divergent.

generally, the series

na

is

inferred to converge and diverge with the series t*

but this is a geometric series and therefore converges or diverges according as a ;> 1 or a 1 These examples also show us that the convergence or divergence of

<

22 it is

fl

8 ft

is

often

.

more

easily ascertained than that of the series

just in this that the

Proof. those of the 12

We new

value of the theorem

2 an

itself;

lies.

denote the partial sums of the given series by s n , Then we have (cf. 74, 2) series by t k

Analyse algbrique,

.

p. 135.

14.

i.

.

Series of positive, monotone decreasing terms.

a) for

n

<

2

b) for

n

>

2

121

k

e.

e.

Inequality a) shows that the sequence

(s w ) is bounded if the sequence (t^ bounded; inequality b), conversely, that if (sn) is bounded, so is (tk ). The two sequences are therefore either both bounded or both unbounded, and therefore the two series under consideration either both is

converge or both diverge, q. e. d. Before given further examples illustrating this theorem, we may extend it somewhat 13 ; for it is immediately evident that the number 2 In fact we have, more plays no essential part in the theorem. generally, the

Theorem. // Sa n is again a series whose terms form a positive 78. monotone decreasing sequence (aj, and if (g g lf ..) is any monotone increasing sequence of integers, then the two series .

,

CO

n=0

>

,

fulfils grc

> gfc-i ^

n

for

and

M

k

,

for every

< gk

&+!

M

'

fefc

~ &c-i)

we have

denoting by preceding a ffo (or otherwise 0), ,

^ A + (g

Sic^

stands for a positive constant.

Exactly as before

Proof.

i.

ff

the conditions

in the second of which

a)

k

*=0

both convergent or both divergent, provided gk

are either

k

00

n

go)

a Qo

A

-f-

the

+

sum

(fifc+i

of the

6W ag k

terms possibly

>

e.

18 14

Schlomilch. O.: Zeitschr. f. Math. u. Phys., Vol. 18, p. 425. 1873. The second condition signifies that the gaps in the sequence (&),

latively to the

great a rate.

sequence of

all

positive

integers,

re-

must not increase at too

122

Chapter

^

*.

> gk > (*+H-----M,,H-----K'Vt+iH-----h%) ^ fei - go) H-----H (& - fo-i)

n

b) for

Series of positive terms.

III.

f fc

V

f,

^

(&,

- giK, H-----h fewi

^ -t t

And from

t

&)

fc

.

the two inequalities as before.

the

statements in question follow in

same way

the

Remarks.

79* 1. It

from and

theorem be

suffices of course that the conditions in either

after a definite place in the series.

we may,

Therefore

in the

fulfilled

extended

theorem, suppose, as a particular case, ft

where g than

g*.

We

=[g*]

H

real number >> 1 and [g ] the largest integer not greater also satisfy the requirements of this theorem by taking

any

is

or

_8*. =4*,...,

& = **,

=*', =*,...

.

00

With

gfrssh*

we

obtain, for instance, the

theorem that the series

22 a m

>f

n=o (an )

is

a positive monotone decreasing sequence,

converges and diverges with

+

We may 2.

also

replace this

7

J^

:

-

last

is divergent,

series,

7a

tf

-f

according to 70,

although

its

4,

by the

series

terms are materially less than

those of the harmonic series; for according to our theorem, this series converges and diverges with

The divergence is therefore, by 70, 2, like the harmonic series, divergent. of this series and of those considered in the next examples was first discovered and

---

16 by N. H. Abel co

3.

5?

(v.

CEuvres

II,

p. 200).

1

=

:

:

=3 * 10gtl. lOg lOg

is

also

still

tt

6,6

divergent, although

considerably less than those of the Abel's series just Cauchy's theorem it converges and diverges with

2*. log 2*. log (log 2*) 16

,

terms are again 6

considered.

For by

*S*log2.1og(*log2)'

born Aug. 5 th , 1802, at Findoe near Stavanger (Nor1829, at the Froland ironworks, near Arendal.

Niels Henrik Abel,

th way), died April 6

its

Series of positive, monotone decreasing terms.

14.

and

this,

<

since log 2

1

,

123

has larger terms than Abel's series 5? discussed k log k

above, and must therefore diverge. 4. Thus we may continue as long as we please. To abbreviate, let us denote by log r x the yP le repeated or iterated logarithm of a positive number x, so that

=x

Iog x

Io

>

i

= log log a x = log (log x), = log (log,..! x) ,

log r x

...

.

We may

also take log_ t x to denote the value e x These iterated logarithms only have a meaning if x is sufficiently large; thus loga; only for a;>0, Iog2 x only for sc>l, Iog3 x only for x>e, and so on; and we shall only place them in the denominators of the terms of our series if they are positive, i. e. log x only for 1, loga x only for x>e, '.

x>

Iog8

a;

x

* or

onlv

>

e

*

and so on

>

-

H

we wish

therefore

to consider the series

log, n

og*...

then the summation must only begin with a suitably large index, whose exact value, however, (by 7O, 1), does not matter. Since the logarithms increase monotonely with w, and the terms therefore decrease monotonely, the series,

by

Caucfry's theorem,

converges and diverges with

^ and

this,

since 2

<e

t

1

_

must certainly diverge, k log k

diverges.

=

2),

it

5.

log^ x

k

Since the divergence of the latter series was proved for p = 1 (and follows by Mathematical Induction (2, V) that it diverges for

The

series

1

,

we

denominator to a power

already know.

/*\

\p

it

__ If

that the series 16

convergent,

For

this,

p *

1

That

na

if

we

converges for

for a particular (integer)

a

raise

p /

>

1,

^

j\)

follows just as before that the series

also convergent.

=

1.

~

and diverges with the series

For p

>

we assume proved

n-logn

'

_

above considered, however, become convergent

the last factor in the

is

.

p>l.

every

is

.

.

if

,

this

...

01

log^n-flog^n)

by the extended Cauchy's theorem 78, converges

we choose 3* +1

gfc

=

3*

-3*

3* log 3*... (log, 8*)"'

reduces to the series

124

Chapter

Series of positive terms

III.

3>,

As

this series has its terms less than those of the series (*) (assumed convergent), if the terms of the latter are multiplied by 2 (which by 70, 2 leaves the convergence undisturbed).

The series brought forward in the two last examples will later on render us most valuable services as comparison series.

We will prove one more remarkable theorem on series of positive monotone decreasing terms, although it anticipates to a certain extent the general considerations on convergence of the following chapter Theorem 1). (v. 82, 80.

+j Theorem.

2 an

// the series

converge, then

is to

n an -* Proof.

= sn

-J- a n choose

m

By is

convergent.

>m

e

and every

s v+;i

sv

17

.

Having chosen

that for every v

|

< -*

> 0,

sums a

i ^> 1

-f-

a \ ~H

we can therefore we have

so

,

e.

>

we now choose n

If

not greater than

taking v

2m, then, we have

v^m

n,

flv+i

a

> 0, but

hypothesis, the sequence of partial

|

i.

monotone decreasing terms

of positive

we must have not only a n

= [^n],

the largest integer

and therefore

+ av+2 H-----h

<

y;

fortiori, therefore,

(n

-)*< ~

and

Therefore

na n

Remark.

+Q,

q. e. d.

We

must expressly emphasize the fact that the condition not a sufficient one for the convergence of our present type of series, i. e. if n an does not tend to 0, then the series in question 18 while n a n * does not necessarily imply anything is certainly divergent n an

>

is

only a necessary

t

,

-

as to the possible convergence of the series.

^

-

diverges, although

it

has monotone decreasing terms and

nan Olivier, L.: Journ. f 18

because

d.

-

logn

reine u. angew. Math., Vol. 2, p. 84.

Accordingly, the harmonic series it

In point of fact, the Abel's series

^n

has monotone decreasing terms, but n-

for

,

-

instance,

1827.

must diverge

does not tend to

0.

Exercises on Chapter

125

111.

Exercises on Chapter

III.

34. Investigate the behaviour (convergence or divergence) of a series an for which a n from some index onwards, has the following values: ,

,

^% +

_wl

n"

V/n

'

tt\

n

\

)>

+*-

35.

If

2 dn

diverges, so also does

-?

1

-*

2

Pn

38. Suppose p n

+ oo

-\-

What must be

the

dn diverges and dn

that

is

>Q

t

what

is

the behaviour of the series

^'. >

,

but with

< llm (pn +L

1

tne behaviour of

a a,? +.,,

What

.

n> *

is

*

the behaviour of the series />n

What

>0).

(,B

36. Under the same assumption

37. Suppose

*

pn )

upper and lower limits of the sequence

()

so that

converge or so that it diverge? 39. For every n 1,

>

4O. The sequence

is

of

numbers

monotone descending.

41. If convergent.

2a n

has positive terms and

Show by an example

true in general, and prove that

42. the series 6*

If

it

is

for every ^

2 ^an an+1

is

also

theorem is not does nevertheless hold when (an ) is monotone.

S an converges, and an ^ 0, then

2 /T^TTTa'

convergent, then

that the converse of this

>

S

B also converges,

and

also indeed

0.

(051)

Chapter IV. Series of arbitrary terms.

126

43. Every positive pressible in the form

real

number

a^

&$

^3

one and only one way, ex-

in

is,

^4

S

I for n is a non-negative integer with a n 1 for n dition of not being every n after a definite n . then, the series terminates.

where a n

44.

<; x

If

<

1

,

then there

integers (A?), with for

K

which

*i

x

is

rational

if,

and only

> If

subject to the conis

...

of positive

,

+ ___J

Chapter

and only

rational,

-

3

2

+

...

the k v 's are all equal after

if,

1,

xl

one and only one sequence

is

<* <* <

^ L + _i_ +

n

some index

vr

IV.

Series of arbitrary terms.

The second

15.

principal criterion

convergent

and the algebra

of

series.

00

An

infinite scries

n=0

an

whose terms are now no longer assumed

,

but

subjected to any restriction,

may be

we

agreed, to be considered as the sequence (s n ) of its partial sums

was,

sn

and we proposed

to

= *o + *i H-----

transfer

real

arbitrary

essentially a

1-

an

(n

sufficient

81.

,

1

itself

,

2

,

for

.

.

.)

the de-

or divergence

main

attention.

51), expressing the necessary and convergence, at once provides the following

criterion

condition for

=

immediately to the series

signations introduced to characterise the convergence of (s n ). The case of convergence again occupies our

The second main

numbers,

new symbol

(47

Fundamental theorem (First form). The necessary and sufficient a n ts ^at, having chosen condition for the convergence of the series

any

n

e

>n

> {}

2

we can assign a number n Q and every k ^> 1 we have ,

,

that is to say, in the present case, that

=w

(e)

such that for every

The second

15.

principal criterion and the algebra of convergent scries.

Starting with the second form of the

main

criterion,

we

127

also ob-

fundamental theorem the following

tain for the present

2

Second form. The series a n converges if, and only if, given 81 a, the sequence a perfectly arbitrary sequence (k n ) of positive integers, of

numbers

Tn =(n n+l + invariably

ff

proves to be a null

extend this somewhat

-----f- r&M+* ) w+4 H n

sequence

1 .

And

as before we can

the

to

J a n converges if, and only if, given 81 b. two perfectly arbitrary sequences (vj and (k n ) of positive integers, of % oo the sequence of numbers which the first at least tends to The

Third form.

series

,

+

,

invariably proves

,

a null sequence.

to be

R em arks.

A

1.

series

represents

quences of numbers, and

essentially

a

in particular, as

new symbolic expression for sewe remarked, not only every series

represents a sequence, but every sequence is also expressible as a series; remarks and examples given on p. 84 have their parallels here.

The contents

2.

Given

e

^>

of the fundamental theorem

may bo

formulated as follows:

every portion of the series, however long, provided only

,

all

its

initial

<*

index be sufficiently large, must have a sum whose absolute value is Or: Given f>> 0, we must be able to assign an index m so that for n^>m the addition, to s n of an arbitrary number of terms immediately consecutive to an can only alter this partial sum by less than e. 3. Our present theorems and remarks of course also hold for series of This the reader should verify in each separate case. positive terms ,

A

finite

part of the series, such as

4- 0K+a H----- h

we may

for brevity call a

pot tion of the

begins immediately

after the y th term.

plicitly indicate the

number

Ty

t

If

i.

whose

we

initial

are

#*+;i

series,

denoting

When

it

by

Tv

if

it

we may further ex-

required, of terms in the portion by denoting this by considering an arbitrary sequence of such portions

index

*

+

>

we

shall refer to

it

for short as a "se-

qnence of portions" of the given series. The second and third form of the fundamental theorem may then also be expressed thus: th

form. a n converges if, and only The series "sequence of portions" of the series is a null sequence.

4

1

in his

if,

every 81 c.

It is substantially in this form that N. H. Abel establishes the criterion fundamental memoir on the Binomial series (Journ f. die reine u. angew.

Math., Vol.

1,

p.

311. 1826).

Chapter IV. Series of arbitrary terms.

128

,

Sa n

can be

is

for instance,

,

The sequence (Tn ) '

is

n

Remarks and examples.

thus divergent if, and only if at least one sequence of portions assigned which is not a null sequence. For the harmonic series

1.

is

not a null sequence, and therefore

therefore certainly

divergent. 1

For

2.

we have

we have

y\ 3 ** n*

1

therefore

TV

1

.

<

,

so

+

+

that

;

7 V ->0, when y-*-f oo.

The

series

therefore

converges.

For the sequence

3.

n=l

we have

TM = Tn Whether

k


For

r -+

.

is

t

.

= (-

]

even or odd, the expression if

we

1

m

brackets

is

certainly positive and

take together, in pairs, each positive term and the follow-

ing negative term, the sum of the two K in each case positive. If k *s even all terms are exhausted in this manner, if k is uneven a positive term remains, so that in either case the complete expression is seen to be positive. on If, the other hand, we write it in the form

__ __

n+l all the

over

terms are

if

k

is

now

\n

___ w+

+2

Vn

3/

exhausted

when

k

+4

is

__ n

+5

odd and a negative term remains

even, so that in both cases only subtractions from

and thus the expression

is

-

< n+ -

.

-

-

n -{-

1

occur,

As we now have

I

1

"

'

'

"'"'^n+1

this involves

series converges. We shall see later (cf. 120) that with the limit of the sequence 46, 2 and has the value log 2.

and our

its

sum

coincides

The second

15.

and the algebra

principal criterion

of

129

series.

convergent

these four separate forms of the second fundamental criterion we once attach the following simple but important considerations: may we obtain Since in the second form, l, by putting ft w an+1 *0, we have also (by 27, 4), a n *0, i. e. we have the

To at

=

Theorem a

In a convergent

1.

a n ->

null sequence:

series,

the terms

a n necessarily form 82,

0.

That this condition is not sufficient for convergence, we know from the example of the harmonic series. we already know that a n converges, If, on the other hand,

already,

CO

so does

then

the

series

+

aM + 1

n+a

+

n+3

+

a v> =2? r-n +

whose

l

sum

is

as

usually,

denoted

by

rn

Now we

valid for

n

and so

>n

$ n -\- rn

=s

and every k I> 1 n > n

the of

an

series

the

allow k to increase beyond

,

r n <^

,

The remainders

2\

the

i. e.

,

remainder of the sum

=s=

>

complete

may, in the inequality

obtain, for every

Theorem J an

that

(so

series).

so called

the

r

e

n

Thus we have

.

all

bounds

the

CO

=

a v of a convergent series r=n + l

numbers

n=o

always form a null sequence. In 80, we saw further that if the terms of a convergent series an (of positive terms) are monotone decreasing, then, over and above the theorem just proved, the condition n a n > must hold. That this need no longer be the case in series of arbitrary terms is

already that

shewn by the

series given in

81 c,


+ 2 gg H-----h n a n n

i.

e.

3.

We can,

however, show

we must have

that

In fact

the

terms of the sequence (n

we have 2

the

^

are small on the average.

n)

more general 00

Theorem and

if

(p

,

3.

p l9

quence of positive

//

n=0

an

t5

of

arbitrary

terms

denotes an arbitrary monotone increasing numbers tending to oo then the ratio

...)

+

Aa 2

a convergent series

l

+

se-

,

+ Ai a n

^

Q

L. Kronecker, Comptes rendus de 1'Ac. de Paris, Vol. 103, p. 980. 1886. this condition is not only necessary, but also, in a quite determinate sense, sufficient, for the convergence of the series 27 a n (cf. Ex. 58 a).

Moreover,

Chapter IV. Series of arbitrary terms.

130 Proof.

By 44,

a

l

*0

+ (P* - &) S

*0 and

Since--rn

*s implies

sn

2,

sn

s,

l

4-

+

'

-

we must

W

-/>-,) *n-i

(ft.

therefore have

Pn

But this is precisely the relation we had to prove, as may be seen once by reducing to the common denominator p n and grouping in succession the terms which contain P 9p >->pn respectively 3 As regards any condition for convergence whatsoever, we have to repeat expressly that the stipulations made therein always concern those terms of the series which follow or only need concern on some determinate one, whose index may moreover be replaced by any larger index. In deciding whether a series is or is not conat

.

l

the series,

as

does not come into account.

This

the beginning of

vergent, ity,

it is

we

for

usually put

more

express

brev-

exactly

in the following 00

Theorem

4.

//

we deduce

from a given

,

series

2a

n

>

a new

00 '

series

n=0

a n by omitting a finite

number

of

all three

things at once]

series

terms,

or

number

altering a finite

so produced by #

of terms, prefixing a

number

finite

of terms (or doing the terms of the

and now designating afresh 4 ',

a/,

...,

then either both series

converge

that a definite integer q

= Q exists

or both diverge.

Proof. The hypotheses imply

such that from some place onwards, say for every n

> m

,

we have

Every portion of the one series is therefore also a portion of The funthe other, provided only its initial index be -j? damental theorem Sid. immediately proves the correctness of our

>m

|

|

statement.

8

quence

Instead (f n)

constant

K

,

the positive p n we may on the one hand, assignable for which of

for which,

is

for every n. 4 I.e. in short:

".

|

. .

by making: a

finite

(cf.

pn

44, 3 and *

\

-f-

number

the sequence (an) of the terms of the scries ..."

5)

take

oo and, on

any

se-

the other, a

of alterations (27, 4) in

The second

15.

principal criterion and the algebra of convergent series.

131

Remark. should be expressly noted that for series of arbitrary terms, comparison tests of every kind become entirely powerless. In particular, of two series 2 an and 2 an f whose terms are asymptotically equal (an a n f) the one may It

~

well converge and the

quite

--

aJ * = an

and

-\

-

:

Take

other diverge.

for

,

instance an

=

f

_

]\n

--

ft

.

nlogn

we prove the following criterion of convergence, which almost unique in consequence of its particularly elementary appears relates to the so-called alternating series, i. e. to series and character, whose terms have alternately positive and negative signs: Finally

Theorem is

5 [Leibniz's rule .] the terms of

5.

absolute values

the

invariably convergent. The proof proceeds on

For

an

if

n

sign

l)

(

,

for

write, therefore,

|

given alternating every n, or the sign we have cc an n ,

the

lines

that

to

81 C,

of

3.

then a n has cither the n+1 for every n. If we l)

series, (

,

\

Tn = Tn>k = As

alternating series, for which monotone null sequence,

form a

quite similar

the

is

An

[

B+1

-

n+9 -h ccn+3

-+ + (-

1

I)*-

n

+J

-

monotone decreasing, we may convince ourselves example referred to, that the value of the square always positive, but less than its first term a n+1 Thus

a's

are

precisely as in the

bracket

is

.

\Tn

\

= [7^1 <

w+

1 ,

null sequence by hypothesis, involves cc n forms a a n by 81 C. and therefore convergence of

which, since

Tn

*

,

The algebra

of convergent series.

has been emphasized that the term "sum", Already to designate the limit of the sequence of partial sums of a series, is misleading in so far as it arouses a belief that an infinite series may be operated on by the same rules as an (actual) sum of a definite in 69,

number

2,

3,

it

+ + +

e. g. of the form (a Sa7- This is not b c d) however, and the presumption is therefore fundamentally erroneous, although some of the rules in question do actually remain valid for infinite series. The principal laws in the algebra of (actual)

of terms,

>

the case,

sums are (according to 2, I and III) the associative, distributive and commutative laws. The following theorems arc intended to show how far these laws remain true for infinite series. 6

Letters to

/.

Hermann

of 26. VI. 1705 and to John Bernoulli of 10.

1.

1714.

Chapter IV. Series of arbitrary terms.

132

Theorem

83.

The

1.

associative

law holds for convergent

infinite series

unrestrictedly in the following sense only:

ao

+ a + *3 H---- = s

n)

+ fa^+i + 0^+2

i

implies

K+ if

ra

,

T>J

the

.

.

,

sum

ai .

-\

-----h

denote

-I

-----h

any increasing sequence

the terms

of

rt

enclosed

of different

each bracket is

in

----

-f

= s,

integers

and

as

one

is

ob-

considered

term of a new series

where, therefore, for k

=

=

+ Sc +

a * +l k

^fe

(VQ

1, 2, ...,

,

-----1"

2 "I

^'k

+i

The converse is however not always true. The succession of partial sums S^ Proof. 1).

viously the sub-sequence s ri

sums

s n of

2an

By 41,

.

,

s r,

4,

5M

..., s r

f

,

of

2A

k

of the sequence of partial

...

same

therefore tends to the

limit as s n

.

Remarks and examples. 00

The convergence

1.

of

plies that of

00/1 ____ IN 2 A/ \2 A - 1 tSi vi

and

L

*

I

j

_ ""

/

_ -

==1

n

^_ 00

1 *

y

(2 A

^

___

_

- l)-2 A ""

--f-

-

--- ---

%

therefore im-

.

4

J

111

_^ 1

__"^___A__"^

^

-

3-4

-2

5-6

"*"

" " *

also, similarly, of

-L- JL.

1

==1 (^-M-f M-...-I '"VT T/ U~T/

i

and

111

1

J\'

-

y\ n=l

three series have the

all

shows

series

that

in

s

12 2.

+

+ (1

If

>

r~ o 1 u

we

x ..

(T?

denote this by

o~~T O*4

= To

and

\u

s, tlie

the second tnird >

tnat

^"^12'

That we may

introduce brackets, but may not without consideration omit a series, the following simple example shows: The series . . is certainly convergent and has the sum 0. If we substitute every1) for 0, we obtain the correct equality

brackets occurring

where

4-5

117 +

same sum.

any case,

"2.3

+

m

.

(1

-

1)

+

-

(1

1)

+

.

.

.

= 2(1

But by omitting the brackets we obtain the divergent

1_

1

+

1

_

1

-

1)

series

+ _...,

-

0.

The second

15.

principal criterion

and the algebra of convergent series.

133

which therefore may not be put "= 0". For we should then by again grouping the terms, though in a slightly different way, obtain 1

(1

(1

1)

-

...

1)

which again converges and has the sum

=

1

1.

s

1

We

_

-

-

.

should therefore

.

.

,

finally

deduce that

e ! !

.

We

proceed at once to complete Theorem

by the following

1

CO

Theorem

If the terms of a convergent

2.

themselves actual sums (say, as above,

!>;

^o

and only

if,

tnen

1)>

Ak

a^ k+1

we "may" omit

infinite series

+

.

.

.

+^

2 Ak

are

*=o

fc+1

0,

;

the brackets enclosing these if%

00

new

a n thus obtained also converges. n=0 A k while in In fact in that case, by the preceding theorem, Z a n the case of divergence of 27 a n this equality would become meaningless. the

series 2!

2

,

,

A usually sufficient is

indication as to whether the

new

series converges

provided by the following

Supplementary theorem. The new

series

Ean

deduced from

H Ak

in accordance with the preceding theorem is certainly convergent if the quantities

form a

null sequence

Proof.

If s

7 .

be given

> 0,

choose m^ so large that, for every k

>m

l9

we have

and choose m% so large is

that, for

larger than both these

8

every k

numbers

ml

>m

and

2,

mz

In former times

,

we have then

we

A k < ?. 2 '

If

m

have, for every

before the strict foundation of the algebra of infinite mathematicians found themselves fairly at a loss when confronted with paradoxes such as this. And even though the better mathematicians instinctively avoided arguments such as the above, the lesser brains had all the Thus e. g. Guido more opportunity of indulging in the boldest speculations. Grandi (according to R. Reiff, v. 69, 8) believed that in the above erroneous train of argument which turns into 1, he had obtained a mathematical proof of the possibility of the creation of the world from nothing 7 As A k - 0, this is of itself the case if the terms which constitute A k have one and the same sign in particular, therefore, if by omission of the brackets we obtain a series of positive terms. Furthermore, this is always the case if the terms v k of terms grouped together in an form a null sequence and if the number vk +i A k forms a bounded sequence for A 0, 1, 2, . . . (An example is afforded by the series 2(an -f- bn ) in the next Theorem 3.) series (v. Introduction)

!

Chapter IV. Series of arbitrary terms.

134 For which

to

and

number k must be

this

5n

And

each such n corresponds a perfectly

= 5 *-l +

, fc

m.

number

for

A,

In that case, however,

K-

-----I- *n> +l H

^4 < '

Sfc-i

I

fc

since Sn

we

^>

definite

~S=

(

5n

~ 5 fc-l) +

(

5 /c-l

-5

)

then have, effectually,

n=0

=s

an

q-

>

e.d.

Example.

is

^

convergent; for

is positive,

..2

>

1

2^5

,

'

')

is

is

a null sequence.

also convergent.

the series in

its first

Theorem

3.

Its

fc>

1

1

^4^-4 Since similarly, for every k

and, for every

1, is 1

2(*-l) A*

1

**"

211

Therefore the series

sum

call

it

S

is

certainly >> A^

Convergent series

may

JX =

s

be

added term by term.

2*n =

and

t

w=o

n=-o

imply both

l(. +

n=o

j-+

without brackets I

ao

A 2 > ~1

^

,

as

form had only positive terms.

precisely,

and also

-f-

+ 6o + *i + & + i

a

H----

= +

*

More

15.

The second

Proof. series,

then

follows

at

omitted,

principal criterion and the algebra of convergent series.

If

and

sn

+O

(s n

once that

in

the

are

t

n

the

are those

* s

-

(s n -f-

series

n)

+

(|

Theorem

an

+

\

|

The

Theorem

The

Proof.

2an = s

from

of the old are s n

This theorem, to

proof

is

Convergent series

5.

.

9,

first

two

therefore

it

convergent,

are null sequences.

|)

may

Convergent series

4.

tracted term by term.

that is to say,

bn

the

oj

By 41,

That the brackets may be follows from the since (|0 n |) and (|& n |) and

t.

thereby proved

supplementary theorem of Theorem 2, therefore also

sums

partial

of the third.

135

it

same sense

in the

be

sub-

identical.

may

follows,

by a constant, an arbitrary number , that

be multiplied

if c is

sums of the new series are cs n if those Theorem 41, 10 at once proves the statement. some extent, provides the extension to infinite series partial

,

of the distributive law.

Remarks and Examples.

84.

These simple theorems are all the more important, as they not only allow us to deduce the convergence of the new series from the convergence of known series, but also set up a relation between its sum and that of the known series. They form 1.

therefore the foundation for actual calculation in terms of infinite series.

_ -

QO /

2.

The

J)n -

-

series

1,

was convergent.

n

n=l theorem

-1

s

denote

its

sum.

By

the series

J__

/i-l

M

and

-l

2ft/

are then also convergent with the sum this giving dance with Theorem 5,

-2

and add

Let

this

term by term

4 kJ

we

^ 4 k 1- 1

JL]

3

first

by

,

in accor-

2

to the second;

4kn>

Multiply the

s.

4k

2

obtain 3

ft/

a.

or more precisely: we obtain the convergence of the series on the left hand side the latter expressed in terms of the sum of the and the value ot its sum, The convergence was also proved directly in series from which we started. connection with theorem 2; the present considerations have led however appreciably further, since they afford a definite statement as to the

Before

we examine

sum

of the series.

the validity of the commutative and distributive latter, the possibility of forming

laws and investigate, in relation to the the product of

two

series,

we

still

require an important preliminary.

Chapter IV. Series ol arbitrary terms.

136

Absolute convergence.

16.

The series 1 + | 3- + we replace each term by its -3

But

if

proved (81 c, 3) to be convergent* absolute value, the series becomes

+ +|+

the divergent harmonic series 1 | usually make a very material

will

of series.

Derangement

In

difference

all

that

follows,

it

whether a convergent

2

series a n remains convergent or becomes divergent, when all its terms are replaced by their absolute values. Here we have, to begin

with, the

85.

o Theorem. positive terms')

A 2\

series

an

2an

is 8

converges

\

.

certainly convergent if the series (of And if 5 then s, 2\ an n

=

Za =

\

l|^s. Proof.

Since

<

left hand side is here certainly e if the right hand side is, whence by the fundamental theorem 81 our first statement at once

the

Since further

follows.

we have also, by 41, By this theorem, and is

86.

2a n

<

s

2,

|

S.

|

convergent series are divided into two classes

all

belongs to the one or the other according as

We

not also convergent.

is

-2"|fl,J

or

define

Ea

also n is such that Z\ an If a convergent series otherbe and then the will series called absolutely convergent, converges, first wise non-absolutely convergent 9 .

Definition.

Examples.

The (

-l

\

series

^ n

;

(>!); 5l^t2?. n

w-1

are absolutely convergent.

Every convergent

=0

series of positive

terms

is

of course

absolutely convergent.

The will first is

very great significance of the concept of absolute convergence

appear in this the convergence of absolutely convergent series easy to recognise than that of non-absolutely convergent :

much more

usually, in fact,

series,

by comparison with

series of positive terms,

On Cauchy, Analyse alggbrique, p. 142. (The proof is inadequate.) the other hand, the example just given showed that the convergence of 2a n need not involve that of 2\an \. 9 series is thus u non-absolutely convergent" if it converges, but not absolutely. The designation "non-absolutely convergent" applies therefore to convergent series only. 8

A

Absolute convergence.

16.

Derangement

137

of series.

so that the simple and far-reaching theorems of the preceding chapter But this significance will immeavailable for the purpose.

become

become further visible in that we may operate on absolutely convergent series, on the whole, precisely as we operate on (actual) sums of a definite number of terms, whereas in the case of non-absolutely diately

The

convergent series this is in general no longer the case. theorems will show this in detail.

following

2c

Theorem 1. // n is a convergent series of positive terms and a n , for every n -a series the terms m, satisfy the condition if of given

2

>

'

an

I

2an

then

is

tively, is

|

2 an

^ cn

^0

or

condition

(absolutely) convergent.

Proof. an

I

By is |

the 1 st and 2 nd comparison tests, in either case convergent

11 ,

72 and 73, respecand so therefore, by 85,

.

In consequence of this simple theorem the complete store of convergence tests relating to series of positive terms becomes available infer at once from it the following for series of arbitrary terms.

We

Theorem 2. // Zan is an absolutely convergent an form a bounded sequence, then the series

and

series

if

the factors

also (absolutely) convergent.

is

Proof.

Since (|# n

(aj, it follows from simultaneously with

2 \

an

a bounded sequence simultaneously with is convergent an |-| 2*| #n a n

is

|)

70,2

that 2*| a n

|

=

|

. \

Examples. 1.

2 cn

If

bounded, then

is

2

ct n

We

any convergent series of positive terms and

may vergent. with the invariable sign +, replace this by quite arbitrary in every case we get a convergent series; for the factors a bounded sequence. Thus for instance the series

S(-V)ca all

10

an

c^, 's

11

[z],

as

In the second condition, c n =(= 0.

The corresponding

usual,

1

signs, certainly form

it

stands for the largest

is tacitly

assumed

that,

integer not

for every

n>m,

criteria of divergence,

and are of course abolished, since the divergence of J?| a n that follows.

are

+ .and

^

and

4=

is all

the

,

convergent, where greater than z.

are

if

2

cn is also absolutely conalso convergent, for then thus, for instance, instead of joining the terms c t *!>*>

c n is

Cf.

Footnote

8.

dm |,

not necessarily of

87.

Chapter IV. Series of arbitrary terms.

138

Sa n

2. If

is

absolutely convergent, then the series obtained from it by in the signs of its terms, is invariably an absolutely

an arbitrary alteration convergent series.

We

now

shall

returning thereby to the questions put aside at

show that for absolutely convergent series 15), the fundamental laws of the algebra of (actual) sums are in all essentials maintained, but that for non- absolutely convergent series this is the

end of

last section

(

no longer the case. 6 -f- a" does not in general Thus the commutative law "a-\-b hold for infinite series. The meaning of this statement is as follows: If is any rearrangement (v Q> v iJ v a , .) (27,3) of the sequence (0,1,

=

.

2,

. .

.)

.

then the series

!;<*'

=

n =0

j>j

n=0

av

(i.

w

e.

with an

'

=an v

for

n

=

0, 1, 2,

.

.

.)

00

will

be said,

for

brevity,

to result

from the given

series

=o

a n by

rearrangement or derangement of the latter. The value of (actual) sums ot a definite number of terms remains unaltered, however the terms may be rearranged (permuted). For infinite series this is no 1 longer the case *. This is shown already by the two series considered as examples in 81 c, 3 and 83 Theorems 1 and 2, namely

which are evidently rearrangements of one another, but have different The sum of the first was in fact s j, while that of the second was s'>^; and indeed the considerations of 84, 2 showed more

<

sums.

precisely that

s'

=f

s.

This circumstance of course enforces the greatest care in working take account with infinite series, since we must to put it shortly It is therefore all the more valuable to of the oider of the terms 18 .

know in which we have the Theorem

88.

cases

For

1.

holds unrestrictedly

Proof. is

Let

we may

not need to be so careful, and for this

absolutely convergent series , the commutative law

1

*.

Z an

convergent as well),

Z

be any absolutely convergent series (i. e. let a n =27 a v be a derangement of

and

Z

'

\

an

Z an

\

.

M

Thib was first remarked by Cauchy (Resume's analytiques, Turin 1833). As 2 a n merely represents the sequence (s n ) and a rearrangement of Za n produces a series a n ' with entirely different partial sums sn ', these not merely forming a rearrangement of (sn ), but representing entirely diffeit seems a priori most improbable that such a derangement rent numbers!! will be without effect on the behaviour of the series. 18

t

2

14

Lejeune-Dinchlet, G.: Abh. Akad Berlin 1837, p. 48 (Werke I, p. 319). also find the example given in the text, of the alteration in the sum

Here we

of the series

by derangement.

Absolute convergence. Derangement of

16.

Then

S an clearly also a bound Z absolutely convergent with Let sn denote the partial sums of 2 a n and s n those of S a n Then arbitrarily given > 0, we may first choose m, in accordance with

every bound for the partial sums of sums of 27 an |. So an '

for the partial

S an if

e

139

series.

is

\

\

'

is

1

'

.

'.

,

is

81, so large, that for every k I

and now choose n Q so at least all the

+

^

1

m+ 2

I

large that the

numbers

0, 1, 2,

.

.

+

+

1

numbers .

,

am+k

|

v

v l9 v 2

,

Then

m.

<e

I

,

.

.

.

vn

,

the terms a

'

comprise

a lf a z

,

>

,

>

,

15

>

,

a m evidently cancel in the difference sn s n for every n w and only m remain, that is, only (a finite number of the) terms terms of index a m\-i> a m\2> Since, however, the sum of the absolute values of any number of these terms is always nQ e, we have, for every n ,

>

<

and therefore sn

= sn +

(

sn

r

~

s n)

a

is

,

and has the same sum

as

2 an

But

'

null sequence. nas tne same limit as s n sn )

(sn

i.

e.

this

an

implies

that

'

is

convergent

q. c. d.

,

This property of absolutely convergent series deserves a special designation:

is

so essential that

it

A

Definition.

convergent infinite series which obeys the commutation i. e. remains law without any restriction , convergent, with unaltered sum, shall be called unconditionally converunder every rearrangement, convergent series, on the other hand, whose behaviour as to congent.

A

vergence can be altered by rearrangement, for which therefore the order of the terms must be taken into account, shall be called conditionally con-

vergent. The theorem proved

just above can

now be

expressed as follows:

''Every absolutely convergent series is unconditionally convergent" The converse of this theorem also holds, namely

Theorem

2.

tionally convergent

16 .

Every non-absolutely convergent series is only condiIn other words, the validity of the equality 00

2

=*

H~0

Z

a n depends essentially in the case of a non-absolutely convergent series series on the left, and may therefore, by

on the order of the terms of the

a suitable rearrangement, be disturbed.

16

That such

16

Cf.

a

number n Q

exists follows

ment.

Fundamental theorem of

44.

from the very

definition of derange-

89.

140

Chapter IV. Series of arbitrary terms.

Proof. It obviously suffices to prove that, by a suitable rearrangeThis we may we can deduce from 2 an a divergent series 2 a n

ment,

do

'.

The terms

as follows:

2 an

of the series

which are

^ 0,

we

denote,

those which which they occur in 2 an by p l9 p 2> p& 2 pn and are < Then we denote similarly by q l9
.

,

,

.

;

.

.

.

,

.

have, for each n,

2

an would, by 70, be absolutely convergent, in contradiction with our assumption 17 . If for instance p n diverges, then we consider a series of the form

hence

2

Pi

+P2 +

+ Am

+ Ai+l + Am+2 +

01

+ Pm*

ft

+ A.+l +

>

in which, therefore, we have alternately a group of positive terms followed by a single negative term. This series is clearly a rearrangement of the given series 2 a n and will, as such, be denoted by 2 a n '. Now since the series 2p n was assumed to diverge, and its partial sums are therefore

unbounded, we can, in the above,

+ Pm >l + ?i> L

Pi+P* and, generally, w,,

first

mz > m

tncn

i

+ Am +

"!-

> #*_!

choose

m

so large that

-

sums of

this

the above

But 2 a n series whose

.).

>v

= (v

integer, the partial

1, 2,

l

last .

2 qn

is

It is

not

(cf.

44);

.

term

diverge

.).

2 an

sums of

18

E an

'

is

.

+q 2

a negative term a n is by qv of since v may stand for every positive ' are certainly not bounded, and an is

'

,

2

18 .

difficult to see that actually both

but this

.

And

divergent, we need only interchange in the above to reach the same conclusion.

17

.

then clearly divergent; for each of those partial

is

itself is divergent, q. e. d.

If

+

so large that

'

.

.

p2

>

v

= 3, 4,

-f

+pm > 2 + ?i + ft

+ Pm > v + q + ft + (y

p

so large that

for the

clearly diverges to

moment

+ 00.

2p n

the series

superfluous.

and

Spn

2 qn

suitably

and

qn must

Absolute convergence. Derangement of

16.

141

series.

Example. >

27 71=1

-

have, for v

3), for

46,

(cf.

1, 2,

.

.

.

A =-

was seep

...

<

Since

convergent.

we

_ _i---__--* &

'- E=

n

1, 2,

.

.

.

De

to

non-absolutely

,

,

!+l + J+---+2; >2v

-

we apply

If therefore

to the series

2

-

the procedure described above,

we

ti

mv ~

need only put

2

4-

4

2

+

^

8 ",

+

to

deduce from

...

~

+

28

it

by rearrangement the

1-f 2 8~4r~2

~*~ ' ' '

+

~~

3

2

divergent series

"*"

'

*

'

For the partial sums of this series terminating with the v th negative term i. e. certainly > v. than 2 v minus v proper fractions,

is

greater

Theorem

may

still

88, 1 on the derangement of absolutely convergent series be considerably extended. For the purpose, we first prove the

following simple

H

Theorem

an is absolutely convergent, then every "sub-series" 3. If for which the indices A n denote, therefore, any monotone increasing

Sa\n

sequence of different positive integers,

is

again convergent and in fact again

absolutely convergent.

Proof. By

E

74, 4, 27 aXfl converges with (a n ). By 85, the stateonce follows. We may now extend the rearrangement theorem 88, 1 in the following manner. We begin by picking out a first sub-series 27 a\ n of the

ment

1

\

at

given absolutely convergent series 27 a n and arranging this in any order, denote it by ,

first

sub-series

#(0> be the sum of this series, certainly existing, by the preceding theorem, We may also and independent of the chosen arrangement by 88, 1 19 allow this and the following sub-series to consist of only a finite number let

.

of terms,

19

The

i.

e.

letter

infinite array.

not to be an

z

is

infinite series at all.

From

the remaining

intended as a reference to the rows of the following doubly

Chapter IV. Series of arbitrary terms.

142

terms

as far as

is

sub-series,

we

possible

and denote

again pick out a (finite or infinite)

arranged in any order,

it,

by

sum by #(1) from the remaining terms we again pick out a sub-series, and so on. In this manner, we obtain, in general, an infinite series of finite its

;

or (absolutely) convergent infinite series:

If the process was such as to give each non-zero term 20 of the scries a place in one (and only one) of these sub-series, then the series

an

or, that is to say, the series

21 .

For

this again

Theorem

we

An

4.

:

absolutely convergent series

More

tended sense be rearranged.

*

Proof.

If e

the remainder in the .

.

,

first

nQ

|

+

"may"

also in the ex-

series

+ *d> + *< + 2)

sum

its

is

equal to that of

an

.

>

be given, first determine m so that, for every k 1 am+2 so that e, and then choose n a n ^\ v sub-series # the terms aQ a ly a 2 0, 1,

am+1 I

The

precisely:

again (absolutely) convergent, and

is

.

be called a rearrangement of the given have, corresponding to theorem 88, 1

in a further extended sense

may series

\

am of the given

+

|

\

+

.

.

.

=

2

^

<

.

series certainly appear.

.

.

,

If

,

n

>n

,

Q

and

> m,

,

,

then

the series . .

.

+ *0> - sn

20 The introduction or omission of zero terms in 27 an or in the partial sums obviously without influence on the present considerations. 21 Put into the first sub-series, besides a and a jt all those terms ant for instance, in any order, whose indices n are divisible by 2; into the next all those of the remaining terms whose indices are divisible by 3; into the next again all remaining terms whose indices are divisible by 6; and so on, using the prime numbers is

7, 11,

13 ... as divisors.

Absolute convergence. Derangement of

16.

an whose indices are contains only terms of m, the absolute value of this difference with increasing to zero, so that

> m. <

143

series.

Hence, by the choice

is

e,

and tends

therefore,

,

+ *W +

lim (*(>

.

.

.

+*

(n)

)

=

= s = 27 a n

lim s n

.

n >*)

Moreover, the convergence of 27 #W which we have obviously

thus established

is

is

also

absolute, since for each n

The 1

,

2,

.

.

converse of this theorem

theorem 83,

that of .

,

1,

Given, for k

-

0,

the convergent series *<*>

if

of course, even less valid than

is,

without further consideration.

the aggregate of terms a n

W

= 27* n

<*> f

be arranged in any way as a sequence

(cf.

OC

53,

then 27 a n need not at

4),

vergent.

To show

all

converge,

this is possible

series z^ k \ the series 1

we have

+ + +

1 -|-

even should 27 zW be conk-o only to take, for each of the And even if a n con-

2

.

2

sum need

zW. not be equal to that of A general discussion of the question under what circumstances this converse of our theorem does hold, belongs to the theory of double series.

verges, the

However, we may even here prove the following one for applications

ticularly important

Main rearrangement theorem number of convergent

which

case,

a par-

is

:

22 .

We

suppose given an infinite

series

=a + + + an <> + = *bO> + *!<'>+... + ,+... (o)


.

fll

*0>

. .

.

.

.

(A) <*>

and assume

that these series are not only absolutely convergent, but satisfy

the stricter condition that, if

we

write

27| *<*>

=o

= W |

the series

22

Also called Cauchy's Double Series Theorem.

(*

= 0,

1, 2,

.

.

.

,

fixed),

90.

Chapter IV. Series of arbitrary terms.

144:

is

Then

convergent.

form

the terms standing vertically one below the other also

and

(absolutely) convergent series;

ZsW

is

write

=&

=o then

we

if

again absolutely convergent and

23

= 0,

(

1,2,...

.fixed),

we have

= J7*<*>; in other words, the two series

formed by

sums of the rows and by the sums and have the same

the

of the columns, respectively, are both absolutely convergent sum.

The proof is

extremely simple: Suppose all the terms in (A) arranged with 53, 4) in a simple sequence, and denoted, accordance anyhow (in Then a n is absolutely con. as terms of this sequence, by a a l9 a 2 ,

For every

vergent.

must .

i.

.

.

e.

,

still

am

be

all

fg a.

^

o-,

.

.

Let

2zW

both

\

\

.

,

for instance

,

a l9 a 2

,

W 2

arrangement of the terms an

sequence a ', a^, a%, . a mere rearrangement of

Now

of 27 a n

H

.

by choosing k so large that the terms a the k first rows of (A), we certainly have

different

with the same sum.

.

since

occur in

A

sum

partial

,

in (A) as a simple ' a an which would be would produce series an and therefore again absolutely convergent,

2

and

in the extended sense of

,

this invariable

also

2sW

theorem

sum be denoted by

s.

an

are rearrangements of

=

s,

Therefore these two proved. series are both absolutely convergent and have the same sum s, q. e. d.

This rearrangement theorem general form as follows:

4, just

may be

Supplementary theorem. and

there exists

a constant

of any finite number

23

Here the

of

letter s is

K

the

If

M

expressed in somewhat more

elements

of

a countable

is

such that the

sum of

M

set

of numbers

the absolute values

remains

invariably

intended as a reference to the columns of (A).

< K,

Absolute convergence.

16.

we can

then

sum

assert

Derangement

with the invariable

absolute convergence

the

2Ak

145

of series.

Ak

of every represent sums of a or number elements of infinite finite of (provided each element and one A occurs in one the terms And this remains of of only ). true if we allow a repetition of the elements of M, provided each eleseries

s

whose terms

M

M

1(

ment occurs exactly together, as in

M

Examples points in 1.

what

Let

the

same number

of these important theorems will

2a n =s

A k 's

taken

occur at several crucial

Here we may give one or two obvious applications: be an absolutely convergent series and put

_+4a_a also

in all the

follows.

t

Then we

of times

itself**.

have

2a n = s.

+ ... + 2 "aM = a/

The proof

'

(w

results immediately,

= 0,

1, 2,

.

.

.)

by the previous

rearrangement theorem, from the consideration of the array

aa=

2. Similarly,

0+

+4-+4

from

-.~

(v.

68, 2h),

and

the array "

" 7

1-2"

1

2.3"

3-4"

+ 2 2^ + V4+ 8^-

>= o

we deduce

the equality, valid for any absolutely convergent series

ao 2-3

+2 3 4

The preceding rearrangement theorem evidently holds whenever every and at least one ^ tlie two series 2zW and ^s("> converges; it holds further whenever it is possible to construct a second array (A') similar the absolute values of the corresponding to (A), whose terms are positive and terms in (A), and such that, in (A'), either the sums of the rows or the sums 8.

*****

is

S^

>

of the

columns form convergent

series.

An infinite number of repetitions of a term different from zero is exof the theorem would cluded from the outset, since otherwise the constant can produce no disturbance. certainly not exist. And the number 24

K

146

Chapter IV.

Multiplication of infinite series.

17.

We

finally

= ab +

Series of arbitrary terms.

enquire to what extent the distributive law "a (b -f- c) That a convergent infinite series

c" holds for infinite series.

2an may

be multiplied term by term by a constant, seen in 83, 5. In the simplest form

the distributive law

is

case of actual sums,

+

(a

+.--

already

therefore valid for all convergent series. In the at once follows further, from the distributive

it

law, that (a-\-fy(c-\-d)=^ac-\-ad -\-bc-\-bd, and

al

we have

more

generally, that

+

or in short, that

/i=0 ^<=o,

.

..,m

where the notation on the right is intended to convey that the indices A and ju, assume, independently of one another, all the integral values from to I and to m respectively, and that all (I -f- 1) (m -f1) such products a^ b^ are to be added, in any order we please. Does this result continue to hold for infinite series? If 2an ~s and 2bn t are two given convergent infinite series of sum s and t>

=

is

it

possible to multiply out in the product v

/

\

GO

2W

2*i}-( A=0 / \/,=0 (00 any similar way, and in what sense Let the products

in

a*

/

is this

possible?

More

&/i

be denoted, in any order we choose 25 by p^ p 29 . . . ; it have the sum does if and convergent, 2p n convergent, ,

again absolutely convergent have the

Theorem then

convergent^

sum

s

26

If the

.

the

series

series

series

Sp n

precisely:

behave

like actual

Za n = s also

is

,

and

converges

sums.

Zb n =

s

the series t ?

Here

In fact

we

are absolutely absolutely and has the t

t.

We

the products a\ b^ are written down exactly in 90, to form a doubly infinite array (A). can then suppose in particular the arrangement by diagonals or the arrangement by squares carried out for these products. 25

the

suppose, for as n (t) or

same way

this, that

aM for 53, 4 and

We

26

Cauchy: Analyse alglbrique, p. 147.

Proof.

1.

147

Multiplication of infinite series.

17.

>

m

Let n be a definite integer and let be the and JLL of the products a\ b^ which have been p , ..., pn Evidently

largest of the indices i

denoted by p Q ,

i.e.

The


r,

-

and T denote sums of Jfj^n

the

if (7

partial

sums

and J?

of the series 2, a^

|

\

\

are therefore bounded and |

2pn

is

&;

.

< |

ab-

solutely convergent.

2 pn having

been proved, we need a special arrangement of the products a^ b^, for instance the arrangement "by squares". For this we have, however, obviously,

The

2.

absolute convergence of

only determine

o

and

bo

its

sum

= Po>

call

K+

S

it

i)(*o

for

+ 6 = Po + Pi + P* + PB i)

in general

an equality which, by 41,10 and

which was the

relation to

4,

becomes, when n

*>oo,

be proved.

Remarks and Examples.

2

for the validity of the relation st under the hypopn theses made, it is perfectly indifferent in what manner the products a "a b " are enumerated, that is to say arranged in order as a simple sequence (p n ). The

As remarked,

1.

arrangement by diagonals is particularly important in applications, and leads, the products in each diagonal are grouped together (83, 1), to the following

if

relation

:

n=0

n=o

+

writing for brevity a b n &i this relation is therefore secured

&_! H-

2

& n-a

+

when both

+

<* n *>

= cn

.

The

series on the left

validity of

converge ab-

solutely.

We are also led to this form or arrangement of the ''product series sometimes called Catichy's product of the two given series 27 by the consideration of products of rational integral functions and those of power series, which latter will be discussed in the following chapter: If in fact, we form the product of two rational integral functions (polynomials) 11

,

,

and

Cauchy

loc. cit.

b

-f-

6X

x

H- bv

examines the product series

x 2 -\-----h b m x m

in this special

form only.

Chapter IV. Series of arbitrary terms.

148

and arrange the result again terms are o

bo

we have

+

(ao

*>i

order of increasing powers of x, then the

in

+a

i

5o)

*+

&

(

+a

i

bi

+

a &o)

first

*a H----

above introduced, appearing as numbers c clt c2 , precisely due to this connection that Cauchy*s product of two series occurs particularly often.

so that

2.

the

,

,

It is

coefficients.

Since

2xn

n=0 3.

The

every real

may form

iC

series

number

J?

for such

an x

M

n==0

n cf.

r,

nl

x.

If

76, 5c and 85,

therefore x^ and

a;a

is

absolutely convergent for

are any two real numbers,

we

the product of

according to Cauchy's

Therefore

|#|<1, we have

convergent for

is

We

rule.

we have

get

for arbitrary

xt and

v fL. v

n-O W

"

^

f

n -0 M!

By our theorem, we have now

a;

a

putting o^

= ffl = w!

+

a?

f

= arf

:

*

n

established that the

distributive

be extended without change to infinite series, any may and this, moreover, with an arbitrary arrangement of the products if both the two given series are absolutely convergent. It is a A bp ,

law

rate

at

conceivable that this restricting assumption is unnecessarily strict. On 2* the other hand, the following example, given already by Cauchy for the purpose, shows that some restriction is necessary, or the theorem

no longer holds: Let

so that rule

2an

82,

5.

and

2bn

Then

c

are convergent in accordance with Leibnitz's == 0, and for n ^> 2,

=c

+ Replacing each root it

follows that, for

n

and therefore the product 18

the

in

denominators by the

largest,

Vn

+

+

^ 2,

Analyse alg^brique,

series

2cn ~ 2 (aQ b n +

p. 149.

a 1 6 W-1

1

,

Exercises on Chapter IV.

149

in accordance with 82, 1. This is therefore a we omit the brackets. when the case fortiori Nevertheless, the question remains open, whether we may not be able, under less stringent conditions than that of absolute converb n , to prove the convergence of a n and gence of both the series is

certainly divergent

2

2

2

some

at least for the product series pn the terms a^b^y for instance as in the

question

we

shall return in

special arrangement of

series

2 cn

To

above.

this

45.

Exercises on Chapter IV, for

45. Examine the convergence or divergence of the series 2(--l) n a n which a n , from some n onwards, has one of the following values:

1111 an +

46. What

'

Jn

b'

n l)

(

'

an

is

>

n

log log in

",

r

i

yn

have to be made

alterations

the behaviour of

11

1 1

log n

r

n

(-1)* H

,

*

the answers to Ex. 34,

when

required?

47. Let -

[1 i

Then the

for

2**

-

~Q

for


Z..LI

2 *-fl ,

(*

-XV'>Z--L$>

**

iii/

= 0,

1,

2, ...)

series 00

f

V

K~2 nlogn Converges.

What

^ ~n

the behaviour of ^^

is

2 n 4-

co 1

48. 49.

Let

denoted by that, for

I)"""

(

sn

the

and

,

1

/

,

partial its

convergent and has the sum

is

-

j\

sums

sum by

?

the

of

series

and put

s,

1

^&

-f-

-f-

-|

1.

4

o -f-

= xn

^

oo

/

J\n-l

=

= s (=

log

the

sum

of the series 1

o"

+ "o

Prove the following relations:

C

v )

1

1

*

1

1

l

!

l

l

1

,

,

,

^s-^s-S-ii+v-Ig-u 4 l 1 1

,

1

~2 1

1

1

4 4^3 .

1

1

1

1

. -1 + - 6 8^5 10

1

1

*

!

1

,

,

/

<5

l

""2

=

h 5 + 7""8~10 + + -2""4" 4 O O L\J ,

-g""5

4. +

12

2 o O

l

d)

e)

+++ 4 J_J z I-4o + J-!+++ J 4 6 u o

1+ jo + o

1,0*6;

J ,

x

"

o log 2; i

i 10

o

8;

be

Show

2).

50. Let s(= log 2) denote as above

W *>

.

every n,

so that lim x n

ax>

...

-\

h

Chapter IV. Series of arbitrary terms.

150

51. With reference to the

two questions, show generally that the alternately write throughout p positive terms

last

when we

series remains convergent

and q negative ones, and that the sum

then

is

P = log 2 + ~1 log. J

q

series l-f.---f--{- T -{- ... remains divergent, when the 4 O signs are so changed that we have throughout alternately p positive terms If p = q the resulting series is convergent. and q negative ones, with p q

52. The harmonic

i

^

.

oo

53. Consider

sponding to those of the series 5]

l)

(

54. Consider, with

the series

Ex. 52, for the series JJJ

55. For which 1

values of

tx

in Ex. 50

and

w

When

the

same

is

When

61.

the

sum

is

the

expressible

alterations in signs as in

a convergent series obtained?

is

do the following two series converge:

3

4

6"

5

!_ 1+ .L_! a a a + lH. a 2

3

5

7

of the series 1

2

>

exactly corre-

== \/

_J. + I_l+i_+-..., 2

56. The sum

iyi-i

w ~*

J^pr, v^

When

.

/

n=l

resulting series convergent and when is it not? in terms of the sum of the given series?

for every a

^

the rearrangements of the series

a

1

3

4

1

a

lies

between

4"

--

and

1,

<*

0.

57. Given

show

that

1

T 5J_, a f a ^

"

,

2a

(With the

_

~

4a

1

+-I+. T .-5s 13 3

,

t-

-r

ip

""

a~

'

+ 5 2+ 7*__ _-4.J. "^^" 8a lO ,

,

latter equality cf.

2

~ "*"~9

S

'

Ex. 50 c.)

58.

Tn every (conditionally) convergent series the terms can be grouped together in such a manner that the new series converges absolutely.

58 a. The

following complement to KroneckeSs theorem 82, 3 holds good: is so constituted that for every positive monotone sequence (/>) tending to -f oo the quotients If

a series

2 an

,

Pn tend to is

0, then

necessary

S an

and

is convergent.

sufficient for the

In this sense, therefore, Kronecker's condition

convergence.

The radius

18.

59. If from a given series by association of terms, a new

151

of convergence.

2a

n , with the partial sums sn> we deduce, A k with the partial sums S&, then series

2

the inequalities

lim sn

^ lirn S^ ^ lirn Sk ^ lim sn 2 an

invariably hold good, whether

Sa m

converges or

not.

with the partial sums sn , diverges indefinitely, and s' is a value of accumulation (5) of the sequence (s n ), then we can always deduce from 2aA by association of terms, a series A^ converging to s' as sum.

60.

If

,

2

,

~0n

diverges indefinitely, and -*(), then every point of the stretch between the upper and lower limits of s n is a point of accumulation of this sequence. 62* If every sub-series of an converges, then the series itself is absolutely

61.

If

with the partial sums

sn ,

2

convergent

63. Cauchy's product

of the

/8V

two

definitely divergent series

/3V

aand

that of the

In both cases

two it is

series

3

+

27

3 n and

-

2

-l

absolutely convergent.

How

Chapter

Power 18.

The radius

27 2W + n-l

is

6-fO-f-O

+ O-f-....

can this paradox be explained?

V.

series. of convergence.

of the series which we have examined so far were, most part, determinate numbers. In such cases the series may be more particularly characterised as having constant terms. This n however was not everywhere the case. In the geometric series a

The terms

for

the

,

terms only become determinate when the value of a is assigned. Our investigation of the behaviour of this series did not, consequently, terminate with a mere statement of convergence or n the result was: 2a 1, but diverges divergence, converges if\a\ for instance, the

<

t/|#|^>l. The

solution of the question of convergence or divergence thus depends, as do the terms of the series themselves, on the value of a quantity left undetermined a variable. Series which have their

and accordingly their convergence or divergence, terms, depending on a variable quantity (such a quantity will usually be denoted by x

Chapter V. Power

152 and we

scries.

1 speak of series of variable terms ) will be investigated later in more detail. For the moment we propose only to consider series of the above type whose generic term, instead of being a number a n has the form

shall

,

*" i.

we

e.

+ a,x + a,x* + Such

+

...

power

are called

series

2

consider series of the form

shall

*"

series (in

For such power

their coefficients.

+ ... ^ n^O x),

and the numbers a n are

we

series,

*".

arc thus not concerned

simply with the alternatives "convergent" or "divergent", but with the more precise question: For what values of x is the series convergent,

and

what values divergent?

for

92.

examples have

Simple 1. |

x |

^

1

8. JjjJ

For xn n x=

x |

|

>

.

_j_

1,

us:

1

,

oo

.

|

<

because

,

the series

For x

=

is 1

n

a; |

,

|

is

it

in that

by 82, Theorem

X

l*

n

a;

n is

if

x

convergent for #

=

||^2, n;^

0; but for

n=l divergent, for

(by 82,

Theorem

|

a: [

<1

.

and 40),

but divergent for

value of x n

^--

it

is

x n* x so that oo and a fortiori 0, , there can be no question of the series converging.

={=

1)

1

5.

(absolutely) convergent for

*s

~~2~on

case (by 88,

reduces to the divergent harmonic series, and for

y.n

4.

convergent for

absolutely

divergent, because

to a series convergent oo

5.

come before

.

|

2.

already

The geometric series 2 x n is convergent for |as|
|

\

-+> -f

\

\

=

-* -foo

n

is convergent, For x 0, obviously every power series 2a n x The general case is whatever be the values of the coefficients an evidently that in which the power series converges for some values of x, and diverges for others, while, in special instances, the two extreme cases may occur, in which the series converges for every x (Example 5). (Example 2), or for none =|= .

1

The harmonic

diverges for *

We

x<

series

^

^

is

also of this type:

it

converges for

1.

here write, for convenience, x

=

1,

even when x

0.

?>

1,

The radius

18.

In the

of these

first

of convergence.

we say

special cases

everywhere convergent, in the second self-evident point of convergence x is

convergent. series n

2a

the

general,

we

of points

totality

that the

series

power

leaving out of account the

=

In n

153

say that it is nowhere x for which the given

x converges is called its region of convergence. In 2. this consists therefore of the whole axis of x, in

5.

of the

single point 0; in the other examples, it consists of a stretch bisected sometimes with, sometimes without one or both of at the origin, its

endpoints. In this

we may

most general case,

see already the behaviour of the series in the

we have

for

Fundamental theorem.

the

If

2a n x n

which 93.

series

any power

is

does not merely converge everywhere or nowhere, then a definite positive n r (indeed x converges for every x number r exists such that n r called the is x r. The number but diverges for every absolutely),

2a

\

\

\

\

<

>

radius of convergence, or for short the radius, and the stretch r + r the interval of convergence, of the given power series 3 .

.

.

.

Fig. 2 schematizes the typical situation established

dw

U

-r

Theorem (XQ 4= 0),

to

2 an x n

Proof.

If |

#=

where

the is

a n xQ

2a

power

absolutely convergent

xQ9

i.

n \

=

n series # nx converges for x n sequence (a n x ) of its terms is only bounded

// a given

1.

the origin than

dor.

based on the following two theorems.

is

or even if

then

there,

r

theorem.

2.

Fig

The proof

+

by

this

with \x{

e.

< K,

\

<

\X Q

for every

x

=x

l

nearer

\.

say, then

the proper fraction

xo

.

By.

87,

1 the result stated follows

immediately. *

then

Theorem it

than x

,

// the given power series

2.

diverges a fortiori for every x * * i. e. with |

|

>

|

2 a n xn

=x

diverges for further from the

x

=x

origin

1

3 Jn the two extreme cases we may also say that the radius of converor r:=-f-oo, respectively. gence of the series is r =

Chapter V. Power series.

154

Proof. If the series were convergent would have to converge for the point which contradicts the hypothesis.

for

it

a?

,

Proof of the fundamental theorem.

xlt then by theorem than

nearer

By

aJ A

1

,

there

hypothesis,

one point of divergence, and one point of convergence We can therefore choose a positive number XQ nearer than 0. 4= the point of convergence and a positive number y further from n than the point of divergence. By theorems 1 and 2, the series an x is convergent for x xQ divergent for ce and therefore we ;y To the interval 7o e we aPPty certainly have XQ y ^o !Xo> exists at least

=

<

method

by

7a

their

^

we denote by /A

2

the

left

.

2 an x n

on

The

-

intervals of this nest (7n ) all

converges at their

nest

this

In fact, excluded), then if

x

is

otf

any

we have

x' \

|

(say x n ) but diverges at number r (necessarily positive),

The number

required for the theorem.

the

is

determines,

real

have the property

end point

left

end point (say yj.

right

which

,

or the right n a n x diverges or converges at the middle according as By the same rule, we designate a particular half of 7*

anc* so

>

.

of successive bisection:

half of 7i point of / that

2

= =

,

number

for

which

a/ |

<

xk

,

1


for a sufficiently large k,

(equality i.

e.

such

a/ length of J^ is less than r By theorem 1, xf is a and indeed at of we at same as x the of time convergence point k is; have absolute convergence. If, on the contrary, x" is a number for

that

the

.

|

"

which

>

>

1

m

is large enough for the x? r, then ytn provided to than x" . of less theorem be r 2, x? is then a By 7m length as time is. This at the same of divergence proves all that point ym was desired. |

|

|

\

,

|

is

\

This proof, which appeals to the mind by its extreme simplicity, yet not entirely satisfying, in that it merely establishes the existence

of the radius of convergence without supplying any information as to will therefore prove the fundamental theorem by magnitude.

We

its

an

alternative

radius

itself.

method, this time obtaining For this purpose, we proceed

of our previous theorem,

Theorem 4

14. the

upper

:

// the

to

power

the

magnitude of the quite

independently

prove the moie precise series

2 an x n

limit of the (positive) sequence of

is

given

and

JLI

denotes

numbers

i.

4

This beautiful theorem remained Cauchy: Analyse alge'brique p. 151. for the time entirely unnoticed, till J. Hadamard (J. de math, pures et appl., (4) Vol. 8, p. 107. 1892) rediscovered it and made use of it in important appli cations.

The radius

g 18.

then a) if p,

b) */

p.

= 0, =r

-{-

,

Me?

power

absolutely

converges

s

>

>

.

x

for every

\

\

radius of convergence of the given power series*.

Proof.

>

r

2 #

|#|<

with the suitable interpretation,

tf&

-

series

for every

but diverges

Thus

155

the power series is everywhere convergent; oo, the power series is nowhere convergent;

< p < + oo

c) if

of convergence.

and

case a) x

in

If

therefore

an arbitrary

is

number

real

4* 0,

by 59,

1

1

r

every n

for

(an n

xl

By 87,

which proves

solutely, If

> m.

2 an x n

conversely

n

a

and,

)

.

y\ a n x"

|

fortiori,

this

1,

shows

2 a n xQn

that

a).

converges for x

the

= x^ 4

s

9

say, for every

,

0, then the sequence

then V| a n

j


|

i

*-r

bounded.

are

\V\a n x^\),

sequence

n


converges ab-

=

/C, for

If

every n>

In case b), in which the sequence \V a n J is a bounded sequence. assumed unbounded above, the series therefore cannot converge for any x =fc 0. L

e.

|

|

is

Finally,

in

case

if

c),

#'

is

then choose a positive Q for which the definition of p,

Via nl

I

I

By 75,1, )

:

-f

< g 2 an

we must

vd

Furthermore

oo


n

is

i

atf n

some n

<

n \ i

same

as lim

(Cf.

p,.

By

,

< 1.

we here

exceptionally write

should be noticed that

is

-=

-f

oo

,

not for instance

|

i ,

i/KT examples.

g

,

\

>

and so

>

d <

therefore (absolutely) convergent.

of exposition, it

I/I

|

,

n

have, for every

which

for

lim V| an _

the

|o;'|

and consequently 1

For convenience 0.

any number

Ex. 24.)

as the student should verify

by means

of obvious

Chapter V. Power

156

On

the other hand,

By 82, Theorem verge

\

|

number

have, for an infinite

>

x"

if

series.

so that

,

of w's (again

< ^,

-^

and again;

v.

59)

the series certainly

1,

therefore

is

proved in

we must

then

cannot con-

6 .

Thus

the theorem

all

its

parts.

Remarks and Examples. theorem are mutually are not merely sufficient, but also a n xn necessary for the corresponding behaviour of Since the three parts

1.

exclusive,

a),

of the preceding

b), c)

the conditions

follows that

it

.

n.

In particular,

2.

we have y

|

an

>

\

for

any power series everywhere

convergent. For by the remark above, ^ = 0, and since we are concerned with a sequence of positive numbers, these certainly have their lower limit we must have = 0. must be /* x^>fi. Since on the other hand

<

By 63 the sequence (|/ Thus for instance

|

an

n

n

or

ywT->OO,

93

x= + r

-

y\

4.)

Tjl

xn

xn ,

--0, '

converges everywhere. (Cf. 43, Example

5?

Theorems

the series for

y.

#=^

therefore convergent with limit

x*

because 3.

is

j

\

,

94

and

give us no information as to the behaviour of

and for x

=

have the radius

all

1

The

.

from case

this differs

r;

first

x

to case:

converges neither at

tl ,

nor at

1

n* the second only at one of the two, the third at both. 4 Further examples of power series will occur continually in the course of the next paragraphs, so that we need not indicate any particular examples here. 1

,

We

saw

convergence of a power series in the interior of interval convergence is, indeed, absolute convergence. We further that the convergence is so pronounced as to show to proceed be undisturbed by the introduction of decidedly large factors. We have that the

of

the

in fact the CO

Theorem.

95.

//

an x n=o

n

has

the radius of convergence r,

power

series

^na n xn "

then the

00

GO

^

1 t

or

what

is the

same

n=0

thing,

n=0

has precisely the same radius. 6

Case

c)

linTv^l (for fi

|

may be n

I

=

dealt with

/x,

then lim

somewhat more

$\ ^T*

what reason?). By 76, 3 the series x < 1, and certainly divergent for /x |

-

n

~l

x

lim

V^nl

' I

*

=I

M

' I

*

I

therefore absolutely convergent for

is |

If

concisely:

\

>

1,

q. e. d.

The radius

18.

-

157

of convergence.

Proof. This theorem may be immediately inferred from TheoFor if we write nan a n ', then

rem 94.

n

V Since (by 38,

M

I

it

n.

n,

'

I

ty~n+l>

5),

= = V -V.

follows at once from

Theorem 62

that

the sequences a |) and (ty a M have the same upper limits. For (y' same sub-sequences from both, as corresponding if we pick out the '

I

I

terms only differ by the factor y^, which * -)- 1, these sub-sequences 7 either both diverge or both converge to the same limit .

Examples. By repeated

1.

application of the theorem,

Sna n x n -*, 2n(n-V)a n xn ~*, same

or,

what

all

have the same radius as

is

exactly the

thing-,

we deduce

...,2n(n-l)

(n

that the series

k

-f-

the series

2a n xn

whatever positive integer be chosen

,

for h.

The same

2.

of course is true of the series *

n

+a

2>

?

Thus far we have only considered power n These considerations are scarcely altered,

an x

.

series if

we

of

the

take the

form

more

general type

n=0 Putting x

x

= x*

,

we

see that these series converge absolutely

XQ x but diverge for mined by Theorem 94. |

x

>

\

r

,

if

r again denotes the

The region

except in the extreme or for every x, ,

=x

of convergence

foi

number

deter-

of this

series

cases, in which it converges only for bisected by the is therefore a stretch

sometimes with, sometimes without one or both of its endExcept for this displacement of the interval of convergence, points. The point # will for brevity be all our considerations remain valid. we have the previous form called the centre of the series. If XQ , point #

,

=

of the series again.

Alternative proof.

7

convergent for #o "^ 6 "^ r I

*

I

every then

We

|

&

\

2a n Q

infer

< n

By 76, 5a 1.

If |

x

converges,

that

or 91, 2, the series 2nd*-* is <^ r, and Q is so chosen that n therefore bounded, say (a n g ) is

\

K

6

e [

I

,

proves the convergence.

which,

since

Chapter V. Power

158 In

the

interval

has a definite for

a

sum

different

$,

x.

series.

S

x )n a n (x convergence, the power series for each x, and usually of course a different sum In order to express this dependence on x, we of

write

and say

that the

power

series defines, in its interval of convergence, a

function of x.

The foundations of the theory of real functions, that is to say the foundations of the differential and integral calculus, we assume, as remarked in the Introduction, to be already known to the reader in all that is essential. It is only to avoid any possible uncertainty as to the extent of the facts required from these domains, that we shall rapidly indicate, in the fol-

we

lowing section, all the definitions and theorems which without going into more exact elucidations or proofs.

If to each value

x of an

definite value

is

Definition then

1 (Function). by any prescribed rule, a

we

say that

y

is

need,

Functions of a real variable.

19.

#-axis,

shall

a function

ofx

interval of the

made

to correspond, defined in that interval and write,

y

for short,

y =/(*), where "/" symbolises the prescribed

The bounded

which each x has

it

Definition 2 (Boundedness). that for

rule in virtue of

the relevant value of y. interval, which may be closed or open on one or both sides, or unbounded, is called the interval of definition of f(x).

corresponding to

every x of the

If there exists a constant

interval of definition

K

such

we have

then the function f(x) is said to be bounded on the left (or below) in the interval, and 1 is a bound below (or left hand bound) of /(#). If there exists such that for every x of the interval of definition / (x) a constant 2 2 then f(x) is said to be bounded on the right (or above) and 2 is a bound

K

K

K

^K

,

above (or right hand bound) of f(x). A function bounded on both sides is said simply to be bounded. There then exists a constant such that for x of the interval of we have definition, every

K

159

Functions of a real variable.

19.

Definition 3 (Upper and lower bound, oscillation). There is always a least one among all the bounds above of a bounded function, and 8 The former we call the always a greatest among all its bounds below the lower and their difference the oscillation latter the bound, bound, upper .

of the function f(x) in its interval of definition. Corresponding designations are defined for a sub-interval a' ... V of the interval of definition.

Definition 4 (Limit of a function). If is a point of the interval of definition of a function /(#), or one of the endpoints of that interval, then the notation

=c

or > c

f(x)

means

x -> f

for

that

a) for every

converges to

sequence of numbers x n of the interval of definition which its terms different from , the sequence of the

but with all

,

corresponding values

(=1,

^n ==/(*)

2,3,,..)

or

of the function converges to c;

b) an arbitrary positive number e being chosen, number 8 -= 8 (e) can always be assigned, such that for

another positive values of x in

all

the interval of definition with |

we have

x

|

<8

but

* 4=

,

9

\f(X

The two forms

)-C\< S

of definition a) and b)

Definition 5 (Right

hand and

.

mean left

precisely the

same

thing.

hand

limits). If, in the case points x n or x taken into

4, it is stipulated besides that all to the right of f (which must not of course be the right hand endpoint of the interval of definition of / (#)), then we speak of a right hand limit (or limit on the right) and write

of definition

account

lie

lim/(*)

= c;

x->t + Q similarly

we

write

and speak of a

left

hand

limit (or limit

on the

left), if

endpoint of the interval of definition of /(#), and are alone taken into account. left of 8

Cf. 8, 2,

9

The

if

left hand x or x to the points n

f

is

not the

and also 62. older notation \imf(x) for lim/(#) should be absolutely discarded since

the whole point

is

that

x

is

to remain 4= f.

Chapter V. Power

160

series.

Definition 5 a (Further types of limits). of limit already defined, the following

=

lim /

|

or

c

>

,

-f-

Besides the three types

also occur 10 :

may

oo ,

oo

/(*)-) with one of the five supplementary indications ("motions of x") oo. *f 0, +-\-oo, *f+0,

#->,

for

With reference

to 2

and 3

there

be no form a) or

difficulty in

will

in the

precisely the definitions to the definitions just discussed.

formulating

which correspond

b)

Since, as remarked, ue assume these matters to be familiar to the reader, in all essentials, we suppress all elucidations of detail and examples, and only emphasize that the value c to which a function tends, for instance need bear no relation whatever to the value of the function at for x * , Only for this we will give an example: let f(x) be defined for every x by

.

=

putting f(x)

number which

x

if

is

an

irrational

lowest terms

in its

is

but f(x)

number,

of the

form

-

(q

>>

= 0)

if a;

.

is

Thus

a rational e.

g.

f ()


e

then

0,etc. Here we have for every f

For

an arbitrary positive number and

s is

if

m

is

so large that

in

,

there are not more than a finite number of rational points whose (least positive)

denominator

is

<m

These we imagine marked

.

...+!

As there are only a

of all to

;

(if

f

one Let d denote

itself is

into account here). for which

in

the interval

1

of them, we can find one nearest of these points we of course should not take it

finite

number

its (positive)

Then

distance from f.

x

every

t

0<|as-|
either irrational, or a rational

is

>m

.

In the one case,

have, for every

f

/ (a;)

xinQ<^\x

number whose

= 0;

in the other,

least positive

=

<;

denominator

<>.

Therefore

q

we

\
*-0<. i.

e.,

as asserted,

therefore f is in particular a rational number, then this limit differs decidedly from the value f(g) itself. Calculations with limits are rendered possible by the following If

theorem: 10

first of these three cases we say that f(x) tends or converges second and third cases: f(x) tends or diverges (definitely) to-f-QO or 00; and in all three, we speak of a definite behaviour or also of a limit If f(x) shows none of these three modes of behaviour, then we in the wider sense. say that / (x) diverges indefinitely for the motion of x under consideration.

to c\

In

the

in the

Functions of a real variable.

19.

161

Theorem 1. If f (x) f% (x) f (x) are given functions (p some determinate positive integer), each of which, for one and the same motion of x of the types mentioned in Definition 5 a, tends to a finite -> c , then bmit, say , f (a?) ^ p (*) p >

.

,

.

.

.

,

,

.

.

a) the function

= fc() + /;(*) +

/

4- /;(*)]

'x4-

,

v

4-

4-

b) the function

= [A (*)/;(*)/;(*)] -*vv--v

/

>

c) in particular, therefore, the function a f^ (x) * cx real number) and the function f (x) f^ (x)

*

function d) the ^-r-c

Theorem

If

2.

,

provided

hm f (x) = c (4=

c

cl

c9

= arbitrary

(a

,

;

.

=f= ,

cx>)

a

then

/*

bounded

(x) is

*->*;

of

neighbourhood such that

f,

two

e.

i.

positive

of a

and corresponding statements hold in the case oo. for z * f oo , f ,

+

and

numbers d

(finite)

+

,

K

in

a

exist

limf(x)

Definition 6 (Continuity at a point). If f is a point of the interval of definition of f (x) , then f(x) is said to be continuous at f if

l\mf(x) exists

and coincides with the value /*() of the function

limf (x) If

we

at

=

include the definition of lim in this

new

definition,

we may

also state: if for Definition 6 a. f(x) is said to be continuous at a point , tends to f , interval which 's of of of the x definition, every sequence n

the corresponding values of the function

Definition 6b. f(x) is said to be continuous at 8 (e) an arbitrary e 0, we can always assign 8 every x of the interval of definition with we have |/(*)-/tf)|<

,

=

>

if,

> 0,

having chosen such that for

|*-f|<8

Definition 7 (Right

hand and

left

hand

continuity).

said to be continuous on the right (right-handedly) or on the

lim/(#) exists at and coincides with /().

edly) if

least

for#->f-f-0or x

Corresponding to Theorem

Theorem

3-

If AC*),

1

we have

AC*),

/j>

-> g

left

/ (x)

is

(left-hand-

respectively,

here the (#)

are given

functions

(/>

a

Chapter V. Power

162

particular positive integer),

series.

continuous at

all

,

then the functions

)/!(*)+/ (*)++/,(*), b) /i (*) /, (*).../,(*), c)

a/!

d)

if

(x) (a

= an

A () 4=0,

arbitrary real number),

also

^

/x

(#)

/2 (#), and

continuous at Corresponding statements hold, when only right hand or only left hand continuity is assumed. ~ #, By repeated application of this theorem to the function f(x) -> -> x for x continuous we have certainly everywhere (since ), precisely are

we

all

at

.

once deduce:

All rational functions are continuous everywhere, with the exception of (at most a finite number of) points where the denominator In 0.

=

particular: Rational integral functions are continuous everywhere. x 3, showed that: a (a Similarly, the limiting relations 42, 1 y

> 0)

>

is

~

continuous for every real x\ log x is continuous for every x 0; x* (a x 0. is for real continuous number) every arbitrary Definition 8 (Continuity in an interval). If a function is con-

>

tinuous at every individual point of an interval /, then we say that it Continuity at an endpoint of the interval

continuous in this interval.

is is

here taken to be continuity "inwards", i. e. right handed continuity at the left hand endpoint, and left handed continuity at the right hand endThese endpoints of/ may or may not, according to the circumpoint.

Functions which are continuous stances, be reckoned as in the interval. in a closed interval give rise to a series of important theorems, of which

we may mention

the following: b x 4. If f(x) is continuous in the closed interval a a there between and at least then but b, exists, 0, 0, f(b)

^ ^

Theorem

>

and if f(a) < 0. one point f for which /() Theorem 4a. If f(x) is continuous in the closed interval a x b and 77 is any real number between /(a) and/ (b), then there exists, between Or: The equation/ (x) -= 17 a and b, at least one point f for which/ () 17. has at least one solution in that interval. Theorem 5. If f(x) is continuous in the closed interval a x b

=

^ ^

=

^ ^

> 0,

y

>

we

can always assign some number 8 if x' and x" are any two points of the interval in question whose so that, x' distance x" is 8, the difference of the corresponding values of then, having chosen

\

|

any

e

<

<

is e. the function, /(*") (The property, established by this /(#') theorem, of a function continuous in a closed interval is called uniform |

|

,

continuity of the function in the interval.)

Definition 9 (Monotony). A function defined in the interval a ... b is said to be monotone increasing or decreasing in the interval, if for f that interval, with x l < # 2 we inevery pair of points x l and # 2 ,

19.

variably have f (x in the other.

)

We

Functions of a real variable.

163

<

f(x^) in the one case, or invariably f(x t ] also speak of strictly increasing and strictly

creasing functions, when the equality signs, in the inequalities the values of the function just written down, are excluded.

de-

between

Theorem 6. The point f certainly existing under the hypotheses Theorems 4 and 4 a, is necessarily unique of its kind if the func,

of

under consideration is strictly monotone in the interval a... b. to each 77 between f(d) and f(b) corresponds one We say in this case: The inverse for which /*() and only one rj. and one-valued (or y existent is everywhere function of y f(x) f(x)

tion f(x)

Thus

in that case,

=

=

=

is

reversible) in the interval.

A

function f (x) defined at a Definition 10 (Differentiability). point | and in a certain neighbourhood of f is said to be differentiable at * if the limit

exists. Its value is called the (unique derivative or) differential coefficient and is denoted by /"'(). If the limit in question only of f(x) at exists on the left or on the right (that is, only for x *f-f-0 or

x

f

respectively),

then

we speak

of right

hand or

left

hand

differentiability, differential coefficient, etc. If a function is differentiable at each individual point of an interval /, then we say for brevity that the function is differentiable in this interval.

The rules for differentiation of a sum or product of a particular (fixed) number of functions, of a difference or quotient of two functions, of functions of a function, as also the rules for differentiation of the elementary functions and of their combinations, we regard as known to the reader. All means necessary to their construction have been developed in the above, if we anticipate a knowledge of the limit defined in 1155 and there

determined in a perfectly direct manner. If, for instance, it is inquired whether a x (a> and ={= 1) is differentiable, and, if so, what is its differential coefficient, at the point f then, following Defs. 10 and 4, we have to choose a null seand to examine the sequence of numbers quence (#) with terms all =f= ,

__

A. =

-**+*- a* Xn

:_=

as

ar

-l

.

Xn

If we write y n for the numerator in the last fraction, then by 35, 3 we know that (y n ) is also a null sequence, and indeed one for which none of the terms is equal to 0. n may then be written in the form

X

J But since, as remarked, y n

is

a null sequence,

we have by

Since the same then holds for the reciprocal values, by 41, 11 a, we deduce The function a* is thus differentiable for every x and has the differential coefficient a r -loga.

A^-x^.log-fl.

Chapter V. Power

164

series.

In the same way, as regards differentiability and differential coefficient x for f !> 0, we deduce, by consideration of

of log

xn

xn

that the differential coefficient exists here and = --

.

Of the properties of differentiable functions we shall for the present require scarcely more than is contained in the following simple theorems

:

Theorem and

its

a function f(x) is differentiable in an interval J coefficient is there constantly equal to 0, then f(x)

If

7.

differential

=

where XQ is any point of /. /*(a? ), differentiable in /and their are f^ (x) differential coefficients constantly coincide there, then the difference of is

constant in /, that is to say and If two functions ft (x)

the two functions

is

constant in /, therefore

is

we have

&(*)- /i(*)+' = /i(*) + [/;(*o)-/;(*o)] where x

any point of

is

/.

Theorem 8. (First mean value theorem of the differential calculus.) x <^ b and differentiable f(x) is continuous in the closed interval a in at least the open interval a x b, then there is, in the latter

^

If

< <

one point f for which

interval, at least

The

(In words:

finite difference

quotient relative to the endpoints of the

intervals is equal to the differential coefficient at a suitable interior point.) 9. If /(*) is differentiable at and/' () is 0) then difference the i. e. at "increases" , ("decreases") /(#)

>

Theorem .//

^//-\i_

\

* ne

(

has

/(*)-/()

same

)

.

.

/*.

\

/

s,gn as (to) (*

(<

-& r\

than a suitable number 8. of its is differentiable at an interior point the functional value /() interval of definition, then unless /' () cannot be every other functional value f(x) in a neighbourhood of

provided

x

be

less

|

|

Theorem

10. If f(x)

=

^

of the form

x |

|

< 8,

i.

Similarly the condition /' (f)

e.

=

cannot be a (relative) maximum point. is necessary for to be a (relative)

minimum

point, i. e. such that/() is not greater than any other functional value /(#), as long as x remains in a suitable neighbourhood of .

Definition 11 (Differential coefficients of higher orders. is differentiable

in

f(x) a function defined in 1

and

J

y

then (in accordance with Def.

/ *.

If this function

called the derived function of f(x).

is

If

is

1) /' (x) again again differentiable in l

J

19.

then

its

Functions of a real variable.

165

second

differential coefficient

differential coefficient is called the

of f(x) and is denoted by /"'(#). Correspondingly, we obtain the third th differential coefficient of and, generally, the ft f(x), which is denoted th differential coefficient at (k) f it by f (x). For the existence of the k is

thus

Def. 10) necessary that the (k

(v.

should exist both atf and at

The th

J

Of the

of

f^(x)

we

of f(x)

coefficient

differential

th differential

coefficient

points of a certain neighbourhood of

all

th differential coefficient

l)

we

k f( +*(x),

is

k^O,

.

l^>0. (As

then take the function

itself)

in the sequel, require only the in the two paragraphs on Fourier and theorems, except simplest concepts material has to be brought in. rather where series, deeper integral calculus

shall,

Definition 12 (Indefinite integral).

If

a function f(x)

given in

is

an interval a ... b and if a differ entiablc function F (x) can be found f such that, for all points of the interval in question, F (x) f(x), then we say that F(x) is an indefinite integral of f(x) in that interval. ( Be-

=

r

if

functions F(x) -\- c are then also indefinite integrals denotes any real number. Besides these, however, there

the

sides F(x), of f(x),

are no others).

We

write

In the simplest cases,

indefinite integrals are obtained by inverting- the E. g. from (sin a x)' a cos ax

=

elementary formulae of the differential calculus it

\cosccxdx =

follows that

J

assume known little

we

we mention

1

'

/ H-x" 4

Ji

These elementary rules

and so on

a

Special integrals of this kind, excepting- the very simplest, are

used in the sequel; /7

--

cot x

J[-

3

1

"* ^

'

~'

6

~"

^

'

"

= V^ log *1^][A + V^ [tan4 o 3.2 _ ~ .

/

f>

_,

1

V

1

(A:

-

V2-

9 f

1

V3

3"

1)

+ tan"

1

(*

V 2 -f

1)],

i

j = log dx t

Though in indefinite integrals, we find no more than a new mode of writing for formulae of the differential calculus, the definite integral introduces an essentially

new

concept.

Definition 13 (Definite integral). A function defined in a closed and there bounded is said to be integrable over this interval if it fulfils the following condition: interval a ... b

Divide the interval a ... b in any manner into n equal or un. , # equal parts (n ^> 1, a positive integer), and denote by x l9 a? a , n_ XQ and b xn . Next in each of the points of division between a these n parts (in which both endpoints may be reckoned) choose any . .

=

=

Chapter V. Power

166

and denote the chosen points in corresponding order by g l9 f 2

point,

gn

Then form

.

series.

.

,

.

.

,

sum 11

the

Sn =

2?

(*-*_.!)/(&)

i/-=i

Let such sums (that

=

S

1, 2, 3, ... independently n be evaluated for each n chosen be to say, at each stage x v and afresh). But, at the may time, /n the length of the longest of the n parts into which the

is

same

,

,

interval

is

when forming Sny

divided

S l9 S 2

12

shall tend to

.

way they may have been formed, invariably proves to be convergent and always gives the same 13 limit S, then f(x) will be called integrable in Riemann's sense and the limit If the sequence of numbers

S

>

.

.

.

,

in

whatever

a

will be called the definite integral of f(x) over

.

.

.

b,

and written

}f(x)dx. a

x

is

called the variable of integration

/()

Instead of any other letter. lower bound
#,.__!

^x^x

Theorem

f3 v

and may of we may also of

all

course be replaced by take, to

form

the functional values

Sn 14

,

the

in the

v.

(Riemann's test of integrability). The necessary and sufficient condition for a function /(#), defined in the closed interval a ... b Given and there bounded, to be integrable over a . b, is as follows: 1 1

.

e

>

for

0, a choice of n and of the points x l9 x 2

,

.

.

.

.

,

x n _ l must be possible,

which

if i v

= |

xv

A:,,_ I

5s

|

the length of the vth part of a ... b and v v the

oscillation of f(x) in this sub-interval.

be expressed as follows, assuming the notation After choosing e, we must be able to assign two x b "step-functions" (functions constant in stretches) such that in a

This criterion chosen so that a

may

<

also

b:

^ ^

we have

always

*(*)^ /(*)<
If

/(*)

one side by the

>

0,

>

a

and we consider a plane portion S bounded on the on the other by the verticals through a and b and then Sn is an approximate value of the area of S. This b,

axis of abscissae,

by the curve y f (x) however only provides a t

satisfactory representation if

y

= / (x)

is

a curve in the

intuitive sense. 12

We may

then also say that the subdivisions, with increasing n t become

indefinitely closer. 13 It is easily shewn that if the ipso facto always gives the same limit.

S

sequence (Sn )

is

invariably convergent

it

also

14 In these cases n gives the area of a ("step-*') polygon inscribed or circumscribed to the plane portion S.

Functions of a real variable.

19.

167

b

as well as 15

J a

(G

It suffices in fact to put, in

g

xv _ :

= (b)

(x))

dx

< e.

^ x ^ #,

G (x) =

-= a,, (x)

together with

From

g

(x)

an

,

pv

v

,

G

(ft)

= -

1, 2,

.

.

.

,

w,

n.

this criterion, the following particular

theorems are deduced:

^ ^

Theorem

12. Every function monotone in a # ft, and also every function continuous in a f^ # 5^ ft, is integrable over a ... ft. Theorem 13. The function/ (#) is integrable over a ... ft, if, in a ... ft, it is

bounded and has only a finite number of

discontinuities.

be given the following form: Theorem 14. The function f(x) is integrable over a ... ft if, and only if, it is bounded there and if, two arbitrary positive numbers 8 and e being assigned, the subdivision of a ... ft into n sub-intervals described in theorem 11 can be so carried out that the sub-intervals iv in which the oscillation of f(x) exceeds 8 add up to a total length less than e. Riemann's

test of integrabiiity

may

also

Theorem

1 5. The function /(#) is certainly not integrable over a ... ft discontinuous at every point of that interval. Theorem 16. If f(x) is integrable over ... ft, then/(,v) is also in-

if it is

tegrable over every sub-interval a' ... ft' of a ... ft. Theorem 17. If the function /(jc) is integrable over a ...

ft,

then

... ft, and has the same f (x) integrable over an which results arbitrary change in a finite number from/(.r) by integral, of its values.

every other function

is

Theorem

18. If f(x) and /x (x) are two functions integrable over then ft, they have the same integral provided that they coincide at ... ft (e. g. all rational least at all points of a set everywhere dense in

a ...

points).

For calculations with integrals we have the following simple theorems, ... ft. where /(*) denotes a function integrable over the interval a

Theorem

19.

We

b

have lf(x)dx

are three arbitrary points of the interval

?/(*)

dx

Theorem 20. (

< 6),

and

if

in

ff(x)dx a\

Iff(x)

...

have

ft

b

It is

+

G (x)

g

a l9

2>

as

+

...

ft,

]f(x)dx

- 0.

<**

and# (x) are two functions integrable over ... ft, we have constantly f(x)^g (x), then we also b

immediately obvious from the

function such as

if

a

b

<*i

lf(x)dx and

---

(x) is integrable.

first

form of the

criterion that a step-

Chapter V. Power

168

Theorem

20a. \f(x) |

Theorem

if

IJL

is

j8

.

J|/(*) a

.

.

if

< b,

a


theorem of the integral

b

number between

a suitable

of f(x) in a

}/(*)
have

and we have,

integrable with/(#)

(First mean value

21.

We

calculus?)

is |

series.

b (a 5g

ju,

fg

the lower

j8).

//(*)<**!

|

bound a and the upper bound

In particular we have

^ *(*-)

a

K denotes

if

bound above of \f(x)

a

in a ... b. |

Theorem

22. If the functions /x (#),/2 (#), fp (x) are all integrable then so are their sum and their b (p over a fixed positive integer), we have of the sum the formula and for the integral product .

J

.

(A

.

.

.

t

=

.

(*)

+

=

+/P (*))**

(*)/*+...+

J/i

J/p (*)/*;

a i.

e.

the

sum

of a jfixa/

Theorem bound of f(x) |

number of functions may be

22a. in a

If .

.

.

f(x) b

> 0, then ^

is

\

J

Theorem

continuous in the interval a

is

of the interval, where /(^c) *"(*Q)=/(*O) there

.

.

.

b and

itself is

x)

is

.

.

.

b

and

if

a

.

.

.

b,

by

term.

the lower

also integrable over

is (

If f(x) is integrable over

23.

integrated term

integrable over a

is

a ...

b.

then the function

also differentidble at every point If XQ is such a point, then

continuous.

-

Theorem 24 (Fundamental theorem of the

and integral calculus). has an indefinite integral

If/(*)

is

differential b, and

integrable over a ...

-F (#) in that interval,

then

Theorem 25 (Change of the variable of integration)

.

If

=

9 (J) is a function diffcrentiable in integrable over a ... b and x f(x) with if and a b, further, when t varies from a to /3, 9 (ft) 9 (a) the varies stricter monotonely (in /?, 9 (/) sense) from a to 4, and if 9' (/), is

.

.

.

=

=

the differential coefficient of

9

is

(J),

16

integrable

//(*)<**=//(?(<)) a

9'

over a

.

.

.

/?,

then

<*'

a

10 The derivative of a differentiable function need not be integrable. Examples of this fact are, however, not very easily constructed (cf. e. g. H. Lebesgue, Leyons sur 1' integration, 2 nd Edition, Paris 1928, pp. 9394).

19.

Functions of a real variable.

169

Theorem 26 (Integration by parts).

If/(#) is intcgrable over the indefinite integral of /(#), if further g (x) is a function, differentiate in a . . b, whose differential coefficient is inte-

a

.

.

.

F (x)

b and

is

.

grablc over a

.

.

.

b,

then

17

//(*) g(*)dx=[F (*)

i- (*)].*

- } F (x)

a

g'

()

rf

*.

a

The following penetrates considerably further than simple theorems:

the

all

above

Theorem 27 (Second mean value theorem of the inteIf / (x) and 9 (x) are integrable over a ... b and 9 (x)

gral calculus). is

monotone

number

in that interval, then a

,

with a

^ ^

6,

can be so

chosen that J

9

(*)

/(*)
-=

Here 9

(a)

hypotheses,

may 9a

+9

9 () \f(*)dx

(ft)

a

a

}/(*) d x. $

also be replaced

=

by the limit, certainly existing under the lim 9 (#); but in and similarly 9 (b) by o b Iim9(#),

*-a+0

this case a different value

->6-fO

may have

to be chosen for

.

We

mention only the following of the applications of the concept of considered: above integral

<

Theorem 28 (Area). Iff(x) is integrable over a b, (a b) and, us suppose, always positive in the interval 18 then the portion of plane surface bounded by the axis of abscissae, the ordinates through a and b, .

let

.

.

,

or more precisely, the set of points (.v, y) for and the curve y / (x) r x which a b, and at the same time, for each such x, y ^f(x) 9

^ ^

b

has a measurable area and

its

measure

is

//(#) d x. a

Theorem 29 (Length)

If x = 9

=

and y ip (t) are two functions and if 9' () and (/) 9 (t), y .

(t)

^ ^

=

O

=

O

when / describes in the plane of a rectangular coordinate system x, jy, the interval from a to /3, has a measurable length and this is given by the

~~'

integral

Finally

we may

say a few words on the subject of so-called improper

integrals.

17

18

h (a). Here [7i (x)]* denotes the difference h (b) which may always be arranged by the addition of a

suitable constant.

Chapter V. Power

170

Definition 14. If /(/) is defined for t^. a and t ~i x f r every x, so that the function

^ is

series.

is

integrable over

>

x

also defined for every

^ a,

then,

if

lim jP (x) exists and

=

c,

we

say

that the improper integral

converges and has the value c. Theorem 30. If f(t) is constantly

^

or constantly .<

for every

F (x)

of Def. 14

00

t

d ^ a, then //(*) a

is

bounded for x

t

converges

> a.

If f(i)

same

integral converges can be so determined that

if,

and x" both

for every x'

And

is

and only

the function

capable of both signs for

and only

>x

if

if,

t

^ a,

given an arbitrary e

then the

> 0,

x

>a

.

quite analogously:

Definition 15. a

if

< t <; b,

If f(x) is defined, but not bounded, in the interval
<x

open on the

^ ^

over the interval x

t

b,

so that the function

F(x)=*}f(t)dt X is

defined for each of these

x's,

then, if lim A.-^

+

F (x)

exists

and

=

c9

we

say

that the improper integral (improper at a)

is

convergent and has the value c. Exactly analogous conventions are

made

for an interval open on the

The

case of an interval open on both sides is reduced to the two preceding cases by dividing it at an interior point into two half-open intervals, and then taking theorem 19 as a definition. right.

Theorem 31

we further have/(f) S> everythen the everywhere, improper integral in question exists F remains bounded in a x b. If f(t) assumes both if, (x) then the exists and e if, signs, 0, we can choose integral only if, given .

If in the case of Def. 15,

^

where or if, and only

< ^

>

8

>

so that

for every x'

and x" both between a

(excl.)

and a

+

8.

Principal properties of functions represented by

20.

power

series.

171

Principal properties of functions represented by

20.

series.

power

We

interrupted our discussion of power series at the observation, 18, that the sum of a power series, in the interior of terminating its interval of convergence, defines a function, which we will now

denote by

f(x):

We

resume it special remark

and agree in this connection, unless is made, to leave the interval of coneven should the power series converge at

at that point, to the contrary

vergence open at both ends, one or both of the endpoints.

Now if, as is the case here, an infinite series defines a function a certain interval, then the most important problem is, in general, to deduce from the series the principal properties of the function represented by it interpreting these for instance in the sense of the in

summary

of the preceding section.

power series, this presents no great difficulty. We on the whole, that a function represented by a power series possesses all the properties which we may consider particularly important and that the algebra of power series assumes a peculiarly For this reason, power series play a prominent part, simple form. and it is precisely on this account that their discussion belongs to the In the case of

shall see,

elements of the theory of In

these

we may,

investigations,

=

simplified

.

assumed

positive (> 0), but everywhere convergent.

may be

We

Theorem.

lim f(x)

=

J^Kik n=l we

every

K(>

write

x

<

x

|

\f(*)-

x j)

a n (x

first,

(

n ,

its

interval of conver-

continuous

is

may be

the series

the

at

n=0

n~l

0) for

,

n (x

x

=x

;

- xj = * = f(xQ).

then by 83,

5, 00

converges with the

sum

of

J|0j n=o

the former,

n .

then

we

have, for

g,

\

Q

Ja

lim


If 00

If

n=o

e.

i.

we have

that is to say,

Proof.

+ oo,

then have,

The function f(x) defined, in

by the power series

gence,

without thereby restricting the

assume XQ 0, i. e. assume the series to be of n form 2 a n x Its radius of convergence is of course

scope of the results, the

series.

infinite

\

= \(*-*o)'2n(x-*o)n n=*l

l

\^\*

-*<>]*<

96

Chapter V. Power series.

172

>

therefore e

If

Q and

we

then

;,

is

arbitrarily

given and

have, for every

XQ

x |

d

if

>

is

less than both

< 5,

\

l/-ol<; which by

Def 6b, proves

19,

From

was required. theorem, we immediately deduce the extremely

this

that

all

far-

reaching and very frequently applied:

97.

Identity

Theorem

power series. // the two power xn and ^bn x n n

for

2a

n-o

n-O

have the same sum in an interval

\

< Q in

x\

then the two series are entirely identical, that . .

,

which both of them converge say, for every n

is to

= 0,

l9 ,

1, 2,

we then have n

+^x+a

a

(a)

follows,

= bn

.

From

Proof

it

series

2

*2

-\

by the preceding

the equation, that

= b + 6 x + 6 x* ^ theorem, letting x+0 on ^V 3

both sides of

o

Leaving out these terms and dividing by x t

=& +&

*!+*** + ****{

(b)

we

1

an equation from which we deduce,

2

<

infer that for

*

+ &a

a;9

in exactly the

H

\x\


,

same way 20

that

,

=& *i = & + 63^ ao+^aH i

and

9

Proceeding in this manner, we infer successively (more precisely: by complete induction) that for every n the statement is fulfilled.

Examples and

illustrations.

and in 1. This identity theorem will often appear both in the theory the applications. may also interpret it thus: if a function can be represented by a power series in the neighbourhood of the origin, then this is only possible in one way. In this form, the theorem may also be called the

We

It of course holds, in the corresponding statement, for theorem of uniqueness x )n the general power series n (x 2. Since the assertion in the theorem culminates in the fact that the corresponding coefficients on both sides of the equation (a) are equal, we may also speak, when applying the theorem, of the method of equating coefficients.

2a

19

.

Or even for every x = xv of a null sequence (x v) whose terms are all =fc 0. we have then to carry out the limiting processes in accordance with

In the proof 19, Def. 4a. 20

For x

established

=

0,

equation (b)

by means of

quite immaterial

(cf.

division

is

by

19, Def. 4).

not in the x.

first

instance secured, since

But for the limiting process x ->

it

was

this is

20.

3.

A

Principal properties of functions represented

simple example of this form of application

certainly have, for every

series.

173

following:

We

by power is

the

a;,

v=0 multiply out on the left, by 91, Rem. 1, and equate the coefficients on both sides, then we obtain, for instance, by equating- the coefficients of x k If

we

:

a relation between the binomial coefficients which would not have been so easy to prove by other methods. 4. If

x

defined for

is

f (x)

|

\


and we have, for

all

such

a;'s,

/(-*>-/(*). then f(x) is called an even function. If it is representable by a power series, then we at once obtain by equating coefficients, 1

so that in the different 5.

odd.

power

scries of f(x), only even

from 0. If on the other hand,

Its

expansion

=

particular, /"(O)

in

power

f(x) =

powers

of

x can have coefficients

then the function

f(x),

series can then only contain odd

is

said to be

powers

of x.

In

0.

We now proceed one step further and prove a number of theorems which must be regarded as in every respect the most important in the theory of infinite series:

Theorem

1.

08.

//

n=0 is

a power series with (positive) radius

XQ x

represented, for \x with any other point

\


f

the

have, in fact,

r of

e.

#!

If

x 1

=

this

XQ

|

Proof.

i.

then the function f(x) thereby expanded in a power series

interval

of

convergence as centre; we

*=

and the radius x number r

|

r,

also be

*>

where

that

may

xl

series is

at

least

equal to the positive

\

lies

< r,

new

.

in the interval of

then

convergence of the

series,

so

Chapter V.

174

and all

Power

we may

all that we have to show is that terms with the same power of (x

arrangement theorem

we

validity,

we

and

certainly

the

in

replace,

value, then

9O may

series.

&J, be applied.

latter

here group together that the main re-

e.

i.

however, to

If,

every term by

series,

test

its

absolute

its

obtain 'the series

n=0

If

this is

K

-

*o

therefore

I

x

+

I

is

original interval of

allowed, and the form

If

we proceed

we

in

still

convergent, or >

if

- *i < *

*

I

I

nearer to

#t than

- *i < ' I

either

the

of

K-

*o

endpoints

I

the

of

convergence, then the projected rearrangement is obtain for f(x), as asserted, a representation of

to

detail

group the terms containing

fe

(x

-

#,)

to-

gether, by writing the terms of the series (a) in successive rows one below the other, then the k th column gives

which completes the required proof 21. From this theorem we deduce the most diverse consequences. have the we

Theorem

2.

A

function represented by a power series

/(*) is

First

= Jx(*-*o)n n=o

continuous at every point x^ interior to the interval of convergence. Proof. By the preceding theorem, we may write, for a certain

neighbourhood of x

,

/(*)- Jk(*-*o)" n=0

= 2*.(*-xf n=0

with &

= J}*n (*i-*oT = f(*i)rt=0

For x

*a?

,

the second of the representations of f(x), by 96, at once 19, Def. 6): (v.

gives the required relation

lim f(x)

Theorem

3.

A

= f(xj.

function represented by a power series

n=0 is

differentiable at every interior point

x

'

of the interval of convergence

We

21 thus have, quite incidentally, a fresh proof of the convergence, already established in 95, of the different series obtained for the coefficients b k .

Principal properties of functions represented by power series.

20.

19, Def. 10) be obtained

(v.

may

f fo) = Proof. ficiently

175

and its differential coefficient at that point, f''(xj, by means of term-by-term differentiation, i. e. we have

n=l

n an

Since

(x,

f(x)

- xjp-i =

n=0

= 2Jb n (x

(n

xj",

n=o

+

1)

* w+1 (x,

we have

- x )\

for

every x

suf-

near x^:

whence for x >a; 1 by 96, taking we at once deduce the required result: ,

Theorem

A

4.

into

f(

account the meaning of b 19 ~ xo} n l bl nan (x i 1)

= =2

*

function represented by a power series,

f (*)

= %*(* -*tf> n=o

has, at every interior point x^ of its interval of convergence, differential coefficients of

=

every order and we have

^=

we

f'(x) is thus again a function represented in fact by one which, in accordance with

(x)

= jj n (n +

1)

* n+1 (x

same

result

repetition of this simple process,

valid

for

we

particular

we

we

l9

(k)

-j-\f

(

may be

(x

-x

n )

.

Putting in

deduce the required statement. b k in the expansion of theorem 1,

therefore at once

substitute, for the coefficients

the values

interval

obtain for every k,

every x of the original interval of convergence.

x=x

2

n=0

By a

If

the

- * )i-i = 2(n + 1) (n + 2) *n +

n=i

and

by a power series, 95, has the same

Hence

of convergence as the original series. again applied to f'(x}> giving

r

-

+

+

+

* )"... k)an + k (x, Z(n !)( 2) (n n=o Proof. For every x of the interval of convergence we have, as have just shown, /<*>(*,)

x i) now obtained, then we

finally infer

from

all

the

above the so-called 22 Taylor series

.

// for \x

/(*)

and

if

33

x

is

1,

J:

n=o

an interior point

\
99.

have

(*-*<,)">

of the interval of convergence,

then

we

Brook Taylor: Methodus incrementorum directa et inversa, London 1715. Pnngsheim, Gcscliichte dcs Taylorschen Lehrsatzes, Bibl. math. (3)

Cf. A.

Vol.

=

xQ

p.

433.

1900.

Chapter V. Power

176

x for which

have, for every

23

x

xl

|

\


series. -

l

r |

xl

XQ

\,

With Theorem 3

for the differentiation of our series, we couple the corSince a function represented by a responding theorem for integration. power series is continuous in the interior of its interval of convergence, it is also,

by

Theorem 12, integrable over every interval contained, endpoints, in the interior of this interval of convergence. have the 19,

together with

For

this

we

its

Theorem

The

5.

integral of the (continuous) function

f (x)

represented

00

x

a n (x

by

n in the interval )

may

of convergence,

n-^Q

be obtained by means

of term by term integration, with the formula

provided x t and x 2 are both interior to the interval of convergence.

Proof. By

95,

2,

the power series

has the same interval of convergence as the given series

=o

By

98, 3, the

19,

an indefinite integral of the second.

first series is

Theorem

Hence by

24, the statement follows at once.

These theorems on power series we may complete in a special Theorem 2 on the direction by the following important addition: a of the function power series was, as we continuity represented by again expressly observe, only valid for the open interval of conn Thus, for instance, in the case of the geometric series 2! x , vergence.

may

23

The number

of convergence of the larger.

Thus

rl

for f(x)

culation,

=

new

r

\

xl

series.

S xn =

x of the text need not be the exact radius the contrary, the latter may prove considerably \

On

^ __

and x^

=

- we obtain, by an easy

1\* /2\*+l / /W ^?o0 (-+) ....

1

and the radius of this

series is

not

r

|

x^

x

-= \

^ but

is

~.

cal-

20.

sum

of

Principal properties of functions represented by

^X

X

~

,

we can deduce from

at the point

tinuity

a;

=

=

B

ij

we

,

however, in

some

con-

its

discontinuity at if the power

Even

of the intervals

series

here J

(as

by confor

should not be able to conclude this fact directly. That

this last

particular case, the presumption we learn from the following:

extent, justified,

Abel's

177

rr=+l,

its

series.

one of the endpoints

at

verged

series.

our considerations neither

nor

1,

immediate inspection of the

power

theorem 24

limit

Let

.

have radius of convergence r and

Then

series

power

= Ja

and

n

a?->r

n

rn

at least to

f (x)

= JJ a n x

=

converge for x

still

exists

\imf(x)

the

is,

-f-

n

n=0

r

.

.

o

00

Or in

other words: If

2,a n x

n still

converges for

n=

the

function f (x) defined by the series in continuous on the left at the endpoint x -f-

There

Proof.

no

< x <^

r

=

#= -fy, -f-

r

,

then also

is

r.

=+

25

in assuming r For 1. n then the series Za^'x", in which a ' a n n r 1 or obviously has radius 1; and the latter series is convergent at and only if, the former was at -j- r or 1 r respectively. if,

2a n x

if

n

is

has radius

restriction

r,

= +

,

,

We

therefore

in

that f(x)

therefore,

assume

future

= 2a

n

verges; and our statement

\[mf(x)

x

n

has

y

=

by

01

(v.

= s,

00

1

if

= X \

by

we

sn

x]

(l

s

24

denote

2s n xn

\<1>

(a)

^V an Xx _ *x n=o

f.

d.

the

and since

- f(x]

Journal

n

n=0

(1

~

we have

00

an

for

00

2an = s

is,

con-

.

00

~ 2.V

sum

2 an

rr

partial

=

a.

rr

n^O

(1

x)2x

- x)2(s - sj n=0

of

n

x

n

< 1,

\x\

V Xn 2j V a n Xn

n =o

1

that

3D

=

i.e.

also later, 102), 1 *

Our hypothesis

.

and

that

is

*->l-0

Now

1

-J-

radius 1

S*

n-0

,

we

~(l

.

n


n >

Consequently f(x) therefore deduce, for

- x}^rn x\ =0

reine u. angew. Math. Vol 1, p. 311. 1826. cf. 233 and stated and used by Gauss (Disquis.

The theorem had already been

62.

Wcrke III, p 143) and in fact precisely in the form proved further on, that rn -* involves (1 rn x n -> * 1 if x x) from the left (v. eq. (a)). The proof given by Gauss loc. cit. is however incorrect, as he interchanged the two limiting processes which come under congeneralcs circa seriem ..., 1812;

2

sideration for this theorem, without at all testing whether he so doing 26

was

justified in

This remark holds in general for all discussions of (not everywhere convergent) power series of positive radius f.

100.

Chapter V. Power

178

Here we have written If

now

*"

>

>m

n

for every

e

is

= rw

sn

the "remainder" of the form a null sequence.

2,

rn

|

<

\

.

series;

,

we

then

arbitrarily given,

we have

y

s

Theorem

these remainders, by 82,

series.

m

choose

first

We then have,

so large that,

:g x

for

< 1,

2t

\s-f(x)

+ |rm

^

- x) Zrn x\ + (1 - x) -Z |*

(1

I

w^O

n

number

denotes a positive

if />

hence,

I

greater than

^0

|

x,

+1 I

+

I

ri

I

+

this is

|,

e

v'

= the smaller of the 1 - 8 < x < 1,

we now

have, for

1

two numbers

write 8

=

-

then

we

,

J

19, Def. 5, proves the required statement

which, by

and

1

P>


!-/(*)!

-r-

J(l -*)?.

^/ (!-*)+ If

tn

"/ (x) ->

s for

x ->

1

-0".

We

have of course, quite similarly, Abel's limit theorem for the

left

endpoint of the interval of convergence: X

If

E

an xn

converge for x

still

=

r,

then

w-=0

exists

lim/(*) r+

=^

and

The

n

w-0

x->

n r

l)

(

continuity theorem 98, 2 and Abel's theorem

n .

100 together

assert

that

101.

(Za n x n )

lim *-> if the series

=2a

on the right converges and x tends

n

%

to

n

from

the side on which lies

the origin.

Ea n

n

diverges, we cannot assert anything, without n when x -> further assumptions, as to the behaviour of n x g. have however in this connection the following somewhat more definite: If the series

Ha

Theorem has radius

1,

If

2a n is

a divergent

when x tends towards

Proof.

+

.

that a

8

<

1

of positive terms, and

series

Z a n xn

then

=

/(*)

oo

We

A .

so small

.

1

from

an

x^+

oo

the origin.

terms can only diverge to arbitrarily given, we can choose m so large G 1, and then by 19, Theorem 3, choose

divergent series of positive

If therefore

+ a^ +

+

H=

.

G>

is

+ am >

that

for

a

+

+

every

a1

1

>

x

x+ ... +

>

1

am x m

8,

we

> G.

continue to

have

The

21.

But then we have, a

algebra of

power

179

series.

fortiori,

2

/(*)=

>G,

a nX

n

which is all that required proof. Remarks and examples for the theorems of the present paragraph will

be given in detail in the next chapter.

The

21.

we make

Before

algebra of power series.

use of the far-reaching theorems of the preceding

section ( 20), which lead to the very centre of the wide field of application of the theory of infinite series, we will enter into a few questions whose

solution should facilitate our operations on power series. That power series, as long as they converge, may be added and sub-

term by term already follows from 83, 3 and 4. That we may immediately multiply out term by term, in the product of two power tracted

provided we remain in the interior of the intervals of convergence, follows at once from 91, since power series always converge absolutely

series,

i/i

We

the interior of their intervals of convergence.

E

also

E

* n

n

therefore have, with

= E

b nX

-

71

26 provided x is interior to the intervals of convergence of both series 3 were themselves a first application The formulae 91, Rem. 2 and .

of this theorem.

If the

second series

in particular, the geometric series,

is,

then we find QO

oo

2

an

oc

n

n -0

H

x w-0

oo

E

O

a n xn

=

= E

a n xn

where

sn

We and

=a

a1

+ an

+

E

xn

and

,

x \

\

sn

xn

<1

and

manner

a n x n\ /

= E n ^0

Ka

by

that every series itself.

also

less

than the

+a

n

l

an

k

!a n xn}

i-O

/

^+

= E

may be

multiplied

Thus .

.

.

generally, for every positive integral exponent

20

103

,

---

.

infer in as simple a

Vi

sn

oo

- x) E

(1

n

in fact, arbitrarily often

(

and

Q -f-

E an xn

* n,

n-O

n

radius of

sn

N---0 00

2

A

or

on

= E

xn

TO

1

-

i.e.

E =

+ an a k

Q)

Xn

;

y

108 -

a n w**

w-O

Here we see the particular importance of Cauchy's product

(v.

91,

1).

180

Power

Chapter V.

where the

coefficients a

(

from the

are constructed

manner

perfectly determinate one 27 for larger yfe's.

series

And

coefficients a n in a

even though not an extremely obvious

these series are

all

absolutely convergent,

n

so long as 2a n x itself is. This result makes it seem probable that

we "may"

we may

also write

by power

and

that for instance

series,

that the coefficients c n

-- = "

writing

',

for

n

the

=1 1

coefficients

2

,

divide

again be constructed in a perfectly For we may first, an

may

manner from

determinate

also

,

3

,

.

.

.

.

replace the

,

hand

left

ratio

by

_

and then by

powers

of

form .Scn xn if x then grouped

Our justification for writing the above may from a somewhat more general point of view:

at

once be tested

which must actually

result in a

power the powers are expanded by 103 and

of the

series like

,

together.

We

suppose

series

n=0

We

an

n

f

a:

further

g (y) = 2 b n y

we

) ,

given a power

whose sum we

suppose

given

series

2a n xn

(in

a

power

in

series

n

the above, the geometric series (in substitute for y the former power series: bo

+

*i

K+

i

x

+

)

+6

9

K+a

i

x

+

the above,

more

denote by f(x) or

shortly for

y,

2 yn

by

y.

instance

and

)

the

in this

0* H

Under what conditions do we, by expanding all the powers, in accordance with 103, and grouping like powers of x together, ob2 tain a new power series C Q c x -}- ca x -)---- which converges and

+

has for

sum

the value

of

the function

of

a function g(f(x))?

We

assert the

This certainly holds for every x for which

Theorem.

104.

converges and has a

27

L

sum

less

than the radius of

Recurrence formulae for the evoluation of a

2bn yn are

to

n=0 .

be found

in

Note on Sylvester's paper: Development of an idea of Eisen stein (Quarterly Journal, Vol. 14, p. 79 84. 1875), where further references to the bibliography may also be obtained. See also B. Hansted, Tidbkrift for

/.

W.

Glaisher,

Mathematik,

(4)

Vol.

5, pp.

1216,

1881.

The algebra

21.

of

power

181

series.

Proof. We have obviously here a case of the main rearrangement theorem 90, and we have only to verify that the hypotheses of that theorem are fulfilled. If we first write forming the powers by 103, and also suppose and k for k 1, then we have, in

=

this

notation

28

=

6,

=b

y

(i)

l

adopted

rfv-

(a

(A) <*)

.<*'*. 1

the series

z'*

'

y = 2 a n x"

of

x".

occurring in the theorem 90. If we now take, instead the series 97 a n x" , and, writing x , | , form,

=

=2

\

\

|

|

quite similarly,

(A')

^

numbers in this array (A'j are and since furthermore was assume d to converge, the main rearrangement theorem But obviously every number of the array A is is applicable to (A'), in absolute value <^ the corresponding number in hence our (A'); theorem is a fortiori applicable to (A) (cf. 90, Rem. 3). In particular, then

^

the

all

fc

I

^fe

I

*?

the

therefore,

coefficients

standing vertically one below the other in

(A) always form (absolutely) convergent 00

yjb k a^

and the power

is

again,

k)

=c

scries

every

(for

n

series definite

formed with these numbers as

for the considered values of x, (absolutely)

has the same

sum

2b n yn

as

.

We

n

= 0,

1, 2, ...)

coefficients,

i.

e.

convergent and

therefore have, as asserted,

n=0 with the indicated meaning of

1.

theorem

Remarks and Examples. If the "outer" series gy) = ^b k x^ converges n evidently holds for every x for which 2a n x

We

88

have therefore

the latter for 7

n=

0,

1

,

2

,

. .

to write ..

0)

a^

=

1

* ,

aj

= a.J0) =

105. everywhere,

then our

converges absolutely.

=

,

and

If

Power

Chapter V.

182 both series

for every

series.

converge everywhere, then the theorem holds without restriction

ar.

and both series have a positive radius, then the theorem 2. If a = ceitainly holds for every ''sufficiently" small a, that is to say, there is then certainly a positive number g, such that the theorem holds for every a; then rj = a x -f- a 2 and since for For if y = a t x -f 0, rj is certainly less than the radius x > |

i

\

|

\

\

\

\

\

|

<

;

\

,

of

2bk yk

x
1

|

4.

is,

x whose absolute value yn

In the series

3.

|

for all

i

we now

we "may"

,

xn

or y

To

JE7

-

for every

write, as

we

see, certainly

n

,

for

than a suitable number g.

instance

substitute

and then rearrange

did above:

allowed

less

is

in

y

= 2 xn

powers of x

for

.

oi2

if

={=

and further x

is in

absolute value

so small that -

which by Rem. 2 choice of Q

is

fl

x

an

certainly the case for every x <[ Q with a suitable therefore say: We "may" divide by a power series of and provided we restrict ourselves to constant term is =(= |

We may

.

\

radius if ^ts small 20 values of x. To determine the coefficients cn by the general method used to prove even for the first few indices, be an extremely their existence, would, laborious process. But once we have established the possibility of the expansion we may determine which is at the same time necessarily unique by 97, the c n 's more rapidly by remarking that positive

sufficiently

2a n xP'2cn gpss so that

we have

l

f

successively

. may be From these relations, since aQ ^ 0, the successive coefficients c0t c^ c z uniquely determined, the simplest method being with the aid of determinants, by Cramer's Rule, which immediately yields a closed expression 3o for c n in terms of a , a l9 . . . , a n 5. As a particularly important example for many subsequent investigations we may set the following question 31 ,

.

.

.

:

^ 29

some

How

small x has to be,

The

is

usually immaterial.

But what

is

essential, is that

such that the relation holds for every x < Q. determination of the precise region of validity requires deeper methods of

positive radius g

exists,

|

\

function theory. 80 Explicit formulae for the coefficients of the expansion, in the case of the quotient of two power series, may be found e. g. in y. Hagen t On division of series, Americ. Journ. of Math., Vol. 5, p. 236, 1883. 81 Euler: Institutions calc. diff., Vol. 2, 122. 1755.

The algebra

21.

in powers of x.

ot

power

183

series.

Here the determination of the new

peculiarly elegant

we

if

denote them, not by

cnt

coefficients

but by

~,

or as

becomes

we

shall

~D

do, for historic reasons,

and the equations

for

~.

by

Then

Bn

determining

t

n=

2, 3,

.

.

.

If

we

Now

multiply by n\ y

we

if

are, in succession,

' U + l.*i-0 1!~ 2,01+H

'

..

,

.__.__

" " " r II (n (n-2)l 2I" we may write this more concisely:

!"0'" "(n-l)l'l!"

here had

r

in

is

1B

B -1 ^0-1. and, in general, for

the above equation

.

r

place of

Bv

,

w

1

for

each

n JB

v,

then

we

-

1)1

could write instead

106.

=0;

and the recurring formula under consideration also may bo borne in mind under this convenient form, as a symbolic equation, i. e. one which is not intended to be interpreted literally, but only becomes valid with a particular convention, here the convention that after expanding the w tb power of the binomial (#+1), we replace each B v by Bv Our formula now yields, for n = 2, 3, 4, 5,.. .

successively, the equations

3

+ 1=0, B + 3 B! + 1 =

5

B4 +

2/^

2

10 a,

,

+ 10 # + 5 B, + = 1

2

,

from which we deduce

and then

and

*14 =

6

These are called Bernoulli's numbers and will be mentioned repeatedly later on ( 24,4; 64). For the moment, we are able to infer 55, IV; 32,4; only that the numbers Bn are definite rational numbers. They do not, however, conform to any apparent or superficial law, and have formed the subject of

many

elaborate discussions

88 .

numbers are frequently indexed somewhat differently, BQt 1 written instead of J5flfc for being omitted and ( l)*" k = 1, 2, ... A table of the numbers J9a ,l?4 ..., to B may be found in We may mention /. C. Adams, Journ. f. d. leine u. angcw. Math., Vol. 85, 1878 in passing that U wo ha^ for numerator a number with 113 digits, and for denominator the number 2 358 255 930; while #123 has the denominator 6 and, 32

Blt

BQ

Bernoulli's

B6 ,B7I

^

...

,

,

m

Chapter V. Power

184

we

Finally

will

series.

prove one more general theorem on power series: CO

Given the power

series y

= 2

x

a n (x

n )

x

x

convergent for

,

w-O

\

\


we

have, for every x in the neighbourhood of XQ , a determinate corre=-= x a Qt which we the value y sponding value of y, in particular for x

=

will accordingly denote

y

by y

-y =

i

Then we have

.

(x

-* +

2

)

-

(*

2

*o)

+

-

Because of the continuity of the function, to every x near x also correWe would now enquire whether or how far sponds a value of y near j> and whether it is obtained once only. If is obtained every value of y near y .

the latter was the case, not merely versely of y.

x would be determined by

y would

be determined by x, but conx would be a function

y, and therefore

given function y=f(x) would, as we say for brevity, be The in the neighbourhood of XQ (cf. 19, Theorem 6).

The

reversible

question of reversibility

is

dealt with by:

Reversion theorem for power series.

107.

y-

convergent for

:xo

x

=

x

\

\

i

-* (*


e.

)

Given the expansion

- *o) + (* 2

a

the function

XQ> under

reversible in the neighbourhood of i.

4-

y =f(x)

>

thereby determined

is

a 4= U;

the sole hypothesis that

and only one function x 9 (y) which is expressible convergent in a certain neighbourhood of y of the form 2 b 2 (y y) *i (y j ) *o

there then exists one

by a power

series,

-

* and for which, Moreover b 1

=

Proof.

=

-

we have

in that neighbourhood,

1

:

-

+

,

+

.

.

.

(in the sense of

104)

av

As we have

already done more than once, we assume in which implies no restriction 33 . But the proof that x and y are =0, we will then further assume that a l 1, so that the expansion

y=x+*

(a)

2

x*

= +

3 *3 *

+

That too implies no 2 by hypothesis, we can write a^ x + a 2 x + is

the one to be reversed.

.

restriction, for since .

.

in the

a 1 4=

0,

form

in the numerator, a number with 107 digits. The numbers B z B4t to B 6Z had previously been calculated by Ohm, ibid., Vol. 20, p. Ill, 1840. The numbers B v first occur in James Bernoulli, Ars conjectandi, 1713, p. 96. A comprehensive account is given by L. Saalschutz, "Vorlesungen uber die Bernoulhsclnen Zahlen", Berlin (J. Springer) 1893, and by AT. E. Norlund, "Vorlesungen uber Differenzenrechnung", Berlin (J. Springer) 1924. New investigations, which chiefly concern the arithmetical part of the theory, are given by G. Frobenius, Sitzgsber. ,

d. Berl. Ak., 1910, p. 33

Or:

we

.

.

.

,

809847.

write for brevity plicity's sake, omit the accents.

x

XQ

=

x'

and y

yQ =

y'

and then, for sim-

The algebra

21.

we

If

x

write for brevity a

= a/

of

series.

power

and, for

n ^>

185

2,

and subsequently, for simplicity's sake, omit the accents, then we It suffices therefore to obtain precisely the above form of expansion. consider this. But we can then show that a power series, convergent in a certain interval, of the form x

(b) exists

=y+\y +b 2

3

y

3 -\

which represents the inverse function

=

of

the

former,

so

that

identically y, if this series is arranged in powers of y, in accori. e. all the coefficients must be dance with 104, except that 1 1. of y , which is Since we have written, for brevity, x instead of a 1 x, we see that the series on the right hand side of (b) has still to be divided by
=

=

b1

=

as coefficient of If

we assume,

y

1 .

provisionally, that

the

statement (b)

is

correct,

then the coefficients b v are quite uniquely determined by the condition 2 that the coefficients of y , y*, ... in (c) after the rearrangement, have In fact, this stipulation gives the equations all to be =0. ,

+ a* =

64

from which, as is immediately evident, the coefficients bv may be determined in succession, without any ambiguity. Thus we obtain, the values

but the calculation soon

becomes

too complicated to convey any clear

Nevertheless, the equations we have written down show that if there exists at all an inverse function of y f(x), capable of expansion in form of a power series, then there exists

idea of the whole.

=

only one.

Now

the calculation just indicated shows that whatever may have we can invariably obtain perfectly (a),

been the original given series

Power

Chapter V.

186 determinate series

y

-\-

values &3

y

so

&r ,

9 -|-

we can

that

which

series.

invariably construct a powei satisfies the conditions

at least formally

=

the

of

It only y. problem, the series (c) becoming identically remains to be seen whether the power series has a positive radius of convergence. If that can be proved, then the reversion is completely

carried out.

The

required verification may, as Cauchy first showed, actually in the general case, as follows: Choose any positive

be attained,

numbers

2

cc

which we have

for

x v has a positive radius of convergence. above manner, for the series: x a 2 x* y

and

cc

Proceeding

v

in the

=

whose inverse

we

is,

then, say,

obtain, for the coefficients

the equations

/? y ,

8

ft

= GV + 2 Ai) + 3 A 3

s

4-

....... ...........

in

which

the terms are

all

now

positive.

Thus

for every r.

2

v possible so to choose the ccv that the series ft v y v has a positive radius of convergence, it would follow that b v y also had a positive radius and our proof would be complete. it

therefore,

If,

is

2

We

choose the ccjs as follows: There is Q, for which the original series x -f-

a positive converges must, however, then exist (by 82, absolutely. A positive number Theorem 1 and 10, 11) such that we have, for every r 2, 3, ...,

number

K

We

then choose, for y

so that

we

=

2, 3,

are concerned

.

.

a

certainly x* -\-

=

.,

with reversing the series, convergent for

\*\<e>

But by of

this

For we may at once see are dealing, in fact, with a simple hyperbola, student should draw a graph for himself that in ,

function

differentiation

which the

is

immediately reversible.

we

00

< X<X

l

The algebra

21.

of

the function increases monotonely (in the

187

series.

power

sense) from

stricter

oo

to the value

and therefore possesses, for y < y lf a uniquely determined inverse For this, since a? whose values arc 1

<

y

we

=x

.

~~

(X + e

r

efe'-^g)

^

9

~"

e

k + y}* + Q* y =

'

have, uniquely,

Further

if

we

write for brevity, with the above defined value of y t ,

and both y l and y 2 are

=Q

product

2

>> 0,

In the following

chapter can actually be 2)!

(1

with 1

x

also

-*-

&

+

may X

'

we

and the two have

is

this

be expanded

in

that,

for

2 1

1

<

the

1,

a power series

in

expanded

Assuming

'

see

shall

result,

a power

it

series,

power

beginning

follows immediately that

convergent

at

least for

=

By our first remarks the proof The actual construction of

is

+& *+

series

hereby entirely completed.

the series

y

from the

second

the

since

But

.

9

+

2

y

a

** H

here also involves in general considerable difficulties and necessitates 34 the use of special artifices in each particular case Examples of this will occur in 26, 27. that only note further, a fact which will be of use later on, if is the inverse of (a), then the inverse of the series (b) .

We

y

(a')

= x-a^-\-a^ -

where the

signs are alternating the signs,

*

(V) 34

alternated, i.

H

obtained

is

from

(b)

by

similarly

e.

= y - b* y* + b

a

y

3

-+

The general values of the coefficients of expansion b n are worked out by C. E. van Orstrand, Reversion of power series, Philos. Magazine (6),

as far as 6 13

Vol. 19, p. 366, 1910.

Chapter V. Power

188

This

is

at

once evident,

if

we

first

series.

expand the powers of

actually

in (c), obtaining, say,

(y

(c)

Under series

the new assumption, the same process, since the product of two with alternating coefficients is again a series with alternating co-

efficients, gives

- brf + ...)-. (J 2

(y

(c')

And from this we cients of y 2 y 3

*

(8

>^

+

-

-

)

immediately infer that on equating to zero the

coeffi-

we must

obtain the identical equations (d), thus deducing for b v precisely the same values as before. The exact analogue holds good when the two power series contain, ,

from the

,

first,

.

.

.

,

only odd powers of

= X -f x =y + b

y is

tf

3

Thus,

x.

if

the inverse series of

+a X y* + b y + 5

#3

-f-

5

.

..

5

3

5

.

.

.

,

then the inverse series of

y is

x

necessarily

= xa =y

3 afi 3

b.3

y

+ az3f-\-... + b y -5

5

1-

.

.

.

.

Exercises on Chapter V. 64. Determine the radius of convergence of the power series an has, from some point onwards, the values given in Ex. 34 or 45. 65. Determine the radii of the power series

S an xn when t

0<*<1;

66. r of the ticular:

Denoting by

power

series

If lim

y.

and

Z an xn exists, it

a n+l 67. Sa n xn has radius \

r,

the lower and upper limits of

p,

invariably satisfies

,

the radius

^ ^ p.

the relation x

r

In par-

has for value the radius of S a n xn ' a n xn radius r'. What may be said of the radius .

Z

of the power series

n

an

67

a.

What

is

the radius of

Z a n xn

if

< hm

|

an

\

< +

oo?

00

68.

The power

series

-,

n

xn where e n has the same value as in Ex. 47, t

converges at both ends of the interval of convergence, but in either case only conditionally.

69. Prove, with reference to 97, example

3, that

2 s ("y-(-i)l(-ir( W \ v y/ ^o

K=O

" ft"). \ /

The

22.

70. As a complement to Abel's theorem 100, which E a n xn has a radius r 1, we have

^

case in

\

2

*-^*-- v (s n

o

71. if

+

i

The

+

4

tf

189

rational functions.

<*n

x )

(00 n=Q

it

may be shewn

that in every

_

^ lim*n

I

w )-

converse of AbeVs theorem 100, not in general true, holds, however,

^

the coefficients an are

if

;

therefore, in that case,

hm 2a n xn

*->r-0 exists,

then

2 an r n

converges and

%

72. Let

its

sum

- / (x)

a n xn |

x

\

<

We

Q.

n-l (By specialising the coefficients

What

Z b n xn - g

(*),

H=l

both series converging for

73.

equal to that limit.

and

71-1

e.g.i n = !,(-!)-', ~,

is

then have (for what values of #?)

M-=!

many

may be

interesting identities

Write

obtained.

etc.)

are the first terms of the series, obtained

by

division, for

(Further exercises on power series will be found in the following Chapter.)

Chapter VI.

The expansions

of the so-called elementary functions.

The theorems of the two preceding sections ( 20, 21) afford us the means of mastering completely a large number of series. We proceed to explain this in the most important cases.

A certain not very large number of power series, or functions represented thereby, have a considerable bearing on the whole of Analysis and are therefore frequently referred to as the elementary functions. These

will

occupy us

first

of

all.

22. The rational functions. From

the geometric series !

+*+* +

.

..=

*=

w =o

*

L

~x

|*|

<1,

which forms the groundwork for many of the following special investiwe deduce, by repeated differentiation, in accordance with 98, 4:

gations,

!<" and

generally, for

any positive

p

:

1. (G51)

1<

1.108.

If

2x

The expansions

Chapter VI.

190

n

we

of the so-called elementary functions.

multiply this equation once more, in accordance with 91, by

=,

we

01 and 108:

by

obtain,

we deduce from

accordance with 07),

coefficients (in

By comparing this that

'

'

P

P

V

J

which may of course be proved quite easily directly (by induction). If we do this, we may also deduce the equality 108 by repeated mul-

Since

"

x

tiplication of

*

m

itself,

by 103.

we have (n + p\ (

we

w

x

i

1

obtain from

P

108,

= fn-rp\ = (- 1-t\nfpn n ,

) if

(

we

)

j

there write

x

(

for

^\ )

x and

k for p

+1>

the formula

109. valid for

|a?|

<1

an extension

of

and negative the

exponents; for this theorem also

be written

in the

integral k.

form

This formula

theorem (29, 4)

binomial

to

is

negative

evidently integral

= 0),

may

for positive integral k for k (or 109, as the terms of the series for n

are in that case all =0. Formulae such as those we have just deduced have a two -fold meaning; immediately, and once for all

if

>k

as we may observe we read them from

they give the expansion or representation of a function by a we read them from right to left, they give us a closed exsum of an infinite series. According to circumstances, the one interpretation or the other may occupy the foremost place in our attention. By means of these simple formulae we may often succeed in

left

to

right,

power

series; if pression for the

expanding, in a power scries, an arbitrary given rational function

namely whenever pressed as a

f(x)

sum

may be

split

up into form

partial fractions,

i.

e.

ex-

of fractions of the

A

(x-a)' Every separate fraction of this kind, and therefore the given function also, can be expanded in a power series by 108. And in fact this expansion can be carried out for the neighbourhood of every point x distinct from a. We only have to write ( \x-aj)'

/*U -*

The exponential

23.

and then expand the

by 108.

fraction

last

191

function.

By

and

means we

this

same

time, that the expansion will converge for only for these values of x.

at the

x

x |

\

<

\

This method, however, only assumes fundamental importance we come to use complex numbers.

Examples. 1 *

V ^J

-

C\n

"

when

HO.

^

2V* ^j

2 &

sec,

x

a |

- *4

?-I*~-_ t M

C

3.

'

The exponential function.

23. 1.

Besides the geometric

series,

~n

the r3 -

2 n- = + x + -.o GO

.'J

i

-\-

so called

H

series

h ^r n. H

'

n=0

exponential

/v.n

We

proceed now plays a specially fundamental part in the sequel. This to examine in more detail the function which it represents.

exponential function we denote provisionally by E(x). As converges everywhere by 92,2, E (x) is certainly, by 98, defined, continuous and differentiate any number of times, for every x. For its derived function, we at once find so-called

the

seiies

so that for

We shall attempt to We have already itself. real

numbers, we have

deduce

shown

all

in

further properties

91, 3 that

+

This fundamental formula

aco)

is

for the exponential function

1

= E (x\)-E

(x>>)

q. e. d.

the series

.

referred to briefly as the addition theorem It gives further

that for

any number of

real

.

Alternative proof.

The

Taylor's series

99

If we observe that for all values of x and x once follows, replacing x by a^+tfg, that

valid at

.

from

x and x are any two

.

and by repetition of this process, we find numbers xl9 #a ., x k , ,

if

also have

in all cases

(XL

(a)

1

we must

derived functions of higher order

all

.

for E(x) is

E^ fa) = E fa),

then

it

Chapter VI. The expansions

192

we

If

=1

here write x

of the so-called

each r,

for

holds for every positive integer k.

k

= 0.

we now

If

^ 0,

a secon^ integer

~

since

we

write

or,

If

then

Since

E (0) =

=~

for

= E, we x E(x) = E

brevity

E(i)

equation (c)

in particular that

1,

it

each y,

also holds for

m

denoting by

that

,

holds for every rational

we deduce

follows that

it

= [(!)] w

(w)

for

xv

write, in (b),

elementary functions.

have

thus

shewn

that

the

x^>0.

any positive irrational number, then we can in any number of ways form a sequence (xn ), of positive rational terms, conFor each n, we have, by the above, verging to f If

is

.

When w *-f co, hand

right

the

left

by 42,

side,

hand to

1,

E

side,

so that

,

E(f)

Thus equation

(c)

is

by 98,2, tends to(f), and the

=E

we

obtain

.

proved for every real x I> 0.

But, finally, (a) gives

= E(a - a) = E(0) = 1, = cannot hold that E

E(- *)-(*) whence we first conclude and that for a;

2

(x)

Ex

E(x)

But

this

implies

that

equation

(c)

is

also

for

any

real

x

.

valid

for

every negative

real x.

We

have thus proved that the equation holds for every real x\ same time the function E(x) has justified its designation of exponential function; E (x) is the ar th power of a fixed base,

and

at the

namely of l 2

This

may

of course, for

by inspection, since is

=

1.

+ i + i + ^ + ... + i + ...

this

is

>

x be deduced immediately from the series, a series of positive terms whose term of rank ,

23.

2.

about

We

base.

met

already

next

will

It

this

46 a,

in

The exponential

193

function.

be required to obtain some further information shall show that it is identical with the number e

so that

3

Mm The proof may be made somewhat more comprehensive, by at once establishing the following theorem, and thus completing the investigation of 46, a:

For every real x

o Theorem. /

lim (1

-|

x --

w

n ->x

\

exists

)

is

sum

equal to the

4

of the "

Z

series v

We

Proof.

and

'

111.

9

-,.

-i)V\

write for brevity

and

+)"=*

(*

xv

!;$=(*)=

then suffices to prove that (s xn ) definite value for x, e is chosen

*

It

.

> 0,

Now

if,

given,

we can assume p

first,

a

so large

remainder

that the

'

2

n

Further, for

> 2,

a series which terminates of

itself at

the

n ih term.

The term

in

x

k ,

evidently has a coefficient ^> 0, but not greater than the coefficient 1/&I of the corresponding term of the exponential series. The same is also true, therefore, of the difference of the former and

k

0, 1,

.

.

.

,

the latter term.

which

p

Accordingly

was chosen

we

Every individual term of the (p 8

We

have here, therefore, a

duction to 4

First

>p

from the manner in

1) first

significant

terms on the right hand side example of problem B.

Cf. intro-

9.

proved

if

not in an entirely irreproachable manner

Introductio in analysin infinitorum, x series and its sum e were already 6 from the assume

We

have, for n

5

p>2

by Enter, Lausanne 1748, p. 86. The exponential known to Newton (1669) and Leibniz (1676). first.

194

now

is

for

of the so-called elementary functions.

th term of a null obviously the n sequence"; hence their sum a fixed number also tends to 0, and we may choose

is

p

>p

w

The expansions

Chapter VI.

we then

>n

n

have, for every

<~

sum remains

so large that this

for

>n

every n

But

.

{}

,

\s-xn <6, which proves our statement 7 00

=1

For x

.

I

= ^-l=lim(l + vl

y=0

and more

r->

in particular

-

xy

number more convenient one for

representation thus obtained for the

exponential series, is a very much In the discussion of this number. easily obtain a

we deduce

^

oo

generally, for every real

The new

,

/

good approximation

series are positive,

we

first

to e.

e,

by the

the further

place, we can, by this means, For, since all the terms of the

evidently have, for every n,

or

.

e.

8

We

have

product (by 41,

(l_JL)->l ->

10), also

(i-jL\-+i

f

1,

or

1

-

9

1

f

-*0; and similarly

.

.

.

(l

-^-1)-* 1, ^""

J

and ^ are fixed numbers, the product of also

..., fl

J

this

-^0;

last expression

We

for the other terms.

and so their so, as

by

x

T|#|^

can also infer the

result

directly from 41, 12

The

7

is

xn

artifice

frequently

=

a;

(n)

used:

+ x^ +

here adopted is not one imagined ad hoc, but one which The terms of a sequence are represented as a sum + fcj.n \ where the terms summed not only depend in-

on n, but also increase in number with n: k n > OO If we know individual term behaves for n > oo as for instance, that xv(n) for fixed v tends to v then we may often attain our end by separating out a fixed dividually

.

how each

,

1

,

number n -> oo

,

we

of terms, to

4-

say

f l -f

o:

+

-\-x^

f

^ -\-xp

(n)

(n)

,

-f-

by 41,

9.

with fixed p\

The remaining terms,

this tends, *>

+

. . .

when -f

*>

then endeavour to estimate in the bulk directly, by finding bounds above and below for them, which often presents no difficulties, provided p was suitably chosen.

The exponential

23.

\vherc s n denotes a partial culate these simple values

sum

2 718 -

new

of the

for

e. g.

function.

281<

e

=9

n

<

series for e.

251) then

(v. p.

718 282

2

195

we

If

we

cal-

find

,

which already gives us a good idea of the value 8 of the number e. From the formula (a) we may, however, draw further important

A

infeiences.

and

number

written in

is

show

inequalities (a)

For

we had

if

where

s

then q

\

=2

q

s

is q

and

it

But

this is

quite easily that this

e =

n = q,

then for

,

----

^

Is e perhaps a rational

.

r.

If

an integer, which

we

-f-

-|

-f

we will

is

number? The

(aj

would give:

this

inequality

formula

denote

for the

by

:

1

A

two problems

we

of this,

--\ n

-|

and

propose,

)

which we,

,

all

the information, with regard

in the first instance, require; the

B

In spite ( 9) are both satisfactorily solved. in view of the fundamental importance of these

matters, to determine the same limit again entirely independent of the preceding.

and

in a different

way,

-(1 1

we

will first

-|

\n

+ oc-

sequence of the previous

The number

e

result 9

been

nas

if

e

_

---

-|

is

given

remains

.< *

J

--- \

vn

(1y/we _]

n >> n 4

>

calculated

I

e\

J

<^e

for every

I

have y n ;>

.

and

,

for

n

>

con-

.

J. M. Boormann (Math, magazine, Vol. For

.

n

=

9

e

extend by showing that *

8

>

)

when (yj is any sequence of positive numbers tending to When yn a positive integer, for every n, this is an immediate alsoy

1

g,

-

1

M

q\,

moment by

impossible; for between the two consecutive integers g and there cannot be another integer p (q distinct from either l)

(x

This

rational

unfortunately not the case.

multiply

an irrational number. 3. The above investigations give us

e is

is

it

follows that

-f- 1

g

not completely before us unless

is

the form

1,

No.

n

is

every tt

lf

346

to

places

of

decimals

by

12, p. 204, 1884).

determined,

n>n

,

provided n v

then is

by

we

46 a, shall

so

also

that

have

so chosen that for every

Chapter VI. The expansions of the so-called elementary functions.

196

are not integers, there If the numbers y n one (and only one) integer k n such that

will

still

be

each n

for

*.y.<*. + l>.

and the sequence of these integers k n must evidently also tend Now, however, if k n 1,

to

-|-

oo.

^

And

numbers k

since the

are integers, the sequence

(>+ and the sequence

both tend to

We

or,

by our

e,

remark.

first

Hence, by 41,

(+f>-

next

may

show

otherwise, that

that

when yn'+

when yn

>

1 \

also have

also have

we have

oo,

--yJ\-Vn -+e. )

<

'

numbers yn must, however, be assumed so that the base of the power does not reduce to

All the 1

we

we

1

/

yn >

-|-

oo,

8,

,

negative value; this can always be brought about by "a Since

finite

> -|- oo, the statement and since, with yn yn 1 also is an immediate consequence of the preceding one.

to

1,

i.

e.

or a

number

of alterations".

,

= zn

Writing

provided

we may couple

two

the

results thus:

sequence with only positive or only negative From this 1. being all obtain the theorem, including all the above results:

(zn)

is

any

null

>

the terms in the latter case

terms,

we

,

finally

Theorem: different

be proved

(xj is an arbitrary null sequence whose terms are and > 1 from the first 10 then u

//

from

,

i

Urn (1

(a)

10 (cf.

38, 11

The

latter

+ *,)*

may always be

effected

.

by "a

finite

number

of alterations'

6).

Cauchy: Rgsume' des lemons sur le calcul

infinit.,

Paris 1828, p. 81.

The exponential

23.

197

function.

Proof. Since all the xn 's =J= 0, the sequence (#n ) may be divided two sub-sequences, one with only positive and one with only negative terms. Since, for both sub-sequences, the limit in question, as we have proved, exists 12 and e, it follows by 41, 5 that the given sequence into

=

also converges,

By

42,

2,

with limit

e.

the result thus obtained

be expressed in the

also

may

form log, (1

+ **) _ !

yn x

(b)

which

be used.

will frequently

19, Def. 4, the result also signifies that, invariably:

By

From these results, it again follows, quite we announced, of our investigations of 1. and 2.

independently, as ,

that

('+3'-" for

certainly a null

is

(

J

sequence

18

so that

,

we

by the

have,

pre-

ceding theorem, n

and therefore

e

(l

+ -)"-*

9 e

,

14

which was what we required 4. If a 0, and x is an arbitrary .

>

real

number, then, denoting by log

the natural logarithm (v. p. 211),

ax C*

is

= Ggxioga = 1-1X T

an expansion in power

limiting relation

~

9* j

x* +

series of

18 If

we 18

ways have the of

I

x? 4**

an arbitrary power.

I

We

deduce the

a> 0.113

*->0,

for

one of the two sub-series breaks

off after a finite

number

of terms,

number

of alterations, leave it out of account. x only, so that we may alconsider this null sequence for n

can,

We

Q

I

I

15

2Lni->loga

then

S*

x2 4-

2

i

x

by a

^

>

finite

>

|

\

t

1

.

14 Combining this with the result deduced in 2., that the above limit has same value as the sum of the exponential series, we have a second proof the fact that the sum of the exponential series is =e*. 16

Direct proof:

do the numbers ?

=

If

**

ax

the xn 's form a null sequence, then by 35, 3, so 1;

*l

and consequently, by 112 (b),

_->_-a = log

y*log-a

log-

a.

Chapter VI. The expansions of the so-called elementary functions.

198

This formula provides us with a first means of calculating logawhich is already to a certain extent practicable. For it gives,

rithms, e. g.

9,

(cf.

p.

78)

a

log

= lim n (ya

1^

n->o> 2 *__

=lim2*(Va-l). *->oo As

is a power of 2 can be calculated directly of square roots, we have in this a means (though a primitive one) for the evaluation of logarithms. have already noted that e* is everywhere continuous and 5.

roots

whose exponent

by repeated taking still

We

x

=

=

=

with e It also any order, (e*)" (e*}' x of base a a with the shares 1, the property of general power being everywhere positive and monotone increasing with x. differentiable

up

to

More noteworthy than

these

exponential with the geometric the reader. a) ft)

For every for for

8)

e)

for

for

f) for

rj)

for

16

e?

x,

expressed by a use repeatedly

x> -1, x < + 1, > 1 x > 0,

x

>

x

24.

now

are

series.

The

proofs

we

will

16

lities.

i.

e.

to

> + x, 1

,

x

e*

- 1< j^, X

l-\-x> e^~x rn

c*>-p\>

and y z

<

+ 0,

> 0, |*

(P

,

=

>

1.

> (l + M l| < *

**

2,

.

.

.),

^K>

*^+5,

The trigonometrical functions. in

a position to

introduce

the

circular

employing purely arithmetical methods. For pose, we consider the series, everywhere convergent by 92, rigorously,

leave

<**<,

x
for every

We

make

shall

and which are mostly obtained by comparison of the

in the sequel,

114.

are the properties

which we

scries of simple inequalities, of

.

>

',

functions this pur-

2:

do these and the following inequalities reduce to equaOnly for x = The reader should illustrate the meaning of the inequalities on thfe

relative curves.

The trigonometrical

24.

and

-x-

,

S(a)

a* -

3l

-

a*

+

H ----- |.

i

5f

199

functions.

(- iV 1) pTj-.pl)]

--

/

of these series represents a function everywhere continuous and any number of times in succession. The properties of

Each

differentiable

these functions will be established,

taking as starting point their expansions in scries form, and it will be seen finally that they coincide with the functions cos a; and sin a; with which we are familiar from

elementary studies.

We

1.

\_s

Qf J

by 98,

first find,

following values: r9 ~~~

_ _ -- O

Oc-

_ _

_ _

r rill ^ tJ C'" O \s x every (which symbol is

f*u O OC"

,

f+ y

relations valid for

r*

~~~~

v^

OC

~~~*

have the

that their derived functions

3,

j

,

xv/// \^f

)

~~~~

o////

/"*

O

,

_ OC _ Oc

, .

,

for brevity omitted).

th derived functions are seen to coincide with the Since, here, the 4 the same series of values repeats itself, in the same functions, original

from

order,

we

Further, function:

point onwards in the succession of differentiations. see at once that C(x) is an even, and (#) an odd,

that

N

,

C(

x)

= C>-/\ (x)

5o/(

,

\

x)

=

5o/\ (x)

These functions

also, like the exponential function,

dition theorems,

by means

satisfy

simple ad

of which they can then be further examined.

most easily obtained by Taylor 's expansion This gives, for any two values x t and a?a 1). series converge everywhere (absolutely),

They

.

are

note

(cf.

p. 191, foot-

since the two

,

series converges absolutely, we may, by 89, 4, rearrange order we please, in particular we may group together all any those terms for which the derived functions which they contain have

and as it

this

in

the

same

value.

C (x,

(a)

and we

find

17

17

+

ar

a)

--

==

C (*J C (x,) -

quite similarly

S fo

(b)

we

This gives

+

Second proof.

,)

= S (*,) C

By

(*,)

Tr

S (zj S (*,)

+C

;

(

multiplying out and rearranging in series form,

obtain from

C(x )C(xa)-S(xl )S(xa C (xl + x^) as in 91, 3 for the exponential series. Third proof. The derived function of f(x) = - C (xj S (*)f [C (x, + x)-C (x,) C (x) + S (X L ) S (x)]* + [S (x, + x)-S (xj C (x) = Q. at once as be theorem =0. may is, seen, Consequently (by 19, 7), f(x)^f(Q) t

the series

Hence each

)

,

of the square brackets must be separately both the addition theorems.

~ 0,

which

at

once gives

200

The expansions

Chapter VI.

of the so-called elementary functions.

From these theorems, whose form coincides with that of the addition theorems, with which we are already acquainted from an eleit easily follows mentary standpoint, for the functions cos and sin,

C

that our functions

and 5

We

goniometrical formulae.

From

writing x^

(a),

=

also satisfy all the other note, in particular:

x

+

C(*)

(c)

from

and

(a)

we deduce S(*) = 1;

9

and

replacing both x

(b),

x%

so called purely

that, for

every x,

by x:

S(2x)=2C(x)S(x). 2.

On

more troublesome to infer the properties of from the series. This may be done as follows:

little

directly

periodicity

We

a

is

It

have

C (0) =

the other hand, C(2)

< 0;

L C(2^-l---i^\*) 21

24

'

where the expressions

in

41

>

1

.

for

-^

_

n!

and therefore 19,

Theorem

for

positive

<1

-^

+ 4 ~ ~~ C (x)

the function

all

A

Since further, as

values

monotone decreasing

'

'*

'

e

certainly negative.

'

"3"

vanishes at

therefore

may

be again easily

and

x between

of

nl>2,

t

S(x) constantly negative

C'(x)= (strictly)

4,

and 2.

between

is

C (2)

since for

all positive,

+ 1

""

I2l)

Si)

brackets are

A.

2

^)/^o \10!

\6!

there, in this interval

least

By once

verified,

and therefore

2,

C (x)

is

and can only vanish

at

it

follows that

one single point f in that interval. The least positive zero of C(x), shall immeis accordingly a well defined real number. i. e. f, the a that it is to of of a circle see quarter perimeter equal diately

We

and we accordingly

of radius 1

From to

(c),

it

then follows that

be positive between

and

at

once denote

=

S2 f~J

l,

i.

e.

it

18

since

by

:

S (x) was

seen

2, that

= 1.

n is to stand for the moment as a mere abonly subsequently shall we show that this number n has the familiar meaning for the circle.

18 The breviation

situation is thus that

for

2;

The trigonometrical

24.

The formulae

show

(d)

and by a second It

201

functions.

further that

application, that

then finally follows from the addition theorems that, for every x,

c(x \

/

/~ /

U

= -S(x), + ?) z = C M

-f- 71) / '

C(TT~- a;)=

Our two

/ \ (CC) \ /

/^

\

i

(X \

, '

C(*),

functions thus possess

19

the period 2

TT.

therefore only remains to show that the number n, introduced by us in a purely arithmetical way, has the familiar geometrical significance for the circle. Thereby we shall have also established the 3.

It

complete identity of our functions C (x) and S(x) with the functions cos re and sin a; respectively. Let a point P (fig. 3) of the plane of a rectangular coordinate system OXY, be assumed to move in such a manner that, at the time t> its two coordinates are given by

and then

distance

its

=

constantly

meter of a If,

|

OP

by

1,

= Vrc

\

9

The

(c).

circle of radius 1

in particular,

then the point

t

P

y* from the origin of coordinates is point P therefore moves along the peri-f-

and centre O.

increases from

to 2 n,

A

from the point

starts

of

the positive #-axis and describes the perimeter of the circle exactly once, in the mathematically positive (i. e. anticlockwise) sense.

=

to n, x C (t) evident, from -f- 1 to 1, monotonely, and the abscissa of thus assumes each of the values between -f- 1

In fact, as

decreases,

increases from

/

as

is

now

P

and

exactly once.

1,

At the same

Fig. 3.

time,

S(f) remains constantly positive; this therefore implies that P describes the upper half of the circle from A to B steadily, and passes through 19

2

n

is

also a so-called

-^ = n

is

of our functions, i. e. a period, a period. For the formulae (e) show that

primitive period

no (proper) fraction of which

is itself

certainly not a period.

And

a fraction nt

2i

,

with

m>>2,

cannot be

- \ \

(O seen to be positive between

between

and n.

= S(0) = 0,

and 2 and

Similarly for

C (a;),

which

is

in fact, as

2 31

(m

>

1)

impossible since S(a;)

S (n

x)

= S (x)

,

is

cannot be a period.

was

positive

Chapter VI. The expansions of the so-called elementary functions.

202

each of that

points exactly once. The formulae (e) then show further increases from n to 2 n, the lower semi-circle is described

its

when

t

in exactly the

us

first

B

same way from

to

A

.

These considerations provide

with the

= I,

x and y are any two real numbers for which x*-\-y 2 then there exists one and only one number t between (incl.) and

Theorem.

//

(excl.\ for which,

simultaneously, C(t)

=x

S (t)

and

=y

2n

.

next require the length of the path described by P when to a value t Qy the formula of t has increased from 19, Theorem 29 the value for at this, once, gives If

we

In particular, the complete perimeter of the circle

___ / Vt' + 2n

==

2

ST*dt

The connection which we had rations

and the geometry

in

is

SJT

= / dt = 2 n

view

of the circle,

.

between our original consideis

thus completely established:

P=

P

C (t), as abscissa of the point for which the arc A t, coincides with the cosine of that arc, or of the corresponding angle at the centre, and S (t), as ordinate of P, coincides with the sine of that angle. From now on we may

cos t for C(f) and sintf for S(t). from the elementary one chiefly in that the latter introduces the two functions from geometrical considerations, making use naively, as we might say, of measurements of length, angle, arc and area, and from this the expansion of the functions in power series is only reached as the ultimate result. We, on the contrary, started from these series, examined the functions defined by them, and

Our mode

therefore write

of treatment differs

using a concept of length elucidated by the inthe familiar interpretation in terms of the circle. functions cota; and tana; are defined as usual by the ratios

finally established

tegral calculus 4.

The

cota;

=

cos x sin

x

,

tan x

= -cos x sin

re

:

as functions, they therefore represent nothing essentially new. The expansions in power series for these functions are however so few of the coefficients of the expansions could of not simple.

A

course easily be obtained by the process of division described in 105, 4. But this gives us no insight into any relationships. proceed as follows: In 1O5, 5, we became acquainted with the expansion 20

We

20

The expression on

the left hand side

defined in a neighbourhood of in such a neighIn such case 0. we usually make no special mention of the fact that we define the left hand side for x = by the value of the right hand side at the point. is

exclusive of this point; the right hand side is also defined bourhood, but inclusive of 0, and moreover is continuous for

x~

The trigonometrical

24.

1

v

2

"1

=o

Bv

where the Bernoulli's numbers but

is

it

are,

These numbers we may, and accordingly

known 21

1O5,

(cf.

We have

.

x

*

1

B

*

x*

hand side

left

21 is

in

will,

^

...

I

[

function on the

future,

'

however equal jL

_x

2

/

\

"""

'A**

1

xe *+\ _xe _ ~~ ~~

*-!

2

'

/

2

2

+e

to

_-?. 2

_*

*.

e*-e and from

B$

y

B

we

this

see that

are therefore,

7

it is

by 97,

an even function. all

4,

= 0,

*

Bernoulli's

as already seen in

-

numbers J5 3 106, and we x ,

have, using the exponential series for e* and writing for brevity

If

left

nately, both

side,

in

we had

the numerator

y

straight

,

5T

z:

the signs -j- and occurring alterand denominator, we should have prethe function zcotz. Dividing out on the left hand side by the so that only even powers of z occur, may we then deduce z

on the

cisely factor

ST

hand

100.

regard as for every "sufficiently" small x

therefore,

2, 4)

^i^a""" 1 ^ The

not explicitly known,

true,

are easily obtainable by the very lucid recurrence formula

still

entirely

203

functions.

away

that the relation

co t,_

obtained from our equality by alternating the signs throughout, is also valid? Clearly we may. For if, to take the general case, we have for

every sufficiently small

z:

+

same relation holds good when and signs. placed by alternate

the signs throughout are reIn either case, in fact, the coefficients c 2v are obtained, according to 105, 4, from the equations: the

+

c*

+

*>9

fl

+

=

9

^

+c +

Ca 62 +*>4 *=**'> c* &4 > c 2 ,-2 & a H-----h ca &Jv~2 czv

+

As appears from

4 6.J b-2

V

+ c 6 +6 =a =a ... a

4

2v

tf

;

the definition, they are certainly all rational.

a

;

...;

204

The expansions

Chapter VI.

We formula

therefore, as

22

of the so-called elementary functions.

now

presumed,

writing x for

have the

z,

:

^

l

__1l

1

X9

2

4

l

ft

8

""45* ~~945* ""4725* The expansion for tan x is now most simply obtained by means ~~~S

theorem

of the addition

2

2

x sin # = coscosar-smo; ~ cot x

rt

ft

2 cot 2

a;

tana;

:

f

from which we deduce tan

and therefore * 1

16.

/

tan x

v

(a)

=

2 cot 2 3 8

^x

k ~ 1l

2 *(2

l)

(

= x-\ From

= cot x

x

23

*-l)J?,

Jfc

^-^j 2

--a; 8

-I

gg

1? -l

o

M* h

~ ^l

x7

the two expansions, with the help of the formula

+ tan -^2 =

cot

'

we

s

1

-7

sin

#

obtain further

tina? X

.

n

I

I

I

4

A

I

a:

+'" I

4]|

for 1 /cos re will be found on p. 239.) These expansions, at the present point, are still unsatisfactory, as their interval of validity cannot be assigned; we only know that the series have a

(An expansion

positive radius of convergence, not, however, what its value is. 5. From another quite different starting point, Euler obtained an interesting expansion for the cotangent which we proceed to deduce,

especially as

it

is

of great importance for many problems in series 34 . will give us the radius of convergence of the

At the same time, it series 115 and 116

(v.

241).

*2 This and the following expansions are almost all due to Euler and are found in the 9 th and 10 th chapters of his Introductio in analysin infimtorum,

Lausanne 1748. 28

We

B2k

1

has the sign (-1)*" (v. 136), so that the expansion of zcotg, after the initial term 1, has only negative coeffishall afterwards see that

cients, those of

tanx and

x

M The

only positive coefficients.

following considerable simplification of Euler' s method for obtaining the expansion is due to Schrdter (Ableitung der Partialbruch- und Produktentwicklung-en ttir die trigfonometrischen Funktionen. Zeitschrift fUr Math. u. Phys., Vol. 13, p. 254.

1868).

me

Z*.

We

was

have, as

trigonometrical lunctions.

205

shewn,

just

or

a formula in which

we may, on

the right, take either of the signs

Let x be an arbitrary real number distinct from 0,

whose value

remain fixed

will

= -2Xjt

jixcotnx and applying the formula hand side, taking for the

we

in

(*)

(

what

follows.

x ~p-

3i

t

cot

1

yi

,

1,

Then (x

1)

21

cot

-f-

-f-

}

once more to both functions on the right the -f- and for the second, the sign,

first

obtain

nx f

A -~+ l) -f

+ 2)1 jc(x-l)l ^(#~~-^ v ; -f cot J 4 j third similar step gives, for jixcotjtx, the value

n x cot n x

A

.

2, ...,

jix = -j-

f

-

|cot

+ ,

+ cot

3t(x

f

-

[cot

,

+ cot

.

cot

.

+ cot

+ cot m^> + cot ^L^L + cot H*8=^ each pair of terms which occupy symmetrical positions () of the aggregate in the curly brackets give, except for a factor 1, a term of the preceding aggregate, in accordance with the formula (*). If we proceed thus through n stages, we obtain for n 1 since here

relatively to the centre

>

/

\

(f)

Now

^

rco;cot,r3

by

= nx

\

*.

nx

^{cot

2

1

+ ^v-T

f

i

115, lim

,?

M.

COt

n ( x + v)

[

cot z

^2

n (x

v )l

+ COt 2^J "" tan i

^

n& 2^"

=1

2->0

and hence

for

each a

=[=

v

1

,

a

1

if in the above expression we letw*oo and, a^ /*Vs^ tentatively, carry out the limiting process for each term separately, we obtain the ex-

pansion

We

proceed to show that this in general faulty mode of passage to the limit has, however, led in this case to a right result. first note that the series converges absolutely for every

We

x

-\~

1

2,

...,

by 70,

4,

since the absolute values of

its

terms

I

Chapter VI. The expansions of the so-called elementary functfons.

206

are asymptotically equal to those of the series JJ-^

>

Now

.

choose an

6 x , to be kept provisionally fixed. If n is so arbitrary integer k ~ that the number 2n 1 1, which we will denote for short by m, large 35 is : k, we then split up the expression (f) for nxcotx, as follows |

\

>

71X

(

^-

J

have of course to insert the (In the square brackets we The two parts of this expression as occurs in (f).)

An

and

to

the

Bn

Since

.

An

term by term

limit

number

consists of a finite is

same expression

we

denote by

of terms, the passage

certainly allowed there,

by 41,

9,

and

we have

= 1 + 2 x* JS-r^-T-. -*

lim A M n ->.

Bn

Also

is

its

An

nx coinx

precisely

Let r k denote

r^i*

as

depending

value,

it

f

J

hence lim

,

Bn

certainly

exists.

does upon the chosen value

ft;

thus

limB n Bounds above

= r = n x cot n x

1

k

for the

*

r L

numbers

Bn

,

+

2 x*

i

~i v=l X

for their limit r k

the difference on the right hand side,

may now

i

~~ V " J

and so

finally for

quite easily be esti-

mated:

We

have * /

cot (a

+ b) + cot (a-b) = i

IA

M.

i

t\

/

-

-

2 cot a

.

ff

sin* a

and hence --.^(z

2 cot a

v)

*

writing for the

As

2

n

> > ft

|,

|

we

certainly

have

for short.

9

=

a |

|

itx

<

1

and so

26

I

Since, further,

86 Cf.

86

6 a

^ = a and ^ = B

=

sm a I

moment

< <

Footnote

87 Cf.

p. 200.

< 2,

we have

27

7, p. 194.

For the sake of

rough form.

"~

ft

later applications

we make

these estimates in the above

The trigonometrical

24.

Hence

sin

ft

sin

a

61*1

> >

the latter, because r

207

functions.

ft

6

cc

It

. |

> k)

therefore follows that (for v cot-

36 x-

-1

and hence 72 **

The

factor outside the sign of

nx

<

certainly

for

3;

summation

< 1,

was

quite roughly estimated

is

and

for

\

<1

we have

=

2 cot 2 1

1

z |

_ 31

5!

Accordingly, 1

But

this is

a number quite independent of w, so that we

may

also

write

But the bound above which we have thus obtained

for r k is equal Hence the k ih term, of a convergent series 28 If we refer back to the meaning of r k we see that

to the remainder, after

rk

as

-~>

k ->

+

oo.

.

,

this implies

lim

77

x cot

{

77

x

-

+

[l

2 x2

2^

l

_

J

r- 0, }

or, as asserted,

a formula

We

which

is

thus proved valid for every x

^ 0, +

1,

2,

.

.

.

.

but one make important applications (p. 236 seqq.) of this most remarkable expansion in partial fractions, as it is called, of the function cot. We can of course easily deduce many further 6.

shall in the next chapter

such expressions from

1

V-

The convergence

it;

is

we make

note of the following:

obtained just as simply

as, previously, that

of the series

208

The expansions

Chapter VI.

of the so-called elementary functions.

The formula 2^cotjra;

rccot^ first

29

of all gives

tan

fft

%

ass,

>t

= jrtan~

.~

2

=2

r9

^

# -r

n 2 __/**

v _L

_J

>V_J )-*

rlToM 2 "*

:t -i- 1

(2 v

1

~t~ j-

3

+ j.

, >

5*

.

<

\

+ l)+*/'

The formula 2

then gives further, for a;=j=0,

=x

^7T sin

--

jt

x

if

Finally

9 *

1

we

sin *

2, ...

1,

x

9 'V* r *'

'Y*

I '

.

I

i

^

^

o^

here replace x by

3-2*7

..

*

re,

\

\3

we deduce

+ 2a;

5

-2W

'

Supplementary theorem, the brackets may heie be then take the terms together again in pairs, starting from the beginning, we obtain, o> S> provided x ={= |,

By 83,

But

omitted.

2, if

we

COSTTA:

With these expansions in and 4-andJ sm c< cos -r-

,

we

partial fractions

for

the functions cot, tan,

will terminate our discussion of the trigonometrical

functions.

25.

We

The binomial

have already, in

positive integral exponents,

remains unaltered in the case then to stipulate

x |

|

series.

22, seen that the binomial written in the form

theorem

for

if

30

of a negative integral k. But we have now show that with this restriction

< 1. We will

99 The formula first follows only for x =)= 0, 2, ... but can then 1, be verified without any difficulty for o? = 0, 4, .... 2, (The series has the sum 0, as is most easily seen from the second expression, for an even

integral x.) 80 In the former case the series is

actually so.

is infinite

only in form, in the latter

it

25.

theorem holds

the

31

The binomial

even for any

real

209

series.

exponent

e.

i.

a,

, (a any real, number.

As

in the

preceding cases,

we

will

start

represents the function in question 1 The convergence of the series for x

that

from the

series

and shew

it

[

<

\

may be

for the absolute value of the ratio of the (n

+

and therefore

at

th

once established; nth term is

to the

l)

>|a;|,

which by 76, 2 proves that the exact radius of convergence of the It is not quite so easy to see that binomial series is 1. value of (1 -|- #) a If of course positive equal to the

sum is we denote

its

provisionally by fa (x) the function represented by the series for the proof may be carried out as follows.

a Since

57

(

\n

the value of a,

every \x\

<

\x

n

converges absolutely for x

/

it

follows,

by 91, Rem.

1,

I

I

'

l

<

whatever

1,

that for

x |

\

<

1,

may be

any a and ^, and

we have

1,

Now as

may 81

be verified

easily

quite

The symbol

a is

f J

e.

g.

33 by induction

.

Hence

for

defined for an arbitrary real a and integral n j>

by the two conventions

(:)and for every real a and every n once be verified by calculation.

14

For

this,

>

1

,

it

satisfies the relation,

which may

at

give the statement, by multiplying by n\, the form

FZ ~l7^(-^ Then multiply each of the (n -f 1) terms on the left hand side ponding: term of or,

(a-

1),

.

..,

(a-),

...,

first

by the corres-

(a-w),

then by the corresponding term of

0?-n), (/J-M + 1), ..., (fi-n + k) ..... f and add, so that in all we multiply by (-f /? n)\ grouping together the similar terms on the left, we obtain precisely the asserted equality, where n is replaced The above formula is usually called the addition theorem for the by w-j-1. binomial coefficients.

Chapter VI. The expansions of the so-called elementary functions.

210

x

fixed

|

|

<

1,

we

have, for any a and fa'fp

= A+0-

f! 9

By precisely the same method as we used to deduce from the theorem of the exponential function, E (xj E (x } E(x that for every real x we had (E (x) so we could (E (I)/,

=

conclude that for every a, /-

we knew here

=

(/;)",

also that fa was As f1 continuous function of a.

if

fa

t2

for

every real

= l-{-x, - (1 + *)

would then be established generally

cc (with fixed x) a the equality

for the stated values of x.

The proof

of the continuity results quite simply from the rearrangement theorem 9O If we write the series for fa in the :

main more

form

explicit

/L

(a)

_1+

+ (^_)^ + (^_^ + |.) - +

,

a

and then replace each term by

absolute value,

its

we

...

obtain the series

We

x
e.

i.

x |

|

\

=i

fa

(b)

|

a power series in cc. Since this converges, by the manner in which

<1

for fixed x in was obtained, for

still

certainly

it

we have an everywhere convergent power

series in a, hence of a function cc. continuous certainly This completes the proof 33 of the validity of the expansion 119 and at the same time fills the gap left in the proof of the reversion theorem

every

cc>

21. 83

An

alternative proof, perhaps

easier than the above, but using- the

still

00

differential

calculus, is as follows:

Since however (" +

1)

(

+ j)

From fa (x) =

=

'

("

KM

/'-!

But

(1+ *) /a-!

(*)

=

(1

U

+ *)

'

/#\

xn

it

follows that

) n=0 vw/ {

follows further that

)

=

J

<*)

The

26.

The

binomial series provides,

one hand,

may be

tf

Then we may write

a c

like the exponential series,

Choose a

of the general power a?:

211

logarithmic series.

(positive)

number

an expansion

c for which,

< - < 2.

regarded as known, and on the other,

=1+

x with

<

x |

\

1

and so obtain,

on the

as the required

expansion,

* = *(!+*)* = Thus

+

X

e. g.

=5L is

l

T*

~~

1

~~~ 1

\

/ 60

"f~

\ 2 )

50-'

a convenient expansion of V2. The discovery of the binomial series

^ \ 3 / 50*

by Newton

M

'

* *

J

forms one of the

Later Abel 35 development of mathematical science. which a made this series the subject of researches represent perhaps equally important landmark in the development of the theory of scries (cf. below

landmarks in the

170,

1

and 247).

26. As

The

logarithmic series.

already observed on pp. 58 and 83, in theoretical investigations

convenient to employ exclusively the so-called natural logarithms, In the sequel, log* shall therefore that is to say, those with the base e. it

is

always stand for log e x (x If

y = log x,

By the theorem thus, for every

|

x

then x

for the reversion of

\

<

1,

we have (1

Since (1

+

x)*

>

> 0). = ev or

0, this

power

series (107),

y

= log x

is

there-

the equation

+ *)/'<*)-/.<*) =

<>.

shows that the quotient

has everywhere the differential coefficient 0, i. e. is identically equal to one and the the value is at once calculated and same constant. For x ~ thus the -|- 1 assertion /a (x) = (1 + jc) a is proved afresh. 34 Letter to Oldenburg, 13 June 1676. Newton at that time possessed no proof of the formula; the first proof was found in 1774 by Euler. 86 J. f. d. reine u. angew. Math., Vol. 1, p. 311, 1826.

=

;

212

The

Chapter VI.

powers of (x

fore expansible in

+

to

1,

or y

=

expansions of the so-called elementary functions. 1)

for

values of x sufficiently near

all

log (1 + x) in powers of x, for every sufficiently small x* + a* + y - log (1 + *) = * + ft

ft,

The

coefficients b n

actually be evaluated

may

provided the working

is

36 skilfully set out

For For x

convenient methods: section suffice.

\

|

there examined

But

.

.

3

.

.

x

: \

|

.

by the process indicated, advisable to seek

it is

more

developments of the preceding and arbitrary a, the function /a /a

this purpose, the


=

(x)

is

Using, for the left hand side, the expression (b) of the former paragraph for the right hand side, the exponential series, we obtain the two

and

power

series

everywhere convergent:

=1+ By

[log (!

+ *)]<*+...

.

the identity theorem for power series 97, the coefficients of corre37 and Thus, in particular ,

sponding powers of a must here coincide. for every

120.

log (1

(a)

<

x |

\

+

1

x)

-x-f+f- +

teriori^

cannot hold for

as

called,

obtain,

By

addition

There

4

.

-^P *+...

the desired expansion, which, .

\

|

we

.

we also see a posIf we replace in this logarithmic series, x > 1 x and change the signs on both sides of the equality, x by for every x < 1, equally

Thus we have obtained it is

( .

|

we deduce,

\

again for every

are of course various other

x |

\

<

1

,

ways of obtaining these expansions;

but they either do not follow so immediately from the definition of the

make more

log as inverse function of the exponential function, or use of the differential and integral calculus 38

extensive

.

1.

36

Herm. Schmidt, Jahresber.

87

Cf. the historical remarks in 69, 8. may indicate the following two ways: know from the reversion theorem that we

Deutsch. Math. Ver., Vol. 48, p. 56. 1938.

88 We We

log (1 H- x) it

d.

follows

from Taylor's

series

=

1

99

=

x

+

62

*a

+

may

write

6 3 x 3 -f

. . .

;

that

(& log (1 +

1

^(-l)*-

x)\ -Q

k

The cyclometrical

27.

213

functions.

Our mode of obtaining the logarithmic series do not enable us modes mentioned in the footnote

the two determine 1 or x 1.

=

also to

=

whether the representation remains valid for x -fSince however 120a reduces, for x 1> to tne convergent series

=+

81 c,

(v.

3)

the value of this series,

=

by Abel's theorem

+ #) = log2.

lim Iog(l

jc-yl

of limits, is

.0

=

-= Our representation (a) there remains valid for x -f- 1; but for x it certainly no longer holds, as the series is then divergent.

27.

The cyclometrical functions.

Since the trigonometrical functions sin and tan are expansible in power series in which the first power of the variable has the coeffidifferent from 0, this is also true of their inverses, the so1 and tan" 1 . have therefore to called cyclometrical functions sin" x , write, for every sufficiently small

cient 1,

We

y y

= sin" = tan"

|

\

x == x -f* x x

*

&3

= +&

+& # + ---x* + 6 5

or* '

3

*

5

f

a;

5

5

-|

where we have left out the even powers at once, since our functions are odd. Here too it would be tedious to seek to evaluate the coefficients f b and b by the general process ot 107. We again choose more convenient methods: The series for tan"" 1 a; is the inverse of v y

,

.

(a) ^ /

- --

_?? 4.^-4....

siny = --x = tan ^ y = cos cosy

,

31"*" 5!

; *

;,

or of the series obtained

-J-,

"*"

, '

by 1O5, 4

division in the last quotient.

denominator, were

1

then

after carrying out the process of here all the signs, in numerator and we should be concerned with reversing If

the function

2

=

.

T

=l-* +

*^ It

Integrating,

it

follows at once, by

O

r

theorem

since log

5,

The method in the text is so far simpler that the use of the differential and integral calculus. 8

it

1=0,

that

proceeds entirely without (051)

214

The

Chapter VI.

But the inverse of

By for

expansions of the so-called elementary functions. function

this

we immediately

as

is,

find,

the general remark at the end of 21, the reverse series of the series x tanjy actually before us is obtained from the series last written

=

down by

39

alternating the signs

tm~l x

121. If therefore this

power

i.

again,

= *-

series,

e.

+ ?-+

.

which obviously has the radius of conver-

gence 1, is substituted for y in the quotient on the right of (a), and this is then rearranged, as is certainly allowed, we obtain the terminating series x.

Hence

= x,

is

<

sum

for an arbitrary given x 1 is a solution the so-called value of the function precisely principal tan" 1 x hereby defined, i. e. the value which is for x and then Hence for varies continuously with x. it satisfies the !,

power

of tan y

its

\

and

\

=

=

!<#< +

condition

defined, in the interior of this interval, without any ambiguity. For \x\ >1 the expansion obtained is certainly no longer valid; 1. but Abel's theorem of limits shews that it does still hold for x For the series remains convergent at both endpoints of the interval of 1 We have convergence and tan" x is continuous at both these points. therefore in particular the series, peculiarly remarkable for clearness and

and

is

simplicity: A

_

4

3^5

_ 7

T-

_

same time a first means of determining TT of some practical This beautiful equation is usually named after Leibniz w it may be said to reduce the treatment of the number IT to pure arithmetic. It

giving at the value.

is

as

\

if,

89

A

which hung over that strange number

this expansion, the veil

by

had been drawn

aside.

different

d tan" 1 x

method

is

the following:

_

1

1

__

We

have

1

_,

~d*~- ?^~r+i^;~i-f * dy the latter for

|

x

\

<

1.

As tan" 1 tan' 1

A

method corresponding

=

0, it

follows

2

*2

+* r

by 99, theorem

4

i

*

5, that for

|

x

\

<

1,

*-*- x*3 +-5 -+

to that given first in the preceding footnote is some1 as the differential coefficients of higher order of tan" x

what more troublesome here,

The expansion of are not easy to find directly. even at the single point tan" 1 x was found in 1671 by J. Gregory, but did not become known till 1712. 40 He probably discovered it in 1673 from geometrical considerations and without reference to the inverse tan-series.

Exercises on Chapter VI. series for sin"" 1

For the deduction of a have just used for tan"" 1 a; the last footnote,

in

x

for

not

is

a;,

available.

215 method which we

the

The process

indicated

We

however, provides the desired series:

have

<1 dx

cosy

/d*>iny\

_x

9

i/l

(~dJ

the positive sign being given to the radical since the derived function 1 1 From of sin" a; is constantly positive in the interval -f- 1. .

.

(sin-' *)' it

at

=1(-')

.

+ (-) * - +

**

once follows, however, by 99, theorem x 1

5,

= 0,

as sin~ A

that

<

for

l

sin

1 cc

3

1-3

a?

5

1-3-5

2 T + 53TT + 2T*

x

.

,

This power series also has radius 1, and on quite similar grounds to 1 its sum is the principal value the above we conclude that for x |

|

of sin" sin

y

1

e.

that

which

lies

a;,

=x

i.

#=

uniquely

<

determined

between

-^

+

and

y of the equation

solution TT

the equality is not yet secured. By Abel's theorem of limits it will hold there if, and only if, the series converges there. As we have a mere change of sign in passing from -}- x to x, this

For

1,

There we have a series of poonly needs testing for the point -f- 1 sitive tcims and it suffices to show that its partial sums are bounded. .

Now

for

<x<

1,

if

we

s n (x)

And

<

denote by sin"

1

a;

< sin~

1

l

this

holds for every n,

of

123,

also

have

= -|. x

as this holds (with fixed n) for every positive

and as

sums

the partial

s n (x)

<

1,

we have proved what we

we

required.

i-l + + ld.i5^2-4-6 + LM.i-J-... 2 ~2i.i3~2-4

Thus

'

'

7

22 to 27 have thus put us in possession of which are most important for applications.

all

the

power

series

Exercises on Chapter VI. 74. Show that the expansions in power have the form indicated in each case: a)

xn

tf^sina^

with

s

n=o n!

l

,^(-l)*-

bk

= V^"

-~

scries of the

sin n

with

T

bk

*

e

-

following functions

5

U=

=l + ~ + l

,

Chapter VI. The expansions of the so-called elementary functions.

216 c)

-tan-^-lo

d)

~tan-i o:.

)

i

r

2

L

log-

115=

-

4*

^ = 1+3

with

+2

w ;.u

,._i

j

*

* .

.

.

+.

<j

il 3= an

1

yT c .,g

7

/*

JS,

n==2

~1 n_ n

a;

w ,

with the same meaning- of h n as in

d).

75. Show that the expansions in power series of the following functions begin with the terms indicated: x Io

__

x

c)

a:

3

*ri; x +*+.

b)

y?

1

..+!! m

=

tan (sms)-sm(tana;)

=

2

(I-*)/

~

a;

,

1

1

7

gga;

+

29

7

.11

,

76. Deduce, with reference to 1O5, power series of the following functions a) x

log cos x

'

cos x

1

5,

;

d) -;

f

&

We

decreasing?

;

x ;

cos x

'

x '

e^+1

78.

the expansions in

1

2 sin

77. Show

959

x

X

'

A

115 and 116,

log

b) _.

;

2447

.

;

tana;

,

c) log

H

^a;

that, for

a

0,

--

have (^

What,

=t=

Is the

-^}

in this respect, is the

(n-i)-*', 70. From x n -* f

it

sin*

4, ...

2,

*>e.

cosx

sequence monotone?

Increasing or

behaviour of the sequences

o< a
invariably follows that

?

Exercises on Chapter VI.

and also,

8O.

--

Cx 1

xn and

if

If

are positive, that

an arbitrary real sequence, for which

is

(#)

217

x * and we write n ->0,

n

\

=y n

-J

,

then, in every case,

81. Prove the inequalities of 114.

8S. Express the sums of the following series by closed expressions in terms of the elementary functions: ,

aj

x

1

2" f "5

x*

x*

+ T + ll + ""* be the required function, then obviously

(Hint: If f(x)

=

(**./>)/

whence f(x) may be determined. ~3 x

M

'

_

_r__ ?

4.

3.5^5.7

1-3

X

1

C)

~5 x

1.2.3

+ 2-3

_ ~9

1

.

.

.

7-9" X*

4

Similarly in the following examples.)

_

" 4. 1

1-^

+ S'^S 4

"

""

;

83. Obtain the sums of the following series as particular values of mentary functions:

.

"2

C)

dN ^

I+ _u 2

.

2^4 1<3

"

2 4-6

+2 .

2 4

1

1>8

2

2 4 6

-

l

'

2 4-6-8

_iL5 i7__

4-6-8 10

3 5 7

.

3-5-7 9

1

84. Deduce from the expansion

-- ~ f

where a=t=0,

l,i,

ij,...

_

!

2

AO

v

. '

H

in partial fractions

l

Vl

-

117 seq. the following

-

-

l

-I

n

2 4-6 8~l6-l2""u

8 10

expressions for n:

'

: :. :^__ + 4. + 2^Ji 4 6-8.10.12.14

1-3 5-7

+ 2- 4-6

_ ~

"

ele-

[

2T-! + 2 aV"T

Substitute in particular

+ ~ ~ + + a -

3, 4, 6.

218

Chapter VII.

Infinite products.

VII.

Chapter

Infinite products.

28.

An

infinite

Products with positive terms.

product

by 11, II, to be taken merely as representing a new symbol for the sequence of the partial products

is,

2

*/!

Accordingly such an

U

value

.

.

un

.

.

product should be called convergent, with

infinite

oo

y

U

as limit. the sequence of the partial products tends to the number this is particularly inconvenient, owing to the fact that then every product would have to be called convergent for which a single factor was if

But

= 0.

For

u m were

if

U=

tend to

larly every

0,

0, since its

then the sequence of partial products also would terms would all be equal to for n m. Simi-

^

product would be convergent

m

which from some

an

infinite

product by

that of the

we do

not describe the behaviour

sequence of

its

adopt the following more suitable definition, account the peculiar part played by the number

but

The

o Definition.

125.

for

onwards

In order to exclude these trivial cases, of

again with the value

partial

products,

which takes

into

in multiplication:

infinite product CO

*

L

n=i

n

= U^

Uq

'

Uft

.

if from some point no factor vanishes, and if the partial products, beginning immediately beyond this point

will

be

convergent (in say for every n

called

onwards

tend,

as

// this

be

n

increases,

=

f/ w

,

a

to

then the

the

stricter sense)

>m ~

limit,

finite

and different from

0.

number u l .u.>-....u m -V m ,

U=

obviously independent of m, is regarded as the value of the product*. 1 Infinite

who gives

products are

the product

first

found in F. Vieta (Opera, Leyden 1646,

p. 400)

28.

We

then have

o Theorem 1. if, one of

and only

As

further

Products with positive terms.

as for

first,

A

products, the

finite

convergent

infinite

=

is

its factors

uW

has the value

-product

if,

.

+Um>

p n -i~-+U m with pn

have (by 41,11)

219

= -*i

and as

Um

is

4= 0,

we

*1

Pn-l

and we have the o Theorem 2. The sequence of the factors in a convergent infinite >1. product always tends On this account, it will be more convenient to denote the factors 1 -f- a n , so that the products considered have the form by u n

=

+

// (!

n=i

For

the condition a n

these,

vergence.

The numbers

an

>

is

as the

)

then a necessary condition for conessential parts of the factors

most

be called the terms of the product. If they are all ^> 0, then case of infinite series, we speak of products with positive will first concern ourselves with these. We terms. will

as in the

The

question of convergence

Theorem convergent

if,

^

A

is

product 77 (1

and only

The

Proof. an

3.

if,

partial

answered here by the

entirely

-f-

an)

with

a n converges.

products

=

pn hence the

increase monotonely;

(1 -J-

)-

t

main

First

an

terms

positive

the series

+

# n )> (1 criterion

is

since

(46)

is

and we only have to show that the partial products p n are ---bounded if, and only if, the partial sums s n at # are ~l bounded. Now by 114 a, 1 -f- av <[ e a and so for each n

available

=

+

+

>

>"

pn

^e'>

on the other hand

the latter because in the product, after expansion, we have, besides the of s n , many others, but all non-negative ones, occurring. Thus for each n

terms

(cf

Ex.89) and

in /.

Walhs (Opera

I,

Oxford 1695,

p.

468)

who

in

1656 gives

the product -

~2~~~T'T' ~3~

5

5

7

first secured a footing- in mathematics through Enter, who of important expansions in infinite product form. The first criteria of convergence are due to Cauchy.

But

infinite

products

established a

number

220

Chapter VII.

Infinite products.

bounded when

The former

inequality shows that pn remains conversely, that s n remains bounded 9 proves the statement.

the

when p n

latter,

s n does,

which

does,

Examples. As we are already acquainted with a number of examples of convergent series 2 a n with positive terms, we may obtain, by theorem 3, as many 1.

examples of convergent products 77" (l is

more

2.

convergent for

is

+~)

We

J7(l+0n ).

> 1,

a.

may

mention:

easily recognised here than in the corresponding series

H(l+x n) m i

^

3 ,

latter

for

similarly

00

0*

Q.

0<#<1;

convergent for

is

The

divergent for a <J 1.

__

I

I

.

W

\

(W

-{~

I i

g=s

-

rs

-*--M.

I)/

With theorem 3 we may

.

Q

j)

fi foi ~|

once couple the following very

at

similar

Theorem

for every n, a n

^ 0,

then the product //(I fl w) a convergent if, if, n Converges. Proof. If an does not tend to 0, both the series and the product certainly diverge. But if a n * 0, then from some point onwards,

also

4.

//,

2

and only

is

<

We consider an m, we have an say for every n ^. \, or 1 the series and product from this point onwards only. Now if the product converges, then the monotone decreasing

>

>

=

O

a <m + i)*"(l sequence of its partial products p n (1 a positive (> 0) number U m and, for every n m,

>

,

Since, for

(as is at


we always have

1,

once seen by multiplying \

in

'

tends to

T*

I/

V

i

we

up),

WIT 2'

certainly n/

V

have

^J

9

In the first part of the proof of this elementary theorem, can avoid this as follows: transcendental exponential function. so that for every n converges, choose

We

we

use the

If

>m

m

<*

m+i

,

-f

am + 8 H

h an

,

,

<

.

1

---

.

As, obviously, for these w's, we now have (1 -f a +1 )--- (l-f-a)
we

K

M+

+i

+

-

certainly have, for all w's,

hence 8

(/>) is bounded. In this we have therefore,

divergence of

5]

.

on account of theorem

3,

a

new

proof of the

Accordingly the convergence of the product 77(1

2 an

221

Absolute convergence.

Products with arbitrary terms.

29.

-f-

a n ], and hence of

a n ). from that of 77(1 If, conversely, 2 an converges, then so does S 2 an and consequently by Theorem 3 the 2 a n ) also does. Hence, with a suitable choice of K, the product 77 (1 2 a n ) remain < K. If we now use the fact 2 a m+1 ) (1 (1 products

the series

results

,

,

+

+

.

.

^a ^

that, for

v

.

+

,

1

as

-a ^ r+ 2 v

again be seen by multiplying

may

we

up

infer

and the partial products on the left hand side, as they form a tone decreasing sequence, therefore tend to a positive limit: i. product 77(1


n)

is

monoe.

the

convergent.

Remarks and Examples.

126

00

//

!

.-=.

I

1

)

is

convergent for a

"'

l

>

1

,

divergent for

a< 1.

a n ) is not convergent, with 2. If a n < 1 and if 27 a n diverges, then II (I our definition. As however the partial products p n decrease monotonely and remain > 0, they have a limit, but one which is necessarily = 0. We say that the product thus involves us in The exceptional part played by the number diverges to 0. slight incongruity of expression. A product is called divergent whose partial products form a decidedly convergent sequence, namely a null sequence, (p n ). The addition "in the stricter sense" to the word "convergent" in Def. 125 is intended to serve as a reminder of this fact.

some

3.

That

e. g.

JJ M

-J

diverges to

is

again very easily seen from

n=2

29.

Jf

Products with arbitrary terms, Absolute convergence.

4

the terms a n of a product have arbitrary signs, then the following corresponding to the second principal criterion 81 for

theorem series

holds:

o Theorem

5.

The infinite product 77(l

+a

n)

converges

if,

and

A lull and systematic account of the theory of convergence of infinite products may be found in A. Pringsheim: t)ber die Konvergenz unendlicher Produkte, Math. Annalen, Vol.33, p. 119 154, 1889. 4

222

Chapter VII. Infinite products.

only

and

> 0,

given e every k ^> 1, if,

[(1

Proof, wards,

say

+

a) for

we can determine

+

. + 1 )(l

If

.+.)

(!

5

+

the product converges,

> m,

n

every

we have

n Q so that for every n

.+

*)

then an

~

>n

<*

1]

from some point on-

={=

and the

1,

partial

products

tend to a limit 4= 0. Hence there exists (v. 41, 3) a positive number /f 0. such that, for every n By the second principal m, \p n /? criterion 49 we may now, given e 0, determine w so that for n and every k ^> 1, every n

>

\

^ > >

>

ln +fc But then,

which

for the

same n and

-M<

e '/*-

&,

precisely what we asserted. if the e- condition of the

is

theorem

b) Conversely,

choose

= |,

e

For these

n's

m

and determine

so that, for every

is

fulfilled,

>m

n

first

t

we then have

>

m, we must have l-f-a w =j=0; and further, every n tends limit at all, this certainly cannot be 0. a to But pn 0, choose the number n so that for everv may now, given e n Q and every k ^> 1, that, for

showing that if

we n

>

>

":

_1

Pn

or

And

this

shows

that

pn

really has

a unique

gence of the product is established. As in the case of infinite series,

so

Thus

limit.

the

conver-

similarly in that of infinite

products, those are the most easily dealt with which converge "absolutely". By this we do not mean products IT u n for which H\u n such a definition would be valueless, since then also converges, \

every convergent product would also be absolutely convergent, we define, on the contrary, as follows:

o Definition. The product 77(1

127.

vergent 6

or

if

Or v.

the product 77(l v.

+ |an

81, 2nd form a n + 1) (1 f (1 +

81, 3 rd form

if

[(1

+

if

-f

|)

+a

n ) is

said to be absolutely con-

converges.

invariably

* + *)

.

(1

+ a n 4.^)] _

invariably

+!)

but

..(H- ,+*)] -*1.

!

.

223

Products with arbitrary terms. Absolute convergence.

29.

This definition only gains significance through the theorem: o Theorem 6. The convergence of 17(1 -f- an ) involves that of |

+ O-

We

Proof. I

(1

+

|

have invariably + ,)(!

+

.(1

+,)

+ +)-!!

once verified by multiplying out. If therefore the necessary convergence of Theorem 5 is satisfied it is a n ), q. e. d. a by 77(1 -|- n \), ipso facto satisfied by 77(1 In consequence of Theorem 3, we may therefore at once state

as

at

is

and

sufficient condition for the

+

|

o Theorem

A

7.

77(1

product

+ an

is

)

absolutely convergent

if,

an converges absolutely. if, As we have an already sufficiently developed theory for the determination of the absolute convergence of a series, Theorem 7 solves the problem of convergence in a satisfactory manner for absolutely convergent products. In all other cases, the following theorem reduces

and only

the

problem ing one for

cf

convergence of products completely

the correspond-

to

series:

Theorem

The product 77(1

8.

the series

2

O

-f-

^

+

log (!

converges

if,

and only

if

)

n=w-i-l

suitable index*, converges. And the convergence of and only if, that of the series is so. if,

commencing with a the

product Furthermore,

is if

absolute

L

is

the

sum

of the series, then

n=L 77(1 -f- a n ) converges, then a n >0 and hence from 1. m, we have a n Since, point onwards, say for every n further, the partial products

Proof,

a)

If

>

some

= (!+

tend to a limit

But log/> n in

As

question. e L,

U b)

the

is

If,

Um

+ i^

+

(!

(hence positive),

4=

This, therefore, we thus have

then

converges

the series

we have

is

known

precisely

to

<

(n

)>

we have by th

the partial sum, ending with the

conversely,

sum L,

,

\

|

the

(42,

>

}>

2),

term, of the series

sum L

= log Um

and to have >L, and consequently

to converge,

log p n

(by 42, 1)

This completes the proof of the e It

suffices to

choose

m

first

.

part of the theorem, since

so that for every n ;>

m

we have

|

am


\

<

1

.

224

Infinite products.

Chapter VII.

To

deduce,

that

finally,

the

and product

series

>*

any terms a n which

(Here

a+

=

every with

we use

,

I

)

in

are,

possible case, either both or neither absolutely convergent, theorem 7 and 70, 4, the fact that (112, b), when an ->0

may be simply

from con-

omitted

sideration.)

Although we have thus completely reduced the problem of the convergence of infinite products to that of infinite series, yet the result cannot entirely satisfy us, because of the difficulties usually involved in the practical determination of the convergence of a series an ). The want here felt may, at least partially, of the form J^log (1

+

be supplied by the following

Theorem 9. The a n ) and with it

JHog

2 an

if

series (starting with a suitable initial index) the product 77(1 -j- a n ), is certainly convergent,

(1 -j-

converges and

Proof.

We

choose

+ an

and consider 77(1 terms.

If

we

7

2a^ is m so that

absolutely convergent

if

)

and

for every

2 log (1

-|-

n

aj,

~>

.

m, we have \a n

starting with the

(m

\

< ~,

+

h l)*

write

then the numbers #M so determined certainly form a bounded sequence, If therefore for 8 as a n ->0, ft n ~> a n and J?|0 n a are conJ.

2

,

+

|

and hence also 77(l-|-a n ), is convergent. vergent, J?log(l n ), This simple theorem leads easily to the following further theorem for

fl

Theorem 10. If2a^ is absolutely convergent, and eveiy n > m, then the partial products

=

n

J[ (1 v=wfl

pn

+ 0J

and

are so related that i. e.

sums

the partial

sn

=

\a n

is \

<

1

n

av

v=m-H

(n

> m)

}

p n s^, e*n

the ratio of the two sides of this relation tends to a definite limit,

finite

and

=f=

whether or no

0>

2a n

converges.

We

7 J*fl rt 2 if convergent at all, is certainly absolutely convergent. adopt the above wording so that the theorem may remain true for complex a n 's, 2 is not necessarily ;> for which n (cf. 57). ,

8

For

<

|

x

|

<

1

we have

or

log(l

+ i>

)

in fact

-* _ "

"

_

1

Y+

x

3"~

h

"*

those terms which are possibly = may be again simply neglected, as they have no influence on the question under consideration.

And

Proof.

+

log (1

+

(l

the

if

sums

=n

v

to

If

-|-

m+1 )

-(!

we have

then, as

of the preceding proof,

the notation

$'&,

>m

n

for every

+ )=vm+l A

=m

two exponents are taken also from v

in the last

225

-f- 1

.

And

as

-0 na

when

we adopt

= an

a n]

Absolute convergence.

Products with arbitrary terms.

29.

2$n a^, does

so,

the result stated.

$n 's being bounded, converges absolutely can, from the above equation, at once infer This theorem also provides the following, often the

we

useful * Supplementary theorem. // 2a n converges absolutely, then and /7(1 -f- an ) converge and diverge together.

2a n

Remarks and examples.

128.

1. The conditions of Theorem 9 are only sufficient', the product 77(1 + n ) a n converging. But in that case, by Theorem 10, converge, without

2

may v a

la

I

must also diverge.

2. If

we

/

apply theorem 10 to the (divergent) product 7/1 v

n=i

follows that

if

sum

harmonic series A n

of the

-= h e n

Accordingly the limits lim

c

1 \ ')

,

then

it

^n

h

e n

h n denotes the w 01 partial

H--n

and lim

log n]

[h n

=

l-|

---h 2

= log c = C

--

H

exist,

-

n the

>

0. The number C defined by the second limit is because c ^= 0, hence called Ruler's or Mascherom's constant. Its numerical value is C = 0-577 215 6649 . .

latter

.

Ex. 86 a, 176, 1 and 64, B, 4). The latter result gives us further valuable information as to the degree of divergence of the harmonic series, as it gives (cf.

hn

^

made

Further the estimates of bounds above

even more precisely,

if

we

there put

log n

.

for the proot of

ay =

that

,

hn

or

Theorem 3 show,

>A

J|

_1

> log n

so that Euler's constant cannot be negative. /

/

QO

3-

7/

U+

-n-i -

\

"

n

)

*

s

' n=i X found at once by forming the 00 / x\ -4.

tO/

]l i.

e.

(

H[l-i n/J v

H

y,\ --

(v.

40,

1

^

v

convergent.

Its

value may, as

partial products, and is

diverges for x

={=

0.

However,

=

1

it

happens, be

.

theorem 10 shows that

M n

' ,

*J

def.

5) the ratio

or

what

is

the

same thing by

2,

^^

n*,

226

Chapter VII.

has, for every (fixed) different

from /

oo

5.

II n=l

if

,

when M-KX>, a taken

determinate (finite) limit

2, ... (cf. below,

1,

=j=

219,

which

is

also

4).

\

3.3

-1

1

I

a;

is

a;

Infinite products.

w

V

absolutely convergent for every x.

is

'

Connection between series and products. Conditional and unconditional convergence.

30.

2

We have more than once observed that an infinite series a n is merely another symbol for the sequence (sj of its partial sums. Apart from the fact that we have to take into account the exceptional part in multiplication, the corresponding remark holds for infinite products. It follows that, with this reservation, every series may be written as a product and every product as a series.

played by the value

good

As 129.

regards 1.

If

ZT(l

~t"

has to be done as follows

this

detail,

a n)

&i ven >

*s

ien th* 3 P r duct,

t^

H + (!

)

represents essentially the sequence hand, is represented by the series

(

:

we

if

write

= />> This sequence, on the other

n).

if the product This and the given product have the same meaning the But series definition. in accordance with our converges may also

have a meaning without the factor (l

-f-

#5 )

is

being the case for the product

this

=

and

all

=

other factors are

(e. g.

if

2).

00

2.

If

conversely the scries

n=l

sequence for which

sn

= J^
an

is

This

given, then

it

represents the

what

is

meant by the

also

is

=l

product Sl

.*..*...

*

provided

*2

it

=Sl

.

^.

7^_ln iVW"

.

*

n

has a meaning at

all.

__

fiL >

+ ^_ +

And

for this obviously

ni\

[

,

.

\

+ -"-Mn - 1 '' all

we

that

require is that each sn 4= 0. In general the convergence of the product implies the convergence of the series, and conversely. In the case, however, of sn -> 0, although we call the series convergent with sum 0, we say that

the product diverges to 0. Thus e. g. the symbols

^

E ^ =-!

JUVi) have precisely the same meaning.

^

and

~ *

// =

(l X

+ *o^rio

227

Connection between series and products.

30.

however, only in rare cases that a passage such as this to the other will be advantageous for actual The connection between series and products which is investigations. It

from

is,

the

one symbol

theoretically conclusive was, moreover, established

by Theorem 8 alone,

or by Theorem 7, if we are concerned with the mere question of absolute convergence. In order to show the bearing of these theorems

on general questions, we may prove the following: and 89, 2,

Theorem its

factors

be

absolutely Proof.

An

11.

infinite product 77(1

+ 0J

is

Theorem 88,

1,

unconditionally 130

remains convergent, with value unaltered, however

e.

i.

convergent

as analogue of

rearranged

(v.

27,

3)

if,

and only

if,

it

converges

9 .

+

We

The terms a n

# n )suppose given a convergent infinite product 77(1 we refor which finite in number, certainly |0 n |^>,

,

place by 0. In so doing, we only make a "finite number of alterations" and we ensure an < \ for every n. The number m in the proof of We first prove the theorem for theorem 8 may then be taken 0. |

~

\

the altered product.

Now, with the present values /7(1

+

are convergent together, e L to one another.

J and

U=

of a u

and their values

,

2-log(l

+O

U and L

stand in the relation

follows that a rearrangement of the factors of the product leaves this convergent, with the same value 17, if and only if the corresponding rearrangement of the terms of the series also But this, for a series, is leaves this convergent, with the same sum. the case

if,

and only

It

it

if,

converges absolutely.

By theorem

8 the

same

therefore holds for the product Now if, before the rearrangement, of alterations,

we have made a finite number rearrangement make them again in can have no influence on the present question.

and then

after the

the opposite sense, this The theorem is therefore true for all products

Using the theorem of Riemann proved later can of course say, more precisely: If the product is not absolutely convergent and has no factor =0, then we can by suitable Additional remark.

(187) we

its factors, always arrange that the sequence of its products has prescribed lower and upper limits x and /*, provided 10 Here they have the same sign as the value of the given product * and ft may also be or 00.

rearrangement of partial

.

Dim, U.: Sui prodotti infiniti, Annali di Matem., (2) Vol. 2, pp. 2838. 1868. For a convergent infinite product has certainly only a finite number negative factors; and their number is not altered by the rearrangement. 9

10

of

Chapter VI I.

228

Infinite products.

Exercises on Chapter VII. 85. Prove that the following products converge and have the values indicated:

'

77

c)

/ f

1

\

1

=

-^-nvqrijs )

(

n - 2

+

Zn

+

4 3-

85a. By 128, 2 the sequences

xn = have

positive

so defined

is

I

+J+

+-

T1

>

Show

7i

terms for n

1.

log n and that (# n

|

y

=

1

is

a nest of intervals.

yn )

-fJ-h-.--fn

The

value

Euler's constant.

86. Determine the behaviour of the following products:

[/

for

^

a

1,

gt 3>

87.

Show

88.

The product

that IT cos

^w converges

in Ex. 86

if

a

2\ xn

|

converges.

d has, for positive

value

y^. Hint The partial product with last factor :

(

1\

1

^T

\

(We

cos

recognise Vieta's product mentioned in footnote

1, p.

more

x

t L cosh ^ cosh

which latter formula cosh x cosine and sine of x. in

=

x

-.

x

g

_j_

e-

sinh

ac

lO

by

=

.

8c

is

=

"~^~^i

Similarly the

xi

where

number

S-

is

2At^ (

*

jv_i --)

'

... cosy^ lu

=

-

-. 7T

218.)

x

JC

-

=e

91. With the help of Ex. 90, show that the intervals in Ex.

H

T7i

a ,

=

v-fc+iA

5o

sin

it. r cosh cosh

o

*s

x

generally, that for every

x

cos $

ZT1 /)

89. Prove, with reference to Ex. 87, that cos v 4

90. Show,

of a, the

integral values

_e

number

x

denote the hyperbolic defined by the nest of

defined as the acute angle for which

defined by Ex. 8 d

is =3

r

x lf

if

&

is

defined

Exercises on Chapter VII.

92. In a similar way, show have the values: e)

We

in

Ex. 8e and 8f

with

have

+

-

X( *~ -l)

What can you deduce initial

numbers defined

that the

with

.

O-T!*-* 93.

229

-+

.

.

.

x

+(-

I)-

(X

for the series and product

which we here have the

of

portions?

94. With the help

of

theorem 10 of

"1-3 5...(2n-Jl) 2.4.6...~2T~~~ 95.

show

Similarly,


<j x

that, for

show

29,

that

J_

^

,

s(s+l)(s + 2)...(s + n) _^ y

(y

+ 1) (y + 2)

.

.

.

(y

+ n)

96. Similarly, show that if a and b are positive, and A n and respectively the arithmetic and geometric means, of the n quantities a, (n

=

2, 3, 4,

.

.

.)

a

a-|-6,

+ 2b,

a

...,

+ (w-l)6,

* '

Gn

2

97. What can be deduced, from the convergence &), as to lhat of

83, 3 and 4.) 98. Given (u n ) monotone decreasing and 1

1

"22

"4

M 1 --- u8 -.

always convergent?

82, theorem 29, theorem

(Cf.

99. To complete verges if the two series

S(an converge. the

are

then

A, ~*

(Cf.

(7,,

How may

-tan *)

1

,

//(l-f-a w )

and

is

.

5.)

9,

prove that IJ(l-\-a n )

and

be generalized?

this

*

of

certainly con-

^|a.|

On

the

other hand,

show, by

example of the product

where we assume J <; a and ^a M 2 both diverge.

<

J

,

that

77(1+0*) may converge even when

2a n

230

Chapter

Closed and numerical expressions for the sums of series.

VIII.

Chapter

VIII.

Closed and numerical expressions for the sums of series. 31.

Statement of the problem. IV, we were concerned mainly

and

with our Chapters of of the and the it was not series, convergence question problem A, till the last few chapters that we considered also the sum of the This latter point of view we shall now place in the foreseries. ground. It is necessary, however, in order to supplement our developments of pp. 78-79 and 105, that we should make it quite clear once In

III

more what

the

is

connection.

If,

of

significance

for instance,

~ i_i_ 4 3^5 ,

1

we may

interpret

cates that the

it

in

sum

and

7

On

two ways.

the one hand, the equation indi-

on the

of the series

quarter of the value of a

questions which arise in this the relation 122:

the

we have proved L JL_JL+ ^

right has the value

number 1 which we meet with

in

~

one

,

many

other

which approximations are well-known. In this that we have specified the sum of the series it be claimed sense, may But such a statement can only hold in a very written down above.

connections

relative sense; for

of

the

to

it

is

not possible to give a complete specification nest of intervals or some

number n, otherwise than by a

equivalent symbol, and such a symbol is precisely furnished by the series; i. e. the expression on the right, in the above equation. are therefore equally justified in claiming the exact opposite, namely

We

an (extremely simple) expression for the that is to say, by means of a converwhich happens indeed in our case to gent sequence of numbers, have a peculiarly straightforward and convenient form and may also 9 (69, 1) be immediately expressed as a nest of intervals that the equation provides in series form,

number n

.

The circumstances equation

(cf.

are

entirely

altered

when we come

to

the

68, 2b): 1

1

In

metrically,

former times, -^-

when

matters were

these

was always thought

that of the circumscribed square. *

Namely: -

where

=

all

interpreted rather geo-

of as the ratio of the area of a circle to

(

5

2*| s a*+i)>

Statement of the problem.

31.

Here we are of the series

231

perfectly satisfied with the statement that the sum precisely because the number 1 (and similarly

= 1,

is

every rational number) can be fully and literally assigned. In such we have a perfect right to assert that we have a closed But in all other cases, where expression for the sum of the series. the sum of the series is not a rational number, or at any rate not known to be one 3 , we cannot strictly speak of evaluating the sum of the series by means of a closed expression. On the contrary, the series ought then to be regarded as a (more or less imperfect) means of representing or approximating to its sum. By proceeding to express these approximations (usually in the form of decimal fractions) and estimating the errors involved, we form what is called a numerical evaluation of the sum. cases,

we may have ascertained merely that the given series has for sum a number related in some simple to a number which (or at any rate specifiable) manner we meet with in other connections; as e. g. it follows from 122 and above

Lastly, as

124

,

that 1

In

in the case of the series for

that

since

it

1

-

3

case, we should still welcome the information so obtained, establishes a connection between results where formerly we

saw none.

It

is

usual,

in

such cases,

still

to

say

though

in

an

we have evaluated the sum by means of a closed expression; in fact, the number concerned is then regarded as "known" through those other connections, and we simply express the sum of the series "by means of a closed expression" involving this extended sense

that

number. Here the student must, however, guard against self-delusion. that the sum of the it has been ascertained, for instance (v. p. 211)

If

series 8 1 ".*.- i+JL 4-L3 L + 2-4-6 1 50 2 50 ^~ 2-4 50* 1

1

'

.

"^

'

3

a very relative sense "deter-

has the value

^-Vs,

mined

form of a closed expression".

in the

per se

any

series.

It

better is

is

still

known than

only because

connections and has,

for

V2

only in

the

sum

The number V2

is

not

of

any arbitrary convergent many hundreds of other purposes, been so often evaluated

occurs in so

practical

we

are in the habit of considering its value as almost If as any literally specified rational number. "known" perfectly

numerically, that as

it

L... r

3

For instance, if we have determined the sum of a series to be equal to Euler's we do not know to this day whether we are confronted with a rational number

constant, or not.

Chapter VIII. Closed and numerical expressions for the sums of

232

instead of the above scries,

we

consider,

series.

the following

for instance,

binomial series: 4 24* 5-i6" 1000 a

_24 1+ J_5 '1000 ,

_5_ [ 1 2 L

_4

"

1

9

24

"

"5-10 15* 1000 s

1

J

'

_

B,

and its sum has been ascertained to be equal to y 100, we shall be less inclined to regard the sum as fully determined thereby; on the contrary, we shall prefer to accept the series as a most useful 5

means

of evaluating y 100 to a degree of approximation not so easily In other words, with the exception of attainable by other means.

sum of a series can be specified as a when we consider equalities of the form rational number, definite will laid be sometimes on the right hand the "s <<*", emphasis side and sometimes on the left, according to the circumstances of the those few cases in which the

=

considered as known through other connections, (though in an extended sense) say that the sum of the series has been evaluated in the foim of a closed expression. If this is not the case, we shall say that the series is a means of evaluating the number s (of which it provides the definition). (Obviously both In points of view may be taken with regard to the same equality.) the former of the two cases, we shall, so to speak, have achieved our object, since the problem B (v. p. 105) also is then solved to our satisIn the latter case, however, a new task now begins, that of faction. case.

we

If

shall

s

may

be

still

actually expressing the approximations, to its sum, in a convenient and simple

provided by the series itself, (e. g. in decimal fraction

form

form, as the most desirable for our purposes), and of estimating the errors involved in these approximations.

Evaluation of the sum of a series by means of a closed expression.

32.

It is obvious that we may without difficulty If s be the assigned sum, with any assigned sum. construct, by any one of the many processes at our disposal, a sequence conver gi n g to 5, and consider the series (sn) 1.

Direct evaluation.

construct

series

*o

+

(*i

-

*o)

+

(*,

-OH

h

= sn

(* n

s

- 1)

+

' ' '

this series is convergent Since its w partial sum is precisely and has the sum s. This simple procedure affords an inexhaustible means of constructing series capable of summation in the form of a closed expression; e.g. we need only assume one of the numerous null xn n s 0, 1, 2, ... sequences (a?n ) known to us, and write s n th

,

=

Examples gives

of series of

+

1+

<

sum

,

1.

+ --- = 1

=

.

Evaluation of the

32.

sum

a series by means of a closed expression.

of

1-2

6t

V

*

I

___ 2^

34

4-5

*

1"

\

233

.

If

7.

w we

terms of one of these series by

the

multiply

convergent series of sum

5,

we

obtain a

s.

It is not superfluous to be able to construct such examples, as we shall see that the power to provide series with known sum is an advantage in the discussion of further series.

The converse Theorem. in the form

sequence of we have

an

of the

treated principle just

Given a series Jj a n

= xn

known

xn + 1

limit

,

sum

expressed by the

whose terms a n are expressible 131,

,

where xn

,

the

is

the

is

term

of the series

a

of

convergent

can be specified, for

^> n = *o--

n=0

We

Proof. Since x n

*,

write

may

the statement follows.

Examples. If

1.

a be any real number 1

-^

2.

=f=0,

l

2,..., then

f

1

== ,

68, 2b):

(v.

1

1

T

as here

Similarly

2(a-f

1)

as here i

3.

if

Generally,

p denotes any positive

00

V

n^O ( K 4.

i

i

r

1

+M

) (

Putting a

a

+n+ J

= ^, we

(

)

+ n "H P)

11

integer,

= --

-

P

(a -f 1)

thus obtain, for instance, from

"= rTr7 + 4"TTO + 7Tl OT3 + *

5.

Putting a

=

1 in 3.

1-2. or

we

obtain

.. 1

S,

nt?o(P \

+ + l\ P+l )

= p+l P

'

24

.

.

.

2.:

(a

+p-

.

1)

234

Chapter VIII. Closed and numerical expressions for the sum& of

The 133.

a somewhat more general theorem.

is

following

series.

2a

Theorem. // the term an of a given series n is expressible xn + q , where xn is the term of a convergent sequence in the form xn 0, then of known limit f , and q denotes a fixed integer

2 an = *o + *i H-----h

-1

> - ?*

n=0

We

Proof.

Since xv

*^ (by 41,

> q>

n

have, for

the statement at once follows.

9),

Examples.

since here

we have "

\a+n

q

a

In particular, writing

=

$

oo

,

1

=

2 For a

a-

and q

l

we have

2

accordingly: 1

J_ J_ and for a

=

j, q

=

^^3.

3:

_4._ +

_4." ..-

l.T^S-Q^.ll"1 3.

4.

Somewhat more

Thus

a

for

=

}

generally,

,

^

= 2,

A

The

artifices

"*"

"90"

A, as well as

= 2 we

,

denotes a fixed integer

>0:

find

^a. ^^ =i^5- 9- 13"*"" 420*

^a. 1- 5- 9

if

3- 7- 11

here employed

may be

extended to obtain,

finally,

the following considerably further reaching

134.

Theorem.

//

terms of a series

the

2 an

are

expressible,

for

every n, in the form

an

= Ci xn + + c i

t

xn+*

+ '~ + c

where (xn ) denotes a convergent sequence of coefficients

C).

satisfy the condition ci

+c

a

H-----f-

ck

=*

k

xn+ic

known

(

k constant, limit

,

^2)

and

the

Evaluation of the sum of a series by means of a closed expression.

32.

then

2 an

JJ a n n=o

is

convergent and

lias for

= c^x^ + (q +
a

235

sum-

H-----h fo

+ c,H-----h *

fc

-iK-i

The proof

is at once obtained by writing the expressions for below the other so that terms involving xv occupy one #a ..., a m , fl 1? the same vertical. Carrying out the addition in columns, which of course is allowed even without reference to the main rearrangement we find, for m theorem k, taking into account the condition ful,

>

by the coefficients

filled

which

we

at

is

again the

sum

CA ,

1

-

g

J_ _5_

of terms.

=- ,

&

7

=

2,

Cj

=

1

cs

,

we

-fl,

M__ ^

2

'"

=

9

1

/

1

27

These examples

2

may

Letting

m

+ oo,

relation.

Examples.

n2

Putting xn

number

of a finite

once obtain the required

1

>

obtain

" _^

2"

1\

13

-

of course easily

be multiplied to any extent desired.

Application to the elementary functions.

rems have, speaking generally, made us which may, without requiring any more form of a closed expression. By far the most frequent series,

The above few

theo-

familiar with all types of series refined artifices, be summed

in the

in all applications, are those ob-

tained by substituting particular values for x in series expansions of elementary functions and in series derived from these by every species of transformation or combination, or other known processes of deduction. in this manner, of summation by closed expres-

Examples, obtained

We

must content ourselves with referring the the particularly ample selection of examples at the end of this chapter, in the working out of which the student will rapidly become familiar with all the main artifices used in this connection. The sions are innumerable.

reader to

developments in this and the following section will afford further Let us merely observe quite guidance in this part of the subject for the it is often that moment, generally, possible to deal with a given series by splitting it up into two or more parts, each of which again represents a convergent series; or else by adding to or subtracting from a n term by term, a second scries of known sum. In particular, if a is a rational function of n its expansion in partial fractions will n frequently be a considerable help.

2

>

236

Chapter

Closed and numerical expressions for the sums of series.

VIII.

A further means of Application of Abel's theorem of limits. the of one sum of a theoretical evaluating series, great importance, 3.

differing from that just indicated in the principle it involves, though in most cases intimately connected with it in virtue of 101, consists in applying Abel's theorem of limits. Given a convergent sen ries a n , the power series f(x) converges at least for nx

K2

If is

= 2a

x <; -f

1,

and hence, by 101,

2an = hm

f(x).

we suppose

that the function f(x) which the power series represents so far known, that the latter limit can be evaluated, the summation

is achieved. The developments of Chapter VI offer a wide basis for this mode of procedure, and in fact Abel's theorem has already been used there more than once in the sense now explained. We shall give here only a few relatively obvious examples, with a reference to the exercises at the end of this chapter.

of the series

135*

We

Examples.

2.

V-_

n^o 2w

+

are already acquainted with the series:

V

lim 1

=

(-!)

lim

*->i-o,o

We

have the further example

The

series inside the bracket has for derived series 1

and therefore represents the function

(v.

19, Def. 12)

X

dx

sum

Accordingly, the 4. Similarly

For further

we

1

(s+1)*

1

ol the given series is find (v.

series constructed

_

=

l

2x-l

log 2

n

-

-f-

19, Def. 12)

on the same

lines,

the formulae of course

become

more and more complicated. 4.

Application of the

theoretical

and

main rearrangement theorem. Equally great

practical significance attaches, in

our present problem,

main rearrangement theorem. This application illustrate by one of the most important cases;

to the application of the

we proceed additional

In

at

once to

examples will again be furnished by the exercises. and 117, we obtained two entirely distinct expansions

115

of the function

xcotx, both valid

at least for

every sufficiently small \x\.

Evaluation of the sum of a series by means of a closed expression.

32.

If,

we

in the first of these,

replace x by

nx, we

237

obtain, certainly for

every sufficiently small \x\,

Each term

on the

of the series

right

obviously be expanded in

may

of x:

powers

^ -x

* t2 *

~~

v o fx \ 2j * Taj N* / n =i

-in

(k2

i^vptf\

i, *>

v

I

"a

pxea)

of the main rearrangement theorem; theorem in our case only differ in sign from the series 2 themselves, the conditions of that theorem are all The coefficient of x 2 ? on the fulfilled, and we may sum in columns.

These are the

since the series f

series

(fc)

z

(fc)

of that

(fc)

becomes

right then

--2J^ and

by 97,

since,

it

result

the important

(p fixed)

has to coincide with that on the (once more denoting

we

left,

index

the

of

obtain

summation

by n) "

1

'V n^i n*" 71=

~"

' ^

I

sum

This gives us the

of the series i__

in the

JL j

,

ij.

number n and the numbers may be regarded as known 4

of a closed expression, since the

form

tional) Bernoulli's

(ra-

.

In particular, oo

V

1

=

<*

,8

=

-

y

,~4

QO

y

_6

i

4 Quite incidentally, formula 136 shows that Bernoulli's numbers JB.2n are 1 of alternating signs and that ( l)"~ in is positive; further, that they increase

B

QO

with extreme rapidity as

n increases; for since the value of

|

rj^

lies

between

1

fc=i*

and

2,

whence

whatever be the value of n, 2(2,01

we

'~

follows that

it

holds for |o?|

it

-4-

necessarily have

2(2)1

'

OO.

Finally, as the

also follows that the series

>

above transformation

115 converges

absolutely at

But for x n it certainly cannot converge absolutely, for then cotcc would be continuous for x = n by 98, 2, which we know is not the case; thus the series 115 has exactly the radius n. It follows from this least

x

for

|

\

.

|

\

9

that

116 a has

the radius &

,

116 b

the radius n.

Chapter VI 1 1. Closed and numerical expressions for the sums of series.

238

not superfluous to try to realise 5 even the first of these elegant formulae

This

.

was needed to obtain be seen to involve

that

all

It is

will

much of our investigations up to this point. The above provides us with the sum of every harmonic series with an even integral exponent; we know nothing yet of the sum of a harmonic scries with odd exponent (> 1); that is to say, we have not succeeded any obvious relations that might result in connecting

as yet in finding

such a

sum

with any numbers occurring elsewhere.

^i 3 )

fe. g.

of course no obstacle to our evaluating the numerically, to any degree of approximation

is

sum 8 ;

of any harmonic series On the other 35).

v.

We

hand, our results readily yield the following further formulae:

_*

y

^n The ing

from both

sides,

i

have

V /

2

,,t 1

(2v

we

as -

same thing

latter series is precisely the this

(There

-

.

Subtract-

obtain

-!

(2

or

For p

=

1, 2, 3,

.

..,

the

sums are f! 8

If

we

'

^ 96

in particular

^L '

>_

*/

___

'

-

'

1

1

again subtract the same series

v

'

'

960

-

^-

g

we

,

obtain

\

1 1

138.

1

TTr 6

+

-rrH

-3r:

James and John Bernoulli did their utmost to sum the series

The former of the two did not live to see the solution was found by Euler in 1736. John Bernoulli, to whom after,

wrote in

this connection

ardenti desiderio Fratris difficihorem

elusam

.

.

kind, will

.

quam qms

mei,

of the problem, it

(Werke, Vol. 4, p. 22): Atque ita satisfactum est qui agnoscens summae huius pervestigationem

omnem suam industriam fuisse second proof, of a quite different

putavent, ingenue fassus est

Utinam Prater superstes be found in 156, a third

esset

'

A

in 189,

and a fourth

(Tables des valeurs des

sommes Sk =

in CO

6 T. J. Stieltjes

which

became known soon

sums

I ,

Acta mathe-

of these series,

up to the ex-

n~i matica, Vol. 10, p. 299, 1887) evaluated the ponent 70, to 32 places of decimals.

210. nk

Evaluation of the sum of a series by means ot a closed expression.

32.

In particular, fur p

JL

Here with

JL

a '

12*

'

we know

again, however,

The

odd exponents.

31

4

720*

sums are

the

1, 2, 3, ...

o

30240* two

'""

of the corresponding series might of course also have

nothing

last

results

been obtained by starting with the expansions in

We

,

in partial fractions, given in 1

jt

of the function

118,

Q O

1

-

r-, i.e.

oo/1'1

K

^

O |

4 cos -

partial fractions of

and reasoning & as above for that of the funcsm may deduce further results by treating the expansion

the functions tan or -rtion cot.

239

i

{

-

4

The r th term

is

here expressible by the power series V

'

to (2v+l)

after rearranging, the coefficient of OO

v

/

(-

1

\V

1 )

a;

2

2 * +1

" thus

1

._

1

becomes: 1

l

_

'

l i

i

Let us denote these sums provisionally by

<\>p + 1

;

then

sta;

or

A|~ ^YJa (*i\*+. a [i'T~ *( a ) ~^ ^\ n ) -i i

On and

the other hand, this its

coefficients

power just

series

like

by simple recurring formulae.

may be

Bernoulli's

We

1 J

obtained by direct division numbers in 105, 5

usually write }

n

77

2W ~3

so that

This gives

EQ =

1,

and, for every

may be written as follows

n I>

1,

7 recurring formulae which

(after multiplication

by (2n)\):

139. 7

The numbers determined by

these formulae (which are moreover rational

integral numbers) are usually referred to as Euler's numbers. The numbers to v - 30 have been calculated by W. Scherk, Mathem. Abh., Berlin 1825.

Ev up

Chapter VIII. Closed and numerical expressions for the sums of

240

or in the shorter symbolical form

now holding

We

for every k I> 1

deduce without

and

=1, In terms of

=

3

these

sidering as known,

for the

sums

difficulty:

7T

7T

'-i

-^3

1,

4

_

p

^:>

...

=

= 5,

_u 61,

fl

8

numbers, which we are perfectly

we

* '

justified in

con

have, finally,

*

4

:

.

= 0,1,2,3,...,

In particular, for

106)

(cf.

series.

this

5

3

32^'

gives the values 61

s '

1536

245

7

*"

of the corresponding series.

33.

Transformation of

series.

In the preceding section ( 32), we became acquainted with the most important types of series which can be summed by means of a closed either in the stricter or in the wider sense of the term. expression In the evaluations last made,

which are

really of a

profound nature,

main rearrangement theorem played an essential part; indeed, in virtue of this theorem, the original series was changed, so to speak, into a completely different series which then yielded further informaWe were therefore principally concerned with a special transtion. formation of series*. Such transformations are frequently of the greatest use, and indeed even more so in the numerical calculations which the

form the subject of the following two tion of

closed

formations

we

expressions will

now

for

the

sections, than in the determina-

sums

turn our attention,

of series.

To

and we

start at

these trans-

once with

more general conception of the transformation deduced from the main rearrangement theorem and repeatedly applied to advantage a

already in the preceding section. 8

Such transformations were first indicated by /. Stirling (Methodus diffeLondon 1730); they are based, in his case, on similar lines to the above, excepting that he fails to verify the fulfilment of the conditions under which the processes are valid. rentialis,

Transformation of

S3

241

series.

00

Given a

z (k) ,

series

convergent

each

let

of

terms be

its

*=o expressed, in any manner,

We

(e. g.

by

as the

32, p. 232)

sum

of

an

series:

infinite

assume

shall

further that the vertical columns in this array them-

constitute

selves

convergent

and

series,

denote

sums

their

by

2^ 00

s

(0)

s

,

(1) .

,

.

.

,

s

(n

Under what conditions may

\ ....

formed by these numbers

series

n=0

be expected to converge, with

n-O

jfc=0

equality is justified, we The formation of the given series.

have certainly effected a

this

If

the

trans-

main rearrangement theorem im-

mediately gives the

Theorem.

// the horizontal

absolutely convergent series the

absolute values

It

this

is

graph.

The

denoting by f

of the terms in one

2s

convergent, the series

and

rows of the array (A)

(n)

theorem

question

(fc)

row and

that

we have whether

sum,

the

\

n=0 ,

an ^

the series

if

22

also converges

arises

all constitute

|,

of

2^

is

(fe) .

applied in the preceding paraits requirements are not un-

necessarily stringent, whether the transformation much wider conditions.

is

not allowed under

very

A. In

an extremely far-reaching theorem was proved first only that the series constituted by the

this direction,

He assumes

by A.Markoff*. columns of the array (A) converge, as well as the original series and the series constituted by the horizontal rows of the array. The

vertical

GO

numbers

s

(n)

have thus determinate values.

Since

OD

z*

*=0 converge, so does

J(2 (k)

a

(fc)

);

and

also, similarly, for

and

a^ Jfc=0

any fixed m,

A=0 the series

2

(*<"

- 4" -

a? ----- 4LO

(m

fixed).

9 Mtfmoire sur la transformation de series (Me*m. de 1'Acad. Imp. de PStersburg, (7) Vol. 37. 1891). Cf. a note by the author, "Einige Bemerkungen zur Kummerschcn und Markoffschen Reihentransformation", Sitzungs-

St.

berichte der Berl. Math. Ges., Vol. 19. pp.

417,

1919.

141.

242

Chapter VIII. Closed and numerical expressions for the sums of series.

The terms with the

of this series are, however, precisely the remainders, each 10 index m, of the series constituted by the individual rows

initial

of the array.

we denote

for brevity,

If,

these remainders

= 2

r

by r^\ so that

a

(k

and

m

fixed),

(m

fixed)

rt=OT

the series

2 is

The

convergent.

r

- Rm

*}

further assumption

Rm ->

made

then

is

m ->

when

that

oo.

2sW converges and =

It may be shown that under The theorem obtained will

142.

(

these hypotheses thus be as follows:

Markoff's transformation of series.

Let a convergent

series

00

2 zW

be given with each of

terms itself expressed as a convergent series:

its

k--o

*W = V*) +

(A)

i

+ *n w +

w+

= 0,

(*

-

1, 2,

.

.

.).

QO

2 an W of n = 0,

Let the individual columns

the

array (A) so formed represent

A=O convergent series with

of the

series

$(">,

00

k

1,

2,

rows also

horizontal

the

in

sum

^Jm

.

.

.

,

so that the remainders

constitute

a convergent

= Rm

(m

series

fixed).

In order that the sums by vertical columns should form a convergent series R should exist; and in s("\ it is necessary and sufficient that lim/^m

=

Z

order that the relation

2

s< fl >

n= should hold as well,

The proof

it is

is

>

(a)

whence the

first

A=0

necessary

almost

R

is

and

sufficient that this limit

trivial, for

statement

is

2

(to)

simply " r n

R

should be 0.

we have

+ sW +... + ,00 = R - Rn+1 immediate.

n=0

and since

= 2 zW

Since

it

,

follows that

M = R -R, Q

= 2 z^ * =0

k

\ the second statement

now

also.

10

Here we of course take

m

to give the whole series,

i.

e.

z (k)

itself.

follows

Transformation of

33.

243

series.

superiority of Markoff's transformation over Theorem 141 of course, in the absence of any mention of absolute converconsists,

The

B.

gence, only convergence pure and simple being required throughout. Its applications are numerous and fruitful: those bearing on numerical evalua-

and we shall only indicate in this place one applications, which consists in obtaining a trans-

tions will be considered in

of the prettiest of

its

35,

formation given by Euler u siderations of convergence. It is

of course, in his case, without any con-

advantageous here to use the notation of the calculus of

differences,

and

this

any sequence (#

,

we

x lt x 2

will accordingly first elucidate in brief.

,

.)>

tne numbers

and are denoted by

are called the first differences of (x n )

A# The k

A

,

x l9

.

.

.

A

,

xk9

.

.

.

differences of the first order of (A x n ) 9 i. e. the numbers A x k 1, 2, . . . , are called the second differences of (x n ), denoted

= 0,

J2 * In general,

we

write for n

A*x l9 ..., A*xk

,

^

finite

Given

.

,

A x kl lt ,

by

.

1

J+* *t

=

J

*

fc

- J- *&+1

(A

= 0,

1, 2,

.

formula may also be taken to comprise the case n if we A" x k as being the number #A itself. It is convenient to imagine numbers x k and A n xk arranged in rows so as to form the following

and

this

terpret

.

.)

in-

the tri-

angular array, in which each difference occupies the place in its own row immediately below the space, in the row above, between the two terms

whose

difference

it

is:

X},

Q,

Ax

A*x

(A)

The xk

Qj

difference

directly.

#3,

%9

Ax

lt

Ax

2J

,

A" xk may be

expressed in terms of the given numbers

In fact

J 2 xk

= A xk - A XM = fa - X M )

xk

2 X k+l

-f-

and similarly 3 x k+2 11

Institutiones calculi diffcrentiahs, 1755, p. 281.

244 Chapter VIII. Closed and numerical expressions for the sums of series.

143.

the formula

A Xk

xk -

=

for fixed &,

is

(J)*

m + (J)*M - + ... + (-D" (J)

thus established in the cases n

validity for every

n

positive integer n,

we have

whence by 143

follows.

addition, since

=

1, 2, 3.

By

induction,

for n

(j

+

+

1

(

:

^j)

=

\ we

(

have the formula

+

Euler's transformation of series.

144.

vergent

its

For, supposing 143 proved for a particular

1 instead of w. This proves all that is required. of the above simple facts and notation, we may use Making the following theorem:

for n

*<-+

series

now

state

Given an arbitrary con-

12 QO

we

invariably have: t

^P ^ ^o n+1 ' n-0 2

i \ 7c

k i.

e.

the series on the right also converges

12

The

and has

the

same sum as

the given

need not be an alternating series, i. e. the numbers a n need not are however small, though by no means essential, advantages in writing the series in alternating form as above, when effecting the trans-

all

series

be positive.

There

formation. 13

This general transformation

is

due

to Ruler (Inst. calc. diff., pp. 281 seq.,

The

particular transformation given below in example 2 is to be found already in a letter to Leibniz dated 2. 8. 1704, from/. Bernoulli, who attributed the discovery to N. Fatzius. (Cf. also J. Hermann, letter to Leibniz of 21. 1. 1705.) 1755).

An early investigation of a more searching kind, using remainder terms, was undertaken by /. V. Poncelet, Journ. f. d. reine u. angew. Math., Vol. 13, pp. 1 seq., 1835. The proof that the transformation is always valid, provided only the series 2 ( l) fc a k is assumed also convergent, was first given by L. D. Ames (Annals of Math., (2) Vol. 3, p. 185. 1901). Cf. also E. Jacobsthal (Mathem. Zeitschr., Vol. 6, p. 100. 1920) and the note bearing on that by the author (ibid. p. 118).

Transformation of

33.

Proof.

we

In the array (A) of p. 211,

a^ =

(b)

-

L

1)*

(

[ 2n

substitute for a n (k) :

^

A"a k -

245

series.

A-

a

By 131, if we now sum for every n keeping k fixed of the k lh horizontal row), we obtain

J

e.

(i.

y

.

form the sum

QO

j

For fn\

lim

A"

"* lim

W**"

fn\

.

U/**' i+

"

/ (

,

'

'

"

'

fn \

i

W*" + *

>

rt is equal to zero by 44, 8, because a ky #/cf-2> /<,fi> certainly form for an the individual a null sequence. Accordingly (b) gives expression 1 in infinite series. terms of the given series ( I) &L Forming the sum

S

of the

th

column, we obtain the series k Ln A n Z(-l) -

the generic term of this series, as in the form

ak

~

so that the series under consideration

131.

We

2 n +i

An

J n+1 a k

= IV. K -

-

1

J n+1

1

(n fixed) ;

J

A n a k+1

ak

? A" a k

may


-

,

can be written

(-!)*+ J"

again be

summed

A+] ],

directly,

by

obtain

% k^O Since, however, the

n

(ft)

=

nVi

t

jn

tf

- Hm ( ~ n l) J ^] k-^co fc

o

numbers a L form

a null sequence, so

do the

(

fixed).

first differ-

The vertical differences generally, for any fixed w. columns are thus seen to constitute convergent series of sums

ences and the

th

The validity of Euler's transformation Rm -> 0. Now th; we have shown that

will accordingly

be established when

the horizontal remainders are seen

to have the values

(G51)

Chapter VIII. Closed and numerical expressions for the sums ol

246

bame line Thus

following precisely the

series.

argument as was used above

of

for the entire horizontal rows.

i *-=^J;(- )^"* If

we

this

(

fixed **)

write for brevity

R m may

series for

addition from the

(m

be thought of as obtained by term-by-term series:

-f- 1)

Hence

as r w is the term of a null sequence, so is This proves the validity of Etilers transformation wilh

therefore,

/? w>

by 44,

full

generality.

8.

Examples. 1.

Take

+ +_.... 234

..! The triangular array

(A) takes the form

1111 I

i

1,

*

-,

2

F2'

2T3

J

I

I

4

5

2

1 2 J_-2 3 "4 5' 2T3-4 i.2~3' 1-2.3 1-2.3 1-2 3-4' 2-3-4.5' 1

'

of the

n th

difference

is

""

"

'

The general expression

''

4-5'

3 4'

found to be

Ml

4 . a, _ (*

+ l*

so that in particular

This

8

is easily

verified

= tOi lOg 2 = 1

1

by induction. -r

-5-

4

8

!

(

2.

*

34)

is

1.2

of this transformation at once apparent.

With equal

facility,

1t

1

we may

I

I

'

The significance lation

*

!

!

3

Accordingly we have

11 H-- .-.= - -- -- -+ e.

r 1 -^

^

2-2

:!

H

g. for purposes

*

-

I

3-2 a

-\

*

I

j -f

.

4-2*

of numerical

calcu-

deduce

I11
'

a'i

In what cases this transformation is particularly advantageous for purposes of numerical calculation will be seen in the following section.

Numerical evaluations.

34.

247

Kummer's transformation of series. Another very obvious C. transformation consists simply in subtracting from a given series one whose sum is capable of representation by means of a known closed expression and which at the same time has terms as similar in construction as possible to those of the given series. By this means, subtracting for instance fiom s

= 2,'-

known

the t2

series

(v.

68, 2 b)

!_ -v_.JL_

(+!)'

we deduce

the transformation CO

The advantage once

of this

QO

1

transformation

1

numerical

for

purposes

is

at

clear.

Simple and obvious as

this transformation is, it yet forms what 1 kernel of the Rummer's really transformation of series *; the only difference being that a particular emphasis is now laid on a suitable choice of the series to be subtracted. This choice is regulated as is

follows:

Let

2a n = s Let

convergent). Let us suppose

be the given series (of course, by hypothesis, be a convergent scries of known sum C.

=C

Sc n that

the

terms

of

the

two

series

are

asymptotically

proportional, say lira -.= c >*

= 7 4=

.

n->

In that case

,45. and the new

series occuring on the right may be regarded as a transformation of the given series. The advantage of this transformation lies mainly in the fact that the new scries has terms less in absolute

value than those of the given series, as in fact (l

sequently

its

field of application

belongs

and examples

main

of

found

in the following paragraph.

numerical calculations

34.

for the

y

>Q.

Con-

]

most part illustrating

to the it

will

do be

Numerical evaluations.

1. General considerations. As repeatedly explained already, it only on very rare occasions that a closed expression, properly soIn the general case, the real called, exists for the sum of a series. is

11

Kummer.

E. E.:

Journ.

f.

d. reine u.

angew. Math., Vol.

16, p. 206.

1837-

and Catalan, Memoircs couronne's et de savants etrangers de 1'Ac. 67, and the note by the author mentioned in footnote 9. Belgique, Vol. 33, 1865 Cf. also Leclert

248

Chapter VTII. Closed and numerical expressions for the sums of series.

number

to

which a given convergent

bers for which

this

sense,

number

to

.

sequence of num-

stands, converges, is, so to speak, first defined (given, by the series itself, in the only sense in which a number

determined, .) can be given, according .

series, or the

it

we may which

boldly affirm

its

of Chapters I and II 15 that the convergent series is

to the discussion

partial

sums converge.

But

for

.

In

the

most practical

we gain very little by this assertion. In practice, we usually require to know something more precise about the magnitude of the number and to compare different numbers among themselves, etc. For this purpose, we require to be able to reduce all numbers, defined purposes

by any kind of limiting process, to one and the same typical form. The form of a decimal fraction is that most familiar to us to-day, and the expression, in this form, of numbers represented by series accor10 The student should, however, dingly interests us first and foremost his mind it clear in own that by obtaining such an expresget quite .

sion

we have

merely,

at

bottom,

substituted

for

the

definition

of a

limiting process, a representation by means of another limiting process. The advantages of the latter, namely of the decimal form, are mainly that numbers so represented are easily compared with one another and that the error involved in terminating an infinite decimal at any given place is easily evaluated. Opposed to this there are, however, considerable disadvantages: the complete obscurity of the mode of succession of the digits in by far the greater number of cases and the consequent labour involved in their succes-

number by a given

sive evaluation.

The sc advantages and disadvantages may be conveniently illustrated by the two following examples: (l

-)

-i+] -y +-- = 0-785398. l-i+i--H----- = 0-693147... 1

..

the series, distinct laws of formation are given; but they afford us no means of recognizing which of the two numbers is the larger of the two, for instance, or what is its excess over the smaller number. The decimal fractions, on the other hand, exhibit no such laws, but give us a direct sense of the relative and absolute magnitudes of both numbers.

By

15 Indeed an infinite series our previous considerations give ample is one of the most useful modes of so defining- a confirmation of the fact number, one of the most significant both for theoretical and practical purposes. ld And only in special cases the expression in ordinary fractional form. The reason is always that of convenience of comparison; which, of -J^ or |$, is the larger, we cannot say at once, whereas the answer to the same question for 647 and 0-641 requires no calculation whatever.

34.

Numerical evaluations.

249

therefore henceforth reserve the term numerical evathe luation for expression of a number in decimal form. As no infinite decimal fraction can be specified in toto, it will

We

shall

be necessary to break it off after a definite number of digits. We have still a few words to say as to the significance of this process If it be desired, for instance, to of breaking off decimal fractions. indicate the number e by a two-digit decimal fraction, we may with the former, because the two equal justification write 2' 71 and 2*72, the latter, because it appears first decimals are actually 7 and 1, We shall therefore make the following conto involve a lesser error. vention: when the n specified digits after the decimal point are the actual first n digits of the complete infinite decimal which expresses a given number, we shall insert a few dots after the w th digit, writing for instance a

the nearest

w th

after the

when, however, the number is indicated by decimal fraction of n digits, we insert no dots

&

th but write 17 e. g. e 2-72, in the latter case the ;i digit th thus the w digit of the actual infinite fraction raised or

digit,

down

written

= 2*71...;

possible is

not by unity according as the succeeding part of the infinite fraction reth decimal place. presents more or less than one half of a unit in the w In point of fact, cither specification has the effect of assigning an In the one interval of length l/10 n containing the required number. the in the centre of the end hand is the left indicated, other, case, point interval.

The

margin, for the actual value,

is

the

same

in both cases.

On

the other hand, the error attaching to the indicated value, relatively to the true value of the number considered, is in the former case only and _? ]/10 n , in the latter to have modulus 5^ i/10 n . known to be I> We may therefore describe the first indication as theoretically the

and the second as

clearer,

practically

the

more

useful.

culty of actual determination of the digits is also in ticulars the same in both cases. For in either, it

The

diffi-

essential parmay become neall

cessary, when a specially unfavourable case is considered, to diminish w the error of calculation to very appreciably less than before 1/10 th the n can be determined. If we for digit properly are, instance,

= 5-27999999326 ...,

concerned with a number cc whether a 5'27 ... or 5*28

to determine two (retaining decimals), we have to diminish the error to less than a unit in the 8 th decimal place. On the other hand, if we are concerned with a number /? 2'3850000026 the choice between /?^2'38 and 2*39 would be influenced by an 18 th decimal uncertainty of one unit in the 8 place

=

.

.

.

=

.

.

.

,

.

17 In

a

e

=

2-71..., the sign of equality

may be

justified

as representing

limiting- relation. 18

The probability

of such cases occurring- is of course extremely small. to draw attention to the significance of these facts. In Kx. 131, however, a particularly crude case is indicated.

By mentioning them, we have merely wished

250

Chapter VIII. Closed and numerical expressions for the sums of 2.

Evaluation of errors and remainders.

When

series.

given a conver-

a n =s, we shall of course assume that the individual gent series terms of the series are "known", i. e. that their expressions in decimal form can easily be obtained to any number of digits. By addition, v

19 every partial sum s n may accordingly also be evaluated. The question remains: what is the magnitude of the error attaching to a given s n ? Here the word error designates the (positive or negative) number which

has to be added to

Since this error s w to obtain the required value s. equal to the remainder of the series, starting imth term, we will denote it by rn and the process mediately after the n of determining this error will also be designated by the term evaluation is

sn ,

s

i.

e.

is

,

of remainders.

In practical problems, evaluations of remainders almost invariably to one of the two following types:

reduce

=2

If s A. Remainders of absolutely convergent series. a n con' a of determine scries JE a terms, verges absolutely, capable positive n of summation in a convenient closed expression, and with terms not

less

than the absolute values of the corresponding terms of the given exceeding these by as little as possible). Obviously

series (though also

which is assumed known, thus provides a means of estimating the magnitude of the remainder rn , i. e. \rn \<^r n ', and this all the more closely the less a n exceeds \a n \. A particularly frequent case is that in which, for some fixed m, '

and every k ^>

1:

k,,

ffc

|^|* m

with

-a"

0
in that case, ot course,

and

in particular,

<

if

a <^ |:

KJ^KJ. The

absolute value of the remainder

is

in this

case not greater than

that of the term last calculated".

Remainders of alternating series. Given a series of the form n and supposing that the (positive) numbers a n form l) # w a monotone (decreasing) null sequence, we have (cf. 82, Theorem 5): B.

s

= 2(

< _ ln + 19

i

r

_

fl

_*

+

_

Or in more practical form: Up to what order of decimal does sw coincide with the required value s? 80 In forming- these estimates, it should be noticed that they give no indications as to the sign of the remainder rnt only as to its absolute value.

Numerical evaluations.

34.

Hence we may

251 same sign as

assert that the error rn has the

a smaller absolute value. neglected term, but has When neither of these two modes of procedure evaluation of remainders

is

usually

is

the first

applicable, the

more troublesome, and

becomes

it

We

shall, adopt special artifices in each particular case. then, designate the series considered as rapidly or slowly convergent, according as r does or does not fall within the desired limit of error

necessary to

n

for

moderate values 21 of n. A few further fundamental remarks may be elucidated by the We found 3. Evaluation of the number e. ^ e

^ JL wM_L

== iiJ_i_L_fJ__i. A h

^l!^2!

|_

3!^

. . . .

Already, on p. 194, we have mentioned that the (positive) remainder rn was less than the n th part of the term immediately before, so that

<<

s

s-

+ sn;-

In effecting the numerical calculations, we have now to take into account the following fact: When we express the individual terms of the series in decimal form, we have even at that point to break off the decimals at some particular digit, and we therefore incur a certain error. Unless n remains comparatively small, these errors may accumulate to such an extent that the whole calculation is in danger of becoming illusory. The mode of procedure is then as follows: Sup-

posing that

we

are retaining 9 digits,

a

+ a^

-|-

a

a

{

write

22

= = 2-500000000 = 166 666 667"

4

0,

a

we

(}

a1 8

a9 10

a^ ['i,

~

666667" 333333+ =- 0*.. 1388 889~ 0-... 198413=-0-.. .24802=-02756" =--0-. 41

=0-..

8

=0-

276-

--()

25 + 2+

=0<0'

0+]

Here the small -f- an(^ signs are intended to indicate whether the In either case error in the term in question is positive or negative. it is in absolute value less than one half of a unit in the last decimal place.

By

addition,

we

obtain the

number

2-718281830. 21

A more

82

an

is

precise definition of rapid convergence will be given deduced from <*_! by simple division by n.

in

37.

Chapter VIII. Closed and numerical expressions tor the sums of

252 But

and fall

last

series.

possibly (namely if all positive errors are nearly ones nearly }2 of a unit in the last decimal place) negative short of the number required by as much as | of a unit in the decimal place; or it may, on the other hand, be as much as jj of s 13

itself

may

all

a unit

since there are 7 negative and 3 positive errors. account the remainder, we can only deduce with

in

excess, also into

Taking

certainty, since s n

< e = sn + rn that < e < 2-718281832 ,

2-718281826

Our

.

secures only the first seven true decimals, while the approximate value 23 is obtained with eight digits: e f^ 2-71828183. In practice it will generally suffice to proceed a few decimal places further (2 or 3 at most) with the evaluation of the terms than it is desired to proceed for the sum. The number n of terms taken into account will be chosen so large that the remainder r n contributes at most one unit in the last decimal place considered. The error in the individual terms will then, in general, have no appreciable effect. But to obtain perfect security for the resulting- digits, it is necessary to proceed as described above. For we may retain a large

thus

calculation

of digits beyond the desired number in calculating the individual terms, yet as an error attaches to each of the decimals broken off and these errors accumulate, they may, in particularly unfavourable cases (cf. the example 01?

number

p.

some of the much earlier Evaluation of the number yt.

249), influence

digits

The chief means placed at our disposal, up to the present, for the evaluation of the number n, are the series expansions of the functions tan"" 1 and sin" 1 of these, the former has the preference, owing to its simple mode of formation. From this series, we deduced the expansion 4.

;

T w=sl ~~T + T --

'

1

which p.

numerical purposes is practically valueless. In fact, by say no more on inspection about the remainder r n in n+1 and is in absolute expansion, than that it has the sign ( l)

250,

this

for

we can

<

value

-

&n

be obliged

-f-

o

.

In order to secure 6

to take

n

> 10

for practical purposes,

fl

,

decimals,

we should

therefore

but an evaluation of a million terms

quite impossible.

The

is,

rapidity of the converEuler's transformation

gence may be increased very materially by 144, 2. In the next paragraph, we shall discuss the

utility of such Our present purposes of numerical calculation. to deduce more convenient series expressions for n directly

transformations object

is

from the

The

tan"" 1

for

series itself.

=~

series expansion for tan"" 1 \/

3

6

is

already of appreciable

use: this gives

fL^j_r 1 __i_ + _1 ___L _+_... ^ 6~~V~5l

23 Cf.

p. 249.

33^5-3*

7-3 3

i

J'

Numerical evaluations.

34.

253

The following mode of procedure, however, provides considerably more convenient series 94 .

The number a

= tan y ^ y ~ *

3.53

+5

y. 5 7 H

5^

.

easily calculated from the series itself (see below). of a, tan a | , and so _ 2 tan a 5 tan 2 a r- =^= TT> tan- a 1 1& is

For

=

this value

=

and 120

Consequently

4 a exceeds

by only a small amount.

-*-

*-

Writing

J=/,

we have ^ ^

t

Hence

ft

__~ _ism 4_o_--jan * ^L. 1-f tan 4 a tan i"w

_

JL

~~~

239'

can very easily be evaluated from the series

__

~

The two numbers a and

fi

I

I

tan _, _1 - __ JL 2 gg 23g

p

3-

,

239 3 ^

'

give us

146 If it be desired to obtain the first seven true decimals of n we may endeavour to attain this end by taking-, say, 9 decimals for each of the terms a scanty enough margin, for the errors incurred and for the remainder'26 on the numbers a and ft have ultimately to be multiplied by 16 and 4 respectively Denoting- the first series by ^i ^ + ^ft --[-> lne second by ' an<* tne corresponding partial sums by s and s ', the a 8 -{- a 6 [a/ v y ,

'

calculation proceeds as follows: <*!

a,

-

0200000000 OOOOOG4000 0-

aL

Hence,

-}-

a,

-f-

T>7

-

0002G66(>G7-

0000001829-

-

07- 0^00004057-

as the errors

= --

~|-

a,

+

u

-

0-

2002608498

change signs in a subtraction, Sll

=

0-

197 395 559 + + +

<

fn

<

1ft

and

<

10

10

Accordingly 3 24

158328936

a

<

3-158328970,

J. Machin (in W.Jones: Synopsis, London 1700). The result alone can show whether this suffices. In fact we do not know a priori whether we are not in the presence of one of the particularly unfavourable cases described on p. 249. 9 (G51) 26

'

Chapter VIIT. Closed and numerical expressions for the sums of

254

by 16 we have

for after multiplying

mal for

place,

16s n

we have

.

or

=

add

subtract

to

24 of these

units,

^=8

obtain

to

series.

units of the 9th deci-

bounds on either side

Since

finally to

ing bounds of 16 a.

add 2 units to the bound above, to obtain the correspondFurther = 0004 184 100 +

<

*/-

Combining the two

016736307 results,

we

= 0004 184 076*

a'

hence

< - 4 < - 0-016736302 ft

.

get

3-141 592629

< n < 3*141 592668

This brief calculation thus really gives us the seven

*=

3-141

5926

.

first

true decimals of n\

..

(The same procedure would only have secured six decimals for the approximate value; cf. calculation of 0, where circumstances, in this respect, were the exact reverse)

The series here utilized for the calculation of n are among the most convenient; by their means, a very much greater number of decimals may also be secured 28 with relatively small trouble, and we are therefore fully justified in regarding n henceforth as one of the ''known" numbers.

147.

The starting 5. Calculation of logarithms. culation of logarithms resides in the series

for

point

This series converges with considerable rapidity for

x

= \,

the

cal-

and

at

once gives

Denoting by bracket, we have

,

1

,...,

terms

the

of

the

series

inside

the

square

\

and .

.

.

i

[ill

i

A

....]

or i 1

0
The number n

(2n + l)

3->w +

l

i 1

9

Z*

8

<

~~

'

8

has been evaluated to 810 places of decimals (Mathematical

Gazette, Feb. 1948, p. 37).

Numerical evaluations.

34

Our calculations then proceed as an

for each of the terms

if

follows,

255

we again

take 9 decimals

-

= 0333 333 333+

a !

001 2 345 679+

a,

-0000 823 045+

^-0-... 4 fl fi

a,

065 321+

645+ -0- ...... 513+ -0- ..... 048+ = 0- ..... 005:=()... 00:>

0346573589

Whence

it

taking

follows,

signs:

log 2

into account

= 0-693 147 1

with seven decimals secured

other

*

=

log 2

and

-+-

^ 0-693 147 2

27 .

Once log 2 is evaluated, numbers involves very

gives, for

or

...

remainder and the small

the

the calculation little

of the logarithms of

all

In fact, our senes

further trouble.

-, ; '

therefore

log (p the (cf.

if

-(- l),

log

known

is

/>

(/>

= 2, 3,

.

.

.),

we

by the above formula. Moreover, since involves

expression above, case p

a series

is

^

the

value

r

,

converging very rapidly.

= 1)

so that the remainder

-=

obtain

of

-->> In

fact

already very small for quite moderate values

The rapidity of convergence of course increases when p is e. as soon as the first few logarithms somewhat larger values, given of n.

i.

have been successfully determined.

37,

1,

It

is

useful

evaluated; those of

Now

all

that

supposing of the

to

observe that by

need be prime numbers 2, 3, 5, 7, 11, 13, other numbers follow by mere combination.

only logarithms of

.

we have

effected

the

.

.

calculations for

the

four prime numbers, 2, 3, 5, 7, the labour in. logarithms volved in calculating the logarithms of further primes is small. Thus, for instance, taking

first

p

= 10,

we have

with

11-40' 27

The

series

1

the evaluation of this is

less

J-f-J

}+

number; even

its

for logf 2 is of course inappropriate for Enler's transformation effected in 144, 1

convenient than the series utilized above.

148.

Chapter V11I. Closed and numerical expressions for the sums of series

256

Thus already

for r*

n

< ^

= 3, -1 7-21 7 11-40

< ^

-

<^ 10-2 l

*-

20 R -2-ll-7

D

-7

<

*10 ia

ensuring a degree of approximation sufficient even for the most refined scientific needs. It would accordingly appear desirable to possess somewhat more convenient methods of calculation for log- 2, log 3, log 5, and also, at any rate, log 7. Diverse artifices may be applied for the purpose, all of which consist k as near as possible to 1, whose mainly in finding rational numbers

m

,

numerators and denominators are products of powers of these first four primes. If q of these primes have been utilized, q fractions will be needed to deduce For actually the logarithms of those q primes from those of the fractions. effecting these calculations, it is convenient to follow the method indicated

by Adams**: Evaluate the logarithms of

,

7

12O,

by means, not of the series ^r, ^<JTC Ov/

c just employed, but of the original series

25

.

81

/

4

/

1 \

4

N

16

1

1

b,

which here give

64

1

1

1

12O, a and

1

to the occurrence, in the denominator, of powers of 10, the calculation here becomes extremely simple With the aid of these logarithms, we then obtain, as may be verified immediately:

Owing

1og2=

It

we proceed .

lo K 3

=

logs

-mo*

11

~

/

e

+

-

log--- Slog 10

-4 to*

further to evaluate, as

126

IOff

we

71og-

8

\

2 + 5 log M "J+TidarjjJ.

we may 8

m

2^

with equal

83

"^~"^ + 1

1

facility,

"^~"f ""

f

also obtain

,n,

10

.,

25

01

81

,

12(5

*8

Proc. of the Royal Society, Vol. 27, p. 88, 1878. facility with which this calculation is effected may be seen by 126 following, which in 5 simple lines provides log -^~ with 10 decimals 29

the

39

83

The

secured:

0-008000000000 ...032000000 1706674-0001024 -00074-0-f

-0

logA- = 0-0079681696..,

34.

257

Numerical evaluations.

We

have thus, for the actual calculation of natural logarithms, a method which convenient and easily applicable in practice. Into further details of the computation of logarithmic tables we cannot enter in this place. is

Having obtained log 2 and log and hence, in

M= the

we have

5,

also the value of log 10;

= 0-434 294 48190

I log 10

..,f

"modulus" of Briggs' system of logarithms to the base 10, or by which the natural logarithm of a number must be multi-

factor

30

. plied to give the Briggian logarithm Once logarithms 6. Calculation of roots. no great practical importance attaches to the

simple methods of calculation

be quite brief in the following of convergence of the binomial series pidity

x

Now

diminishes.

problem of obtaining numbers. We

for the roots of natural

shall therefore

increases as

explanations.

the calculation of a

\

|

been mastered

have

The

power Vq

ra-

= qp

i

can always be reduced to that of a power of the form

some small

A

few

serve to illustrate the above.

examples may

for ^/2 the series expansion of

n

I

l)

(

*J

is

mation

30

fication,

that,

is

even

for

attained*11

.

may be

may remark

by

this time, for

-

3

a4 Clft

by which the

+

3

4-' 5

estimated by

remarkable base

0-... 15 0-

.

^+.

means

of the inequality

hence

e as the "natural" logarithms.

shewn by the following details: indeed without any error!

is

1-0101525445375 25 43

n' U*

first

we gave 149.

:

~

simply the calculation proceeds

= = =

On

in passing that we have certainly found ample justiwhat seemed at first the rather arbitrary designation

^ = 1 010 ......... a2

211,

with

small values of n, a considerable degree of approxi is even more effective if we write

We How

p.

,

The method

of the logarithms with the 31

+ #) p

constantly positive and forms a monotone decreasing

quence, the remainder rn

showing

^.

FM"?^) 1

2 50"*" 2-4 50'jn 2-4-6 50

"*"

5

Since

(l

value of \x\.

\/2"= 1-4142135623..., ^;!? o/D 10 decimals are thus already seemed. i

Chapter VIII. Closed and numerical expressions for the sums of

258

series.

or other similar expressions, obtained by taking* any rough approximation a to

^2

f~

Since a 2

in the first

and putting

second

1-41 in the

case,

J,

chosen to be very near 2, the quantity under the ^/~ Similarly, if we are already aware that

is

x with small \x\. we have only to write 1 -\-

t

to obtain, with the greatest ease,

an expansion of

y/3 to

is

y/3

of the

=

form

1*732

.

..,

50 or more places ol

decimals.

We

150.

may, without further explanation, indicate the examples:

Calculation of trigonometrical functions. The series expansions even greater rapidity than the exa; converge with ponential series, since only the even or only the odd powers occur 7.

of

sinx and cos

and these have, moreover, alternating signs. Accordingly, no special artifices are required; for angles of no excessive magnitude, the series furnish all that can possibly be desired.

in them,

To circular

tainly

measure.

< ou p-

-

.

sin 1

and the error

which

sml, we

determine, for instance,

last

We

have

this quantity

Denoting

=a r

n

~ may

expression

1

+ at

have

first

by

also, however, since sin 1

once be estimated

< 5^, ZoUU

cos

1

ccr-

this quantity

may

2

(p.

.

.

,

i.

1

250, B) by

Circumstances are similar in the case of cos 1; 2

e.

.

-- ---- = a - a + a --

15 already less than ^--lO"

is

in

a,

1

j

to express 1

= -^r = 0-017453292 lou

f r

n

= 2.

be obtained easily from the relation

= (1 - sin

2

1)* and cot a; are then obtained and 115, whose converor from their 116 division, expansions by when is small. is still sufficiently rapid quite gence |a:| These latter series also lead to useful expansions for the logwhich for practical purposes are of arithms of sino; and cosjc, by means

of the binomial series:

tana;

g 34.

Numerical evaluations.

259

We

greater importance than the values of sin x and cos x themselves. have 32 (cf. 19, Dcf. 12)

log sin x

= log x

-f-

^-^

log

= log x

-J-

I

--

cot x

1

dx

151.

and

similarly

116

from

r

- log cos *=

(tanxdx

J log tan

a;

and log

cot

may be

a;

= j?(-l)*-

^4^"^^;

1

J=l

<S/?-(//?J'

obtained from these by simple addition.

the convergence of these series, we can only state in the first instance that they certainly do converge for all sufficiently small values of \x\. However, the remarks of p. 237, footnote 4, show further

As regards

that the series in

151

has the radius

n

y

that in

152

the radius

^. u

Further details in the computation of trigonometrical tables will not be entered into here, as they do not concern the theory of inseries.

finite

In the cases pre8. More accurate evaluation of remainders. viously considcied, the sum of a given series was invariably deduced by evaluating suitable partial sums and estimating the error involved in the corresponding remainder.

obvious that

is

It

this

method

is

im-

practicable unless the convergence of the series is relatively rapid. If it be desired to evaluate, with some degree of approximation, for instance 00

this

direct

method

in the

margin we

of the

remainder

32

The

the series

The

33

pretty hopeless

allow,

we can

33 .

Even

we

if

as

only deduce,

are very cautious

an upper estimate

function in the square bracket has to be understood to stand for

115

function

is

1

is

after division

by x and subtraction of the foremost term

therefore defined and continuous also for

As we happen

to

know

that the

sum

is

,

its

#

=

.

x

0.

evaluation indirectly

by means of the value of JT is of course quite simple. But for the moment we are assuming that we know as little about this sum as e. g. about the sum

Chapter VIII. Closed and numerical expressions lor the sums of

260

the inequality

__ n

(n

+

____+ +

~~

1) (n

(n

1)

n

2)

series.

'

according to this, it would become necessary to calculate a million terms, in order to secure 6 places of decimals. This of course is out of the question.

may frequently be improved to some extent, possible to supplement the upper estimate of the remainder r n by a lower estimate, i. e. to deduce an inequality for rn of opposite sense to the above in our case. In our example, the same principle as that This state of things

if

is

it

already used gives 1

1

1 "

*

"

_____

l~

we

are thus able to assert that our

sum

s

satisfies

the conditions

every n. To secure 6 decimals, we may accordingly need only 1000 terms. This is still too large a number for practical purposes. But in special examples this method of upper and lower estimates for

Ex. 131) may lead to a satisfactory result. are, however, so rare, that they do not come into account for practical purposes. Greater importance attaches to methods for transformation of slowly convergent into rapidly convergent series, of the

remainder

(cf.

These cases

because they admit of a far wider range

methods we proceed

35.

these

Applications of the transformation of series to numerical evaluations.

In cases of slow convergence,

the given series into one with a of some suitable modification.

one naturally attempts

to

change

more rapid convergence, by means

We

the transformations discussed in

be

To

of applications.

to give our attention.

proceed

to

examine

33, so as to see

how

in

this

far

light

they will

of use to us here.

A. Kumtner's transformation. For this transformation it is immediately obvious whether and to what extent an increase in the rapidity of the convergence can be obtained by it. In fact, using the notation of 145, we have n=0 as (1 \

r-(t

wards) are

j

n=0

*0, the terms of the new series (from some index on-

/

less

than those of the given series.

The method

will

ac-

35. Applications of the transformation of series to numerical evaluations.

cordingly be

more

the

all

effective the smaller the factors

(

261

1

y

\

are,

from the

are to those of

2 an

new

We

found on are

series

I

+ 2) C

Proceeding

1

= J^ *-' n*

247 that

p.

1

153

-

V__ + ** n*

(n

--

-f-

.

The terms

of the

1)

asymptotically equal to those of the series

oo

thus here

2cn

-

Examples. 1.

)

a-n/

nearer the terms of

or in other words, the

first;

and y

r-

=

l

= t

*, /

1

Y

1

+ l)

(

1.1.

~ ^V __ n

(+l)( + 2)

1

=

"4

and so

manner, we obtain, at the

in this

\

1

~

i

.

.

/>th

stage:

,.

2

The

even for moderate values of p, shows an appreciably rapid

latter series,

convergence. 2. Consider the somewhat more general series

"

1

f

a arbitrary

-{=

-1,

0,

...

Here we take ^n

and we try 34

possible

.

to

= (w+y)a n -(w-|-l+y)fl nh l,

W

determine y (independent of n) so that

Here we have C = y a

c n is

=

2 .....

0, 1,

-

as near a n as

and a simple calculation gives y

~ ^

p

.

1

Hence we obtain

The expression -

Since, this

in the

large bracket

_

by simplification, the terms

in

w 8 and w a must disappear of themselves,

gives (2

If

we now choose y

is

?-!)"(

so that the terms in

n

- 1 -y) (K + + />)

also disappear, disap

then the expression in the large bracket above

i.

e.

take y = a-l

Q ^-/>

1

now becomes

34 The choice of a number c xn \-\ will, by 131, always n of the form xn prove most convenient, as in that case C at any rate may be specified at once and the choice still be so arranged that the c n 's are near to the a n 's.

sums of Chapter VJJ1. Closed and numerical expressions tor the

262

series.

and accordingly

3

The transformation

has the effect of introducing an additional quadiatic Particular cases:

thus

factor in the denominator.

=

a)

1.

p*

~ 1*~2*

Write

.

.

.

^""

r

2"(2>

- 1)^

(n

+ 1)

J .

.

.

(n

+ p)* (n

for brevity

~ i)'

M

the result then takes the form

p

_

_

~2(2p-

This formula enables

b) Similarly, for

us

a

1)

."l

easily

= y -

a

-"2

to

a .

.".

p

OH-

,

j

_

""

a

.

i)

2 (2 p

-

.T^T

^

1

'

1)

obtain very rapidly convergent series for

:

t

Li

This formula similarly leads to rapidly convergent series for ^S/6~^ri\a'

For further examples, see Exercises 127

seq.

B. Euler's transformation. Euler's

transformation

144 need

not by any

means

involve

35 of the series to which increase in the rapidity of convergence

applied. 06

For instance

154. 1

<2

*

V

the

transformation

of

n=0 n / 3 \ (--) 4 / , ^

35

which evidently has a

less rapid

/ 1 \

(-^-) Z >

it

an is

n

gives

the

series

'

convergence.

But even

'

The

vergence

explicit definition of 37: will be given in

vergent than

2a n1

what we mean by more or less rapid con' is said to be more or less rapidly con-

2a n

according as -

or

-*

+ oo

.

35. Applications of the transformation of series to numerical evaluations.

263

need not be an increased the indeed following three examples show convergence; rapidity that all conceivable cases may actually occur here: in the case of alternating series, the effect

of

00

(

*)

(

l)

n=o 00

2.

1

n

1.

J

n

J

n=o

1

1

S ives a more ra P icil y convergent

o^ J

^ 6

series with

same

the

-

series,

isn=u 4

z

of conver-

rapidity

1

1

gence, 3.

We

less rapidly

If-/* *

'(

n=0

convergent

-gJ

JJ d n=0 -^ -

-

series,

*

.

-

Jj

(j-)

vo/

n=0

now show, however, that such an increase in the rapiconvergence does result, in the case of those alternating n a n an series 0, whose terms, though not showing rapidity of convergence, still tend to zero in a particular regular manner, which shall

dity of the

2(\)

we proceed of

>

,

These are the only types

to describe.

any practical importance.

The hypothesis required will be form a monotone decreasing sequence,

A

rences

same

a n , but that the

A

(positive)

if

its

to

of alternating series

sequence a

be fully monotone

,

/>

QO

Theorem

1.

//

J^(~

n=0

numbers

the (positive] while,

quence,

from

series

transformed

the

,

all

n l)

1

an

first,

*

*

a"

.1

L~^^ n a

Q

=

7c

J an

an alternating

series

for

.

.

.)

which 15S

form a fully monotone null se

,...

-n

^s

have p-fold monotony positive, and it is said

0, 1, 2, , (k, n the theorem referred to is:

the differences

With these designations,

are positive.

diffe-

true of all differences of every order.

is

differences are

all

if

have positive first

e.

i.

fl,,0 2 , ... is said to

th

second,...,

first,

only the numbers a n

that not

^a>

(for

more

converges

37

every

rapidly

n)

,

than

then the

the

given

series.

The proof

is

M+1

As

very simple.

an

^ a,

Further, for the remainder r n of the given series n+1 r n (~l)

I

T
38

\-> i-= I

Cf.

^#

, 3

l

fA '

2

is itself

a

_i_/l ^w+l ~T ^J a n

Memoir

a n.

we have

= an ^ - an+2 + _...= A an+1 + A a n + A a M +

hence, since (A a v ) I

we have a n

.

,

monotone null sequence, A_ \

2

I

^A

.

fl

n+3 "T

\-

1

~"

2

^w+1

-* =

1

^ 2

of E. facobsthal referred to in 144.

37

This assumption is the precise formulation of the expression used above, The series will in that the given series should not converge particularly rapidly.

*_i.

luruicr

me wur*

uy r. v

.

runteici.

quuicu in IUUIHULC

*o.

27 (1\** '

264

Chapter VIII. Closed and numerical expressions for the sums of series. n

On

An

in particular

are

transformed

series,

all

A n a^

^> 0, the numerators form a monotone null sequence, and Consequently the remainders rn of the

the other hand, as /4 a of the transformed series also

]

'

a

'

<^ a

.

is

which, moreover,

a series of positive terms,

satisfy

~2

" " "

*n

~~2~*H-~a

I"

n

+2

"

4

2

*

\

we have

Consequently,

which proves our statement completely. Further, we sec that the the greater will be the increase in the rapidity of conis,

larger a

vergence,

i.

the

e.

r

more

'

>0.

rapidly will

In

particular,

*n

transform into series which converge with practically the \

we may

same

rapid-

n

all alternating series for which the ratio of two con, -g-J (1 secutive terms tends to 1 in absolute value; such series have usually a slow convergence. Examples. The two most striking examples of Euler's transformation, 1

-

(

l}

-

that of

W

n

and

'-

-

Dn

(

s Cl

-J- 1

Wr

j

+

>

1

were anticipated

in

144. For further appli-

know which null sequences are fully monotone. We connection, by repeated application of the first mean value theorem of the differential calculus ( 19, Theorem 8), the following cations

may

it

is

prove,

essential to in

this

theorem:

Theorem 2. A (positive) sequence aQ a^ ... is fully monotone decreasing if a function f (x) exists, defined for x 0, and possessing differential coefficients of all orders for a;]>0, for which f(n)=a n while the kth derived function has the ,

^

(- 1)*, (k = 0, 1, 2, Accordingly the numbers

constant sign

for instance,

form

fully

.

.

.).

monotone decreasing sequences; and from these many may be deduced, by means of the

further sequences of this kind

Theorem

numbers a a lt ... and b b l constitute fully monosame is true of the products aQ bQ a L b L a^ b The following formula holds, and is easily verified by induction 3.

// the

tone decreasing sequences, the

Proof.

,

,

,

.

.

.

,

,

,

.

.

.

relatively to the index k:

It

of

shows that, as required, all the differences of (an b n ) are positive, if those () and (bn ) are so. The following may be sketched as a particular numerical example:

The

series

g 35. Applications of the transformation of series to numerical evaluations.

265

has extraordinarily slow convergence; in fact, it converges with practically as small 2 1 In Yet by means of Eulers transformation, a rapidity as Abel's series (logn) If we use only the first seven its sum may be calculated with relative ease.

2

.

terms (to ---inclusive), we can deduce the first seven terms of the trans/ \ log lo formed series. If we use logarithms to seven places of decimals, we find, 88 for the sum of the series with 6 decimals secured, the value 221 840 .

As

choice

the

the

of

have

directing lines for

largely

not surprising

theorems as

general

on the rapidity

is

it

arbitrary,

to formulate

effect of the transformation

shall therefore

is

from which Markoffs

p. 241,

array (A),

was deduced,

we should be unable

that

.

.

Markoff's transformation.

C.

transformation

.

to the

of the convergence.

We

be content with laying down somewhat wider effective use, and with illustrating this by a few

to

its

examples Denoting as before by :

we choose

the terms

2z^

the given series (assumed convergent), column in our array (A) to be as

th

of the

near as possible to those of the given series, and at the same time a sum s (0 ^ which we can indicate by a convenient closed

to possess

expression; formation.

this

is

The

rapidly than 2z the choice of the

(1c) ;

the

to

analogous

condition

Rummer's

of

trans-

now certamty converges more proceed with this new series in the same way, for next column in our array, and so on. The effect

series

a o^)

2(z^

be similar to that of an indefinitely repeated the possibility of which was already inditransformation, the examples 153, 2 a (cf. Ex. 130).

of the transformation will

Rummer's cated in

00

As an example, we may take

I

-~

the series

,

which

is

practically useless

&=i* for the direct evaluation of its

sum

-.

Here we think

of

th

the

row and

b

column as consisting choice of the series

on

entirely of noughts,

--

5] K (K

-f-

The

which was already used

1)

247, then appears obvious enough.

p.

which we do not write down

for the first column,

This gives

2? <.-.,*) -2* As second column, we

and so 1 /e

3

The the

on.

_ "

The

k ih

row

_ + ___ + (k+ 0!

k

shall then, as in

1)

k (k

153,

1,

choose the series

_ __ __

of the array thus takes the 2!

![_ 1) (k

+

+

2)

k (k

+

1) (k

f-

form

2) (k

+

+

'

'

'

(k hxcd) '

3)

further calculations are, however, simplified by breaking off this series at th term and adding as # h term the missing remainder rk after l)

(k

38 This example is taken from the work of A. A. Markoff: rechnung", Leipzig, p. 184. 1890.

,

"Differenzen-

156.

Chapter VTIT. Closed and numerical expressions

266

which the series

now has

sums

loi the

The

regarded as consisting entirely of noughts.

is

/5

th

row

the form: 0'

*

....

^,__(^)'

~

Subtracting the terms of the right hand side from the

we

of series.

left

in succession,

easily find

___ ... (2

/*-!)*

In our case, the process of splitting up the scries

form (A) 1

=

^

into

an army

of

the

of p. 241 thus gives:

1

Since

theorem

all

OO

the terms

shows that we may sum

itself

ultimate result.

array arc g> 0, the main rearrangement

of this

Now

in the

in

columns and must obtain

n tb column we have the

series

'

By 132,3 sum

for

a

= n+l

and

the

_ n

Hence

the

n ih column has s

(n)

...

( k

n

_ J\ ;

J

for

the series

/?--=M,

in

- as

the

(nfixed)

-

square brackets has

1 '

(n -f 1)

sum

*

.

.

.

2~n

____ __ __ l)^n (n+ *

Ln a (n+l)...(2n-

1

j

1)

.

.

.

2 wJ

= 31

Therefore

we have

This formula is significant not only for numerical purposes, in view oi the appreciable increase in the rapidity of the convergence, but almost more so because it provides a new means of obtaining the closed expression for the

which we only succeeded in determining indirectly K the by using expansion in partial fractions as well as the series expansion of the function cot. In fact we can easily establish directly (cf. Ex. 123), that 123 implies the expansion, for x 1

sum

of the series

,

|

\

<

:

Exercises on Chapter ViTl. Putting

-~

x

we

,

267

once deduce 39

at

Li

y-L = 3 A tion

v(!Li

further application of fundamental importance of Markoffs transformaalready come across (v. 144) in Euler's transformation, which

we have

was indeed deduced from Markoffs. For further applications of Markoffs transformation we must refer to the accounts of Markoff himself (v. p. 265, footnote 38) and of E. Fabry (The'orie des Their success depends for the most series & termes constants, Paris 1910). part on special artifices, but they are sometimes surprisingly effective. Numerous examples will be found, completely worked out, in the writings referred

to.

Exercises on Chapter VIII. I.

Direct formation of the sequence of partial sums.

100.

+

+

a)

+ ....-

+

for

for

.is '

\x\
t

for

for a " positive "

)

When

g-ent

what

is its

1058.

does the series

a)

J tan- n^ = :

tan~ l

(hint

*

6 (6

every Ay >>0and^-

chung J?

and

a note by M

e=-^e

1918.

,

;

-

-

n

"

p 174.

,

1

n=i

Cf.

continue to converge for arbitrary a n

still

sum?

+ ij

tan~ *

I

~ ~ ~~ t

-

= tan~ x

-

-

_

,

6 (b

+

1) (6

+ 2)

is

divergent.

/.

Schur and the author:

.

]

n"J

w-f-1

r

6

-

'

1

'Cber die Herleitung der Glei-

Archiv der Mathematik und

Physik,

Sen

3,

Vol. 27,

268

Chapter VIII. Closed and numerical expressions for the sums of

105-

?";

)

(hint

tan y

cot y

:

= 2 cot 2 y)

scries.

.

let

'

ft- ft-

-

ft

denote fixed given natural numbers, all different, and a =)= 0, 2, ... any 1, real number, while g (x) denotes an integral rational function (polynomial) of We assume the expansion in partial fractions: 2. degree

<&

The given

* * "

v

La

-tr!

107.

sum

series then has the

a)

1

1^

i. 2 .6~7

~3-4

+

a-f- 1

8."9

__1 + 5.6 10-11

_+ _ ___ ~ _

I~2 4-5

3 4.6 7

1 I

I

G.7^5.6-8-9^"

+~~ + 5

+

=

i

+ ,

1 '

+

1-3-5

1

-.

2=1,2,3: i

i

i

i

+ -" ,

,

-

7 and

=

36'

~H

+ '-'-S^-T 10 ' 8

1

n;

6

1

3^14"^" fT)

. .

'

___i 36 5

l_^_-^ + nlp + _l

b>

gives for y

2 r(4T2MlT)

+T

1-8

'

>/

'*

a)

1

60

=

7

J

ff

2

"" J

2"

-

of closed expressions by means of the of elementary functions.

Determination 108.

~~

ir^ +

h> II.

+ 1)

H9\

60 \*

a

.

4""l 4

J

= JL/ ~

H

H

5. 6- 8- 9

!

*>

expansions

Exercises on Chapter VJI1.

_1

c)

L_.

^^-j~i"~~"o" -1 2

'

1

.__+...

1

1

XT

J\

+ __

269

V

'

^JL^-S);

-

1

'

JT

n =l( 4n3 -"^

'

a

a I

16

32-3g __

+

5

" j. 1

II"

1.2

"1

b)

__

7

__ -a.+

13

17

1-2 3

_._

....^.

4^3.4.5.6^4.5.6.7.8^

2-3

18

2'

e)

111.

If

we

!

write

, )

*

.

If

we

,

^2

^

\\rite

iniegers obtainable = 2, g'g = 5, . ..

then

jj f- ^ w -V ,V= ntlo V (^ + n

-

n=l MI

= gp

39

e, (p

=

5

1, 2,

by the symbolical formula

g

.

.

p+1

.),

,197

then the numbers jp are

= (1 + g) p

.

We

have ga

=

1

.

113.

x

may be summed functions

when

form of a closed expression by means of elementary a rational number. Special cases are:

in the

x\y

is

1

270

Chapter VIII. Closed and numerical expressions lor the sums of series.

=L J Tl -^-~~ x

114. Writing-

(x)

we

(|a:|
,

n=i

if

have,

denotes

(xn )

Fibonacci's sequence 6, 7,

-=

oo

And

we

if

s,

and

A=ia2 jb-i

We

\7

1

1)* -

^-!

ft

= 5 we ',

have

s 5

*~*

f

=^

_ 5

.

Exercises on Euler's transformation.

III.

115.

_ -

/

oo

1

write y,

have

(for

(-i"

what values

of #?)

*

,

= (-1)"

n=0 116.

v* If

we

put

,x

e

n=0

we have

A"

bn

In particular, therefore,

.

"*"'

n=l 117.

aQ

n=L

Quite special cases are:

What accordingly are the inverse 118. If A n a = b n then J n 6 = a n equations to those of the preceding- exercise? .

,

119. If (a n ) be a null sequence with (p

-f-

l)-fold decreasing

monotony

(p ]>

oc

the

sum

s

of the series

2

(

l)

n a satisfies the n inequalities

n

A

2

Use

-r

this to

~

a,

2^

^

^

2

2P

prove the equality

hm

n

x

^

2s

^

T

>.

2P

2^

1),

Exercises on Chapter VIII.

12O. we have

Use

If

s/c

and Sn denote the paitial sums

271 both the series in 144,

of

prove the validity of Euler's transformation.

this relation to

121. The following relations hold, if the summation on cither side is and the difference-symbols A operate on the taken to start with the index coefficients on the left, a/ ,&, + t respectively: _>fc

a-y n

*=(l-y )274 2* + = V i -y a z 1) ***+!

27(-l)*

b)

27 (-

c)

9

8

afc

*

e.

with

" an 27 A
'

122. Thus

Wllh

a .y ait

ll

f * witn

g^.

2

a:

9

2-

-

3"

Putting-

a;

=

series for

==

4

jt,

,

-,

,

O

-=-

,

f

,

_Q

,

this

...,

The preceding

=

-

5 tan" 1 -

-J-Stan-

124. Writing

V

1

series for tan- 1

convenient

others.

x may also be put

m

the form

2-4

y-'

1 ---

Spj we have

+ 54 + -..==l ...

h)

=

b)

52

= l;

d)

S4

+ ~S + ~56 + ...

=

t)

SJ

-^S +Is

4--.-

C

and

Other transformations of series. oo

Sa +5a

^,

the expansion

IV.

where

peculiarly

t <j

2

Hence deduce

1

i

i

_

a)

provides

f
as for instance

2 tan- 1 ---f- tan" 1 3 .

j1

J-

iTS'+s

;

^;

"2"^"""3' 58

-

a

4

...

4

4

6

- + ---

+ ----

denotes Euler's constant, defined in

128,2 and

Ex. 85

a.

Chapter VIII. Closed and numerical expressions

272

125. With

same meaning

the

-

/I {

T

1\^ =

r

TTT

\*+l

n

hm

.

,.

n

we have &a

of series.

as in the preceding* exercise, writing

and

b* k

)

2k)

Sp

for

sums

for the

S2 + ba 5J

=

H----

1

log

A.

(The existence of the limit A results from the convergence of the series.

have

A

=

__

%n \/

126. ~ ,

We

.)

i

r

= *'

_

i_

+ iji__

i

j_

,

" l

-

11

__

_

128. With reference

~ ^

"

<

3

n

<*

-

-

(

n

__ __

35 A, establish the relation between

to

~

1

an

I 3 + * + - I)

1

-

n-Si (n -f a -

>

/>

3

I)

.

.

.

(n -f o:

+ p)

and, by giving- special values to a and p, prove the following transformations:

V

JL

_" A 4. 8

=

9

_ ~

8 f,

n=l W

n+ (

_^

133

X)

8

"

_83 63<^

Evaluate the sum of the

129. Prove

'

1

+ 2.3 3+

1

-^

25 ''

3

4

4_

"5 __

3

n* (n -f

~

2^3* 35

n-l

I)

(n

1

n3

first series to

w (

+i

3

)

1

2)

M (

(n

3

-f-

3) (n

____

+ 2 3 (w + 3 )

8

+ 4)

'

"

)

6 places of decimals.

similarly the transformations:

_ 6 ..

__ ___

+ ^ ___ ~

6

'

(+!)

v-J _!._ '~

tl^r* i

4

Evaluate the sums of the series

a)

a

(-

i)"

nf, and b) to 6 places of decimals.

Exercises on Chapter VIII. 130. obtain

Denoting by TP the sum of the between Tl and T.2 jc + l9

a)

273

series c) in the preceding exercise,

Tz and T^+y. What are these the process &->QQ allowed in them? What is the transformation thus obtained? Is it possible to deduce it directly as a Marhoff transformation? we

relations

relations?

Is

We

b)

have

-

(

-

- 1) "~ t -

1

v

1

-a

(-!)"-'_

1

Give the form now taken by the transformations of the series for log 2 which were indicated in a).

-- -

Carry out the same process with the series

c)

J5~ ^ n logn

131. The sum of the series the

first

integer satisfying loga

^ 1-00000000.

n

;

.

.

.

or with

(Cf.

"' = 3814279-1 ... remarks on p. 249.)

132. Arrange

in

n

7*

(

Io 8s

n )rs

1

.

.

It suffices,

The

.?

e"'

=

e

(e

>

s

however,

5.)

problem requires

to one decimal place at least; to know that e'" ["'] - 0-1 ----

-

,

pt

,

...)

= (4,

then have

68,

from

order of magnitude all natural numbers of the form p q and denote the nth of the numbers so arranged

v(Cf.

starts

)

tl iat

(p lt

We

where n

solution of this

(p, q positive integers ^> 2)

by p n

.

1, evaluated to 8 decimal places, is exactly determine whether the actual decimal expan-

a knowledge of the numerical value of this is

log- 2

for

>

How may we

sion begins with

;

122

8, 9, 16, 25, 27, 32,

.

.

.).

Part

III.

Development of the theory. Chapter

IX.

Series of positive terms. 36. Detailed study of the In the

we

preceding chapters

two comparison

tests.

contented ourselves with setting Henceforth

forth the fundamental facts of the theory of infinite series.

we

aim somewhat further, and endeavour to penetrate deeper and proceed to give more extensive applications. For this purpose we first resume the considerations stated from a quite elementary standpoint in Chapters III and IV. We begin by examining in greater detail the two comparison tests of the first and second and 73), which were deduced immediately from the first kinds (7 main criterion (70), for the convergence or divergence of series of positive terms. These, and all related criteria, will in the sequel be expressed more concisely by using the notation 2c n and 2 d n to deshall

into the theory

note any series of positive terms known a priori to be convergent and divergent respectively, whereas 2a n shall denote a scries whose conalsoy in the present chapter, of positive terms only The criterion is can then examined. or 73 being divergence vergence be written in the simple form '

157.

an <:cn

(Ij

an


:

^dn

:

<3>.

terms of the series under consideration from and after a certain n, then the series will converge] If, on the other hand, they satisfy the second inequality, from and after a certain n, then it must diverge.

This indicates

that,

if the

satisfy the first inequality

The 158.

(H)

criterion

n

^

73 becomes :

in

the

same abbreviated notation

,

Before proceeding we may make a few remarks in this connexion. But let us first insist once more on one point: Neither these nor any 274

36.

of the

analogous

the question

of

Detailed study of the two comparison

275

tests.

criteria to be established below will necessarily solve convergence or divergence of any particular given

series. They represent sufficient conditions only and may therefore Their success will depend on the very well fail in special cases. d n (see below). The folchoice of the comparison series 2c n and lowing pages will accordingly be devoted to establishing tests, as

2

numerous and

as efficacious

as

bability of actually solving the

Remarks on

'

possible, so as to increase the problem in given special cases.

the first

pro-

159.

test (157).

comparison

1. Since for every positive number g the series necessarily converge and diverge respectively with n first of our criteria may also be expressed in the form:

2gc n and 2gd n 2c and 2 d n the

:

5^*(<+oo)

>g(>0)

,

,

S>

:

even more forcibly, in the form

or,

hm ?< cn 2.

-f oo

lim^>0 an

S,

:

we must always

Accordingly

hm

+ oo

== cn

S>.

:

have: lim

,

-

"-

=

otherwise expressed:

or,

a

lim-

lim

*== -[-oo "

is

a necessary condition for the divergence

=

3.

unique

Here,

n

necessary as

in

all

that

limits should exist.

follows,

This

may

n it

be

w

of ~fl w

,

2& n

*

convergence

not

necessary that actual inferred, to take the question

is

quite generally, from the fact that the convergence or divergence of a series of positive terms remains unaltered when the series is sub-

jected to an arbitrary rearrangement (v. 88). case be so chosen that the above limits do

2cn

+ + 5 +" J ~K* anc + l + 8+4~l~82~l~l6H

can be taken to be 2

The not

1

*

">

latter exist.

*

can in every For instance

~ a n to ^ e

^le

se " cs

'

obtained from the former by interchanging the terms in each successive pair; the ratio

cn

certainly

tends to no unique limit;

2

fact,

it

has

dn be chosen upper and lower limits 2 and |. Similarly, let and let 2a be the be the series 1 series ***, n | | |

distinct to

in

+ + + +

Chapter IX.

276

Series of positive terms.

deduced from the former by rearrangement,

this series

(in

odd denominators are followed by one even

one).

every two

~

Here

has the

upper and lower limits | and |. In a similar manner we convince ourselves by examples in the other cases that an actual unique limit need not exist. //, however, such an unique limit does

two

distinct

may

exist,

it

since

it

then equal to both.

is

No

4. In particular:

condition of the form

all convergence of 2a n remain greater than a fixed positive 0, by choosing only have lim dn

2 dn

is

-^

necessary

the terms of the divergent

unless

for the series

and lim,

necessarily satisfies the conditions indicated for lim

d.

=

For,

even

if

we

so that

=d

and writing a h

convergent series but

series a , n

c

n

is

it

1.

more

The

cn

c

is

f

i.

e.

defined and

2a n

is

we

evidently obtain a convergent

nJ

^ 0.

comparison

we

test II

= y < + oo,

marked

(3)),

ing from and after a particular n, and definite limit

of

159,

> 0,

or to -\-oo.

1 is fulfilled

may now be

established

have, from and after a definite n,

In particular lim

In the case

convergent

>0.

a monotone descending sequence, whose limit

is

(--) c \

the corresponding term cn of any

the second comparison test (158).

validity of the

+i

=

-~ does not equally evident that

concisely as follows: In the case marked (G),

_!L^>.JL

y

or

every other n,

for

Remarks on

160.

=

an

,

k

and

The comparison

is

159,

1,

monotone ascend-

accordingly also tends to a

In either case the condition lim

-,

n-

>

n

shows

this

K* J

and, by

that

2an

is

divergent

thus appears as an almost immediate to test I. If the convergence or divergence the comparison corollary of a series a n can be inferred by comparison with a (definitely 2.

test II

2

chosen) also i.

e.

series

2cn

or

Sdn

in

accordance with 158, then this may (or 159, 1), but not conversely,

be inferred by means of 157 if I is decisive, II need not be

so.

of this have already occurred in the pairs of series of

Examples For the 3.

159,

first

pair

we have

lim

= 2,

while

^

alter-

Detailed study of the two comparison

36.

natelv

~ 2 and

-= --,

e.

i.

is

it

o

JL Li , corresponding ratio C

sometimes

since

*

this

greater,

tests.

277

sometimes

less than the

=

constantly

pair of series represents an equally simple case. 3. This relation between the two types of

The second

~. 6

n

tests

comparison

be-

particularly interesting when we come to deal with the two tests 13 as immediate applications of the first to which we were led in

comes

and second comparison tests. These \\ere the root and ratio tests, inferred from I and II by the use of the geometric scries as com parison series, and they may be stated thus:

,-(^*
2.

shows

:

<S

:

3)

may very well fail when the there are obvious examples of given our remark 1. shows that the root test must

that the ratio test

root test applies (the series

On

this).

the other

necessarily work,

two comparison

hand

the ratio test does so.

if

tests

Theorem.

//

This relation between the

more

significant form by the expressed be as an extension of 43, 3. may regarded in

is

following theorem, which

have

2 an

x 19 x^ 9 ... are arbitrary positive terms, we always 161.

l H.

iVaL; Proof.

The

inner inequality

obvious 2

is

,

and the two outer

in-

equalities arc so closely similar that we may be content with proving one of them. Let us choose the right hand inequality and put

so that the statement reduces to

nothing to prove. an integer p, such is

1

This theorem

^i y&>

* or

"/*


Now

if

//

<

= + oo,

But, if // -f- oo, we may, given e that, for every v ^> p, we always have

is

of

the

tne rat i s

same character as 43,

~ ~

'

we

3.

In

assign

fact,

writing

1

w

are concerne ^

f parison of the upper and lower limits of yn and of yn = y y t ya For this reason, it is usual to write more shortly:

there

> 0,

.

.

.

*h a

yn

com-

.

fl

'

implying that in the centre, either lim or lim may be considered indifferently. will frequently be used by us in the sequel. 10 (G51)

Such an abbreviated notation

Chapter IX.

278 This

p

-f-

1,

n

..,

~

be supposed written down for every v f> , and we then multiply all these inequalities together,

may

inequality .

Series of positive terms.

1,

> p,

deducing, for n

Let us, for brevity, denote the constant number x then, for

n

>

We

>p that,

then have a

and hence

also

<

161, which 4.

J

by A\

.

/i'

n,

//

/i

+

e,

n

>

n

,

or, as asserted, since e is arbitrary, /i <[ /e

r

.

Moreover we can show by simple examples need not hold in any of the three inequalities equality

that the sign of

of

~

+ -0 %A -> p' + ~ We can therefore we have f// + ~J \ A < for every n>n + 6.

fortiori, for every

p. 68, footnote

(Cf.

(p,' -f-

we always have

/>,

But V0f-*l, and hence (// so choose n

*

is

10.)

now completely

established.

The preceding theorem shows

in

particular

that,

if

lim

~

n exists,

yxn must

lim

If

also

exist

and have the same value. Hence in form given in 76, 2, then so

the ratio test works in the

particular: will the root test,

To sum up: powerful than the root test. (Nevertheless it may frequently be preferred, as being easier of application.) the remarks 75, 1 5. In this place we have also to refer to

The

necessarily, (but not the converse!).

ratio test is theoretically less

and 76,

3.

37.

The logarithmic

scales.

We have already observed that such criteria as those just discussed only provide sufficient conditions and may accordingly fail Li particular cases. Their efficiency will depend on the nature of the chosen comparison series 2cn and 2d n in general terms we may say that a G-test will present a better prospect of success the greater the magnitude of the c n 's, a 3) -test, on the contrary, the smaller the magnitude of the ^n 's. In order to express these circumstances more ;

precisely,

we proceed

convergence:

A

first

convergent

to define series

less rapidly according as its partial

sum

the concept of the rapidity of be said to converge more or

will

sums approach more

or less ra-

of the series; and a divergent series will be said to diverge more or less rapidly in proportion to the rapidity with which More precisely: its partial sums increase.

pidly to the

The logarithmic

37.

scales.

279

=

=

' ' Given two convergent series 2cn s and cn s of positive terms, whose partial sums are denoted by s n and s n ', the ' rn sn rn ', we say that corresponding remainders by s n the second converges more or less rapidly (or better or less well)

Definition

1.

=

than the

first,

s's =

according as

lim^ r

=

or

lim-?'=+oo. rn

n

and has a

the limit of this ratio exists

If

,

finite positive value,

or

>

be known merely that its lower limit and its upper limit the then the two of series will be said to be convergence -f-cx), a In other case same kind. the any comparison of the rapidity of of 3 the series is of two impracticable convergence it

if

<

.

Definition 2. tive

terms,

2 dn

//

2dn

are two divergent series of posi-

whose partial sums are denoted by

the second is said to diverge

markedly)

more

or less

sn

and

rapidly

(or

'

sn

respectively,

more

or less

and

positive,

than the first according as '

s

=^ + oo

lira ,

and lower

the upper

If

and

'

'

s

lim -

Of

-

= 0.

*n

limits of this ratio are finite

then the divergence of both series will be said to be of the same kind. In any other case we shall not compare the two series in respect of 4

rapidity of divergence

The two

.

following theorems

show

that

the rapidity of the con-

>ergence or divergence of two series may frequently be recognised from the terms themselves (without reference to partial sums or remainders): c

Theorem rapidly than

1.

2cn

//

'

-^-

*0(+ oo),

'

converges

more

(less)

.

/

8

2cn

then

In the case lim

2c

Y - =

(>

0)

and lim

r

/

< -f oo (= + OO),

we might

also

'

n as "no less" ("no more") rapidly convergent than the speak of the series c n \ this however presents no particular advantages In the case of the series

S

and the upper limit -}-OO, the rapidity of the converlower limit being gence of the two series is totally incommensurable. A similar remark holds for divergence. (The student should illustrate by examples the fact that all These definitions may be directly the cases mentioned can really occur.) ' transferred to the case of series of arbitrary terms, replacing rn and rn by their absolute values. 4

The properties referred

to in these definitions are obviously transitive^ given scries converges more rapidly than a second, and this again more rapidly than a third, the first series will also converge more rapidly than the third. i.

e.

if

a

first

280 Proof.

n

> nn

\t

In the first case, given

<

we have cj n

n

c

',i

We

.

tends to

The second

0.

by interchanging the two series

This proves

was

all that

Theorem rapidly than

Proof.

2.

//

2 dn

we choose n

e,

so that for every

then also have

+c

+i

this ratio

Consequently first

Series of positive terms.

Chapter IX.

case reduces to the

the theorem of

(cf.

40, 4, Rem.

4).

required.

-,-

2d n

then

*0(-{~oo),

'

less

diverges

(more)

.

By 44,4

*0

follows immediately from -j~

it

that

This proves the statement.

163.

Simple examples. 1

y?

1.

^^

v. _1x _

yi ^/

J^ ,

2

The

series

1*

^^V 3-I

v. x1 yr

yr

^

^j 9n

,

,

qli

NT

V_

__

^J M ,> ^^


i

are such that each converges more rapidly than the preceding

1

have

e. g.

for

n>

3

^_ '

n\

to 0.

In fact

.

we

:

JL

which tends

n*

s-ss

L_^

9

3""!

-n

Similarly

->

(by 38,4); the other cases are even

simpler. 2.

The

series 7

1

~

-

are such that each diverges less rapidly than the preceding.

Besides the above simple examples, the most important cases of with rapidity of convergence forming a graduated scale are

series

afforded by the series which that paragraph, the series

we came

across in

14.

As we saw

in

y

~~/

a M)

converge for a

show more

>1

and diverge

converge or diverge less

>

for

when p

a <

1

.

Our theorems

1

and 2 now

each of these series will and less rapidly as the exponent a approaches the first case and <^ 1 in the second). Simi-

precisely that

is

fixed

1 in unity (remaining larly each of these series will converge or diverge less and less

ra-

The logarithmic

37.

281

scales.

5 increases, whatever positive value may be given to the ex1 in the first case, < 1 in the second).

pidly, as

p

ponent a

(>

of these statements perhaps requires some justith series with the exDivide the generic term of the (p l) th term the of series taken with the the a' corresponding by /> ponent obtain exponent a.

The second alone

+

fication.

We

In the case of

divergent series, tends to 0, q e. d.

ratio therefore

and

to

analogous the

>

both

a!

a,

and ef are positive and ^1; In the case of convergence, i.

the ratio tends to

1,

that

of

38,

we

4,

the e.

a

oo; in fact, by reasoning have the auxiliary theorem that

-f-

numbers (loRp

(\og p

form a

p any

null sequence,

positive integer.

flf

Kn

^ {log(lo

nf

gj>

(logp

n)}

nf

=a

1 denoting any positive exponent and This proves all that was required.

/?

m

The gradation the rapidity of the convergence and divergence of these series enables us to deduce complete scales of convergence and divergence tests by introducing these series as comparison series I and II (p. 274). form of the criteria: lowing

in the

tests

"= (1) ^ '

~

^-w

We

first

-^ I

*

lror

lrnr

-ML

immediately obtain the

fol-

with

~A

wi (\r\cr~\ ii\ '

I

vv J^^

fi>

164. logn

.,

with

These

be referred to briefly as the logarithmic tests also in the case p and second kinds Q. Their efficiency may be increased by the choice of p, and, for fixed p, by the choice of a, in accordance with our previous remarks 6 criteria will

=

of the first

.

*

For a

=

/?<0, each

series of course diverges

preceding one with the exponent replaced by

/?>>0, diverges more rapidly than e

1;

thus

more rapidly than the e.

g.

^

&

~

,

with

JSJ'

The convergence and divergence of series of the above type was known to N. H. Abel in 1827, but was not published by him (CEuvres II, p. 200). A. de Morgan (The differential and integral calculus, London 1842) was the first

282

Chapter IX. Series of positive terms.

For practical purposes it is advantageous to give other forms of these criteria. Such transformations are given below with a few remarks appended, but without completely carrying out the necessary calculations.

Transformation of the logarithmic tests of the When

1.

logan

-f log**

kind.

^

+ Iog n

+

!-

2

}

logyn

i

<;

-p<

\^0

log^ Denoting for a moment by

2.

st

b and log a 5C log & positive, the two inequalities a after a slight alteration the inequalities 164, I accordingly become:

a and b are

are equivalent;

(

1

An

the expression on the

:


:

S5.

left

of

(I'),

we

have,

in

hm A n <

(I")

<2

:

a test of practically the

same

Km ^ n >

,

The

effect.

:

>,

parts relating to convergence are indeed that relating to divergence is not quite

completely equivalent in (I') and (I"); so powerful in (I") as in (I'), since it is required in (I") that A n should remain, but greater than a fixed positive from some value of n onwards, not merely

=

7

number

.

both

A

we

If

3. (

*}

and

use the somewhat

A**

l) ,

we

more

explicit notation

An

A

(

\

and consider

obviously have

A

(p fl)

=

1

-

=

g~ - tends as n increases to -~^ -f oc this simple '\og v+1 n log(logj,w) If a the result: for transformation leads to particular p one of the limits following

And

since,

by 38,

A*

of

An

+

oc or

(

}

is

4,

different

from

zero,

it is

,

necessarily oo for the following p, in fact

p was positive or negative. More preA \ for we denote by fip and x v the upper and the lower limits of A n every p then if we have, for any particular />, x p ^ /i p < 0, we have x^ -= n v+1 == oo, GO according as the preceding

(

cisely, if t

and

if

Pj> If,

^ *P >

0,

we have

//+,

=

>

0,

we have

x p+l

=

x,, +1

==

+

oo.

however,

XP

<

0,

np

oo,

fi

p+ i

=

-f oo.

The

scales of reference (I) thus lead to the solution of the question of convergence or divergence if, and only if, for a particular p, the values y. p and have the same sign. If the sign is negative, the series converges; if positive, it

^

to use these series for the construction of criteria.

Essentially, these criteria are

consequences of 164, I and II; numerous transformations of them were subsequently published as special criteria, e. g. by/. Bertrand (]. de math, pures et appl., (1) Vol. 7, p. 35. 1842), O. Bonnet (ibid., (1) Vol. 8, p. 78. 1843), U. Dini (Giornale di matematiche, Vol. 7

It

Hm A n ^ positive.

would 0,

6, p.

166.

1868).

however, be wrong to write the last 25-test in the form without a single term being since the lower limit may very well be clearly,

The

37.

higher

and the

the two

if

diverges ; all

/>'s

283

logarithmic scales.

numbers have opposite

signs for

some value of

p, then for

we have

scale therefore

not decisive.

is

when both numbers

it fails

Similarly

are

zero for every p.

Transformation of the logarithmic tests of the 2 nd kind. The

1.

following

Lemma

,

Lemmas

For every an equality of the form 1.

are easily proved:

integer

/log,, (/i_- 1)\

\ holds,

and

We

^ 0,/or

^

1

'

every real a

and every

* a ____ ____ w n w ...

log

)

sufficiently large

n l

ri

log,,

bounded 8 The index n is here assumed to start with a value from the denominators are defined and positive. immediatelv infer that, for every integer p 0, for every real a and every

where

after

log,,

n

p

n)

(

which

is

.

all

^

sufficiently large n, }

"* l^jrl^J- 11. (]2?f

l

logn n

where (/)

log^^n n logti

wlogn

.

Let

2 an

and

2 an

f

the

convergent,

two

logf,_ 1

^ "JlV*

log p n

n log n

j

.

.

.

log^ti

w2

.

be two series of positive terms; if the series 4.

absolutely

.

9 again certainly bounded

is

Lemma 2. whose n^ term is

ts

.

\

aJ

,

are

series

given

either

both

convergent

or both

divergent.

In

fact,

we have yv> 1 for every down the relations

v\

taking, then,

any positive

in-

teger m, writing

for

j/

= m, m-fl,

...,

w

duce that the ratio *'/ 8

In fact

1, for

and multiplying them together, we at once den m lies between two fixed positive numbers.

>

An equality of the above form of we can consider the numbers #n n log n

.

.

.

course holds under any circumstances. as defined precisely by the equation:

logp n

The emphasis

lies on the statement that (
xn ) a

1

a xn

$,/

a; n

a

and

they are necessarily bounded, provided (#) bers yn are in absolute value |> 1 say. The interpretation in the case p

if

The proof is ob(#') and (#") are

Ic

is

a null sequence and the num-

,

is

immediately obvious.

Series of positive terms.

Chapter IX.

284 The conditions and -^-~

of the

Lemma

are

fulfilled, in particular,

when

the ratios -"-i*

between fixed positive bounds and the series J

lie

converges. 2. In accordance with the above we may express the logarithmic test of the second kind e. g. in the following form 10 :

n

n log w

nlog/t

n log n...

... log __itt p

'
simple transformation,

---- -f._ |f!iI_i-|--L-| n n

169.

'

L

'

-

log

M

n

--njl-wlogw ...log.n

L-

. . .

e

log

"1*

< or, finally, denoting the expression on the left hand side for brevity by and slightly restricting the scope of the 3) -test (cf. 165,2),

Tim'Bw

<0

:

}^_Bn

<5,

Remarks analogous to those of 165, 2 hold here. 3. The developments of 165, 3 also remain alterations.

if

For,

we

use the

more

>Q valid,

,

3).

:

explicit notation

/?n

with quite unessential

Bn

B^\ we

have ob-

viously

4-OO, we may reason with its analogue in 165, 3. It

And, as log;j + 1 n

this

same manner as with

relation in precisely the

unnecessary to develop this

is

in detail. 4. Still

more

generally,

^

e (a

~ 1)n

.

we may

at

once prove that a series of the form

n a (log n) ai (Iog3

a n)

.

.

.

a (Iog 7 n) *

converges '/ and only if, the first of the exponents a, a , a,, . , a q which differs from 1 is 1. The values of the subsequent exponents have no further When the comparison scries is put into this form, Raabe's test influence. th and the ( l) th terms ( 38) and Cauchy's ratio test appear naturally as the .

.

>

of the logarithmic scale.

38. The

Special comparison tests of the second kind.

logarithmic tests deduced in the

preceding

article

are un-

doubtedly of greater theoretical than practical interest. They afford indeed a more profound insight into the systematic theory of the convergence of series of positive terms, but are of little use in actually testing the convergence of such series 10

to

as occur in applications of the

Here we make the n th term of the investigated series 2'a n correspond th term of the comparison series, which, by 82, theorem 4, is l)

the (n

allowable.

285

Special comparison tests of the second kind.

38.

we have only sketched the considerations For practical purposes the first two or three terms, at most, of the logarithmic scales may be turned to account; from these we proceed to deduce by specialization a number of simpler and tests, which were discovered at various times, rather by chance, each proved in its own way, but which may now be arranged in reason

theory. (For this relating to them.)

one another. the logarithmic scale provides a criterion already estabFor p 11 We deduce it from 169, first in the form lished by /. L. Raabe closer connexion with

=

.

:

or,

we may now

as

write

-
:

e

:

s>.

more advantageously,

>

1

17

The tfery elementary nature and great practical utility of this makes it worth while to give a direct proof of its validity: (^-condition means that, for every sufficiently large n, terion

where

ft

=a

1

and therefore w

> 0. n+

1

cri-

the

Hence

is

monotone descending sequence,

the term of a

Since it is constantly positive, it tends to for a sufficiently large n. The series 2c n with cn a n an + 1 therea limit y 0. (n 1) n

=

^

fore

S an

181.

by

converges,

immediately follows.

Since

the convergence of a n <^ ~gC n ,

Similarly,

if

the

-condition

is

fulfilled,

we have

-

or

n-

w# n + 1

is the term of a monotone increasing sequence remains and therefore greater than a fixed positive number y. As

Accordingly

+ !>

,

y

> 0,

the divergence follows immediately.

the expression on the left in 170 tends, when n *+(X>, to it follows from the reasoning already repeatedly applied I, and I involves the convergence of that / 1 1, 76, 2) n conclusion. leads to no immediate while 1 / divergence, If

a limit (v. its

<

11

p. 63,

p. 214,

Zeitschr.

1832.

1839.

Cf.

f.

Phys.

Duhamel,

2a

=

u. J.

>

>

Math, von Baumgarten u. Kttinghausen, Vol. 10, C.: Journ. de math, pures et appl., (1) Vol. 4,

M.

-

Series of positive terms.

Chapter IX.

286

Examples.

we examined

the binomial series and were unable to decide there whether the series converged or not at the endpoints of the interval of convergence, that is, whether for given real as the series 1.

25

In

-

.4:0

We

were, or were not, convergent.

For the second

series

.!<-"(:)

are

now

able to decide this question.

we have

~

__

n

a

~

+1

n-f-1

Since this ratio is positive from a certain stage on, it follows that the terms then maintain one sign; this we may assume to be the sign -}-, since changing the signs of all the terms does not, of course, affect the argument. Further, ac-

cording to

this,

from which we at once deduce, by Raabe's test, that the second of our series -<0. For a = 0, the series reduces converges for a>0, and diverges for to its initial term 1.

For the

first

series

we have

and, since this value becomes negative from some stage on, the terms of the " ^" an alternating sign from that stage on. If now we seja^shave supple a-

we^lhefore have

>1 whenW we

The

ultimately the terms a n are non-decreasing.

inllr'that

must therefore^diverge. say for every n^>m t

If

however we suppose

9

a-f- 1

> 0,

we have

series

ultimately,

and the terms ultimately decrease in absolute value. By Leibniz's criterion for and negative terms, our series must therefore

series with alternately positive

we

converge, provided

can show that

tions (a) for m, m-\-\, ..., for every n ;>

n

l-ll|-

^0, and theref6re

If

we

II

f

1

-

,

by 126,

write

all

down

the

Jf I

J

(l j

together,

must converge.

2, 3,

diverges to

Summing

up,

rela-

we deduce

"

Since, however, the product

have the following

j-*0.

and multiply them

l

m

also

(

we

0,

a n must

therefore

results relating to the binomial series:

00

The

/cc\

series

J

n=o \ w ^ (

)

x n converges

if,

and only

if,

*

either |

|

<;

1

,

or x

=

1

287

Special comparison tests of the second kind.

38.

=

> 12 , or x +1 and a > 1. The sum of the series is then by Abel's theorem a // a is an integer and is non-negative\ then the series is finite of limits always (1 -f #) and hence converges for each x. In all other cases the series is divergent. (An appreciable and a

.

addition to this theorem

is provided by 247.) following criterion docs not differ essentially from that of Raabe; due to O. Schlomilch

The

2.

it is

:

In

fact, in

we

the case ($),

n+l

have, by 114,

an

from which the divergence follows by Raabe's

-

1

^e

>

test.

In

i

1

w

,

we

case (6)

have,

ultimately,

if

a

>a'>l. By

170,

this involves

in the logarithmic

If,

convergence.

we choose p

= 1,

we

a

obtain

second kind which, omitting the limiting case

terion of the

we may

scale,

cc

cri-

= 1,

write

171.

with

A follows

direct proof of the validity of this criterion can be given as As in the proof of Raabes test we first put the criterion in

the following form:

//

now

the G- condition is fulfilled} since, as

(n

we have

- l)log(n - 1) > - 1 + (n - l)logn,

a fortiori

wlognaM + 1

Accordingly

is

the term

quence and accordingly tends whose n ih term is

As

must converge. If,

(n

we may immediately

*

by 114, a,

verify

on

an

to

^>-jC n ,

the

monotone descending sey^O. By 131, the series

of a

a limit

same

is

true of

the other hand, the 3)- condition is fulfilled,

l)log(w

!)

2a n

.

we have

nlogn-an + a .

For

w>4-oo, 12

*

For a

however,

= 0,

see above

the expression in

square brackets

-*

(I*

Chapter IX.

Series oi positive terms.

(by 112, b), and is therefore negative for every sufficiently large n Hence for those w's the expression ttlogn*0n+1 increases monotonel> and consequently remains greater than a certain positive number y

^- w Jog- w

As a n -r.,i

> 0,

y

,

'

it

2 an

follows that

must diverge.

Here again we may observe, as repeatedly /

an tends

if

that,

<1

to

a limit

then

/,

/

involves divergence, while, from

>1 /

in previous instances,

convergence, and nothing can be directly

involves

= 1,

inferred.

Even

the

this,

first

properly logarithmic criterion of the scale, will

be actually applied in practice. In fact, the scries which are amenable to this test, and not already to a simpler one (Raabe's test, rarely

--

or the ratio test), occur exceedingly seldom; is

no more rapid than

that of

3J

M

a

and

as their convergence

these series are

(a>l),

,

(lOg W)

useless for numerical calculation. to deduce mention

enables us, however,

It

We

teria.

above

will

all

Gauss's Test 18 : // the ratio

172.

where I

and

> 1,

diverges

^^

one or two other

easily

can be expressed in the form

and (??n) is bounded*-*, then when cc < 1

2a

n

converges

The proof

is

immediate: when

and as now the

For

factor

follows: "// the ratio

a^l,

= 1,

n log n

in brackets

the series certainly diverges, by

Gauss expressed

cc

n

an

^>

1." 18

will converge

The

Raabe's test

Werke,

proof

is

proves

\

tends to zero since (A

1)

> 0,

somewhat more

special form as

b1

b^

<

I

and

an integer

diverge

when

b^

^

1)

&/

obvious from the preceding.

Vol. 3, p. 140.

Cf. footnote 8, p. 283.

itself

write

can be expressed in the form

when

in 1812.

"

a>l

171.

this criterion in

-~^

we

(k

2a n

when

.

the validity of the assertion.

then

cri-

This criterion was established by

Gauss

38.

289

Special comparison tests of the second kind.

Examples. 1.

Gauss established this

the so called

hyper geometric .

17278

>(y+"l)

= V ~ /?,

order to determine the convergence of

in

series

-

1.2

where a,

test

1-2... n

y are any real numbers

l5

different

from

0,

2 .....

1,

Here

which shows in the first instance that the series converges (absolutely) for j#|l. Accordingly it only remains to examine This is analogous to the case of the binomial 1 1 and x = the values x series, to which, of course, the present one reduces when we choose ft = y (= 1) a and x. and replace a and x by For x = 1 , we have **+ n+l .

This shows that for every sufficiently large w, the terms of the series have one and the same sign, which may be assumed positive. Gauss's test now shows 1 that the series converges for 1, i.e. for a y /?
+

verges for

For

a?

cc -f- ft

=

<

/ff

+

^> y

1, the series has,

negative terms, since

***

+ i ->

1

from some stage on, alternately positive and ,

i.

e.

is

ultimately negative.

The

with word for word the same reasoning as was employed in 170, binomial series, now shows that the hypergeometric series will

diverge when

converge when

a + ft a + ft

We

y y

> <

relation

1

for the

1 1

.

also diverges when cc + ft same reasoning as before.

have only to verify further that as this does not follow from precisely the every n p >- 1 we have

18

it

y

1

If

for

,

>

~ then,

1

+

with I

^n

|

<

^>

^r

every n t

2 assuming p chosen so large that p

Since on the right hand side we have the product of the first (n p) factors of a convergent infinite product of positive factors, it follows that |a n |, for all these values of n, remains greater than a certain positive number. The series can therefore only diverge. 15

For w

=

10

values, the series would terminate or become meaningless. general term of the series should be equated to 1. As before, (#) denotes a bounded sequence of numbers.

For these 0, the

290

Chapter IX. Raabc's 6- test

2.

fails if

Series of positive terms.

the

numbers

~~~*

~~r~~~

>

though constantly

=

1 -f

fjnj

have the value

1,

1

/? n

"

S an

In

.

fact, if

n

fi n

were hounded,

~~n~~n*

7~

39.

In that case, writing

have "

San

limit.

= -f CO

a necessary condition for the convergence of

\ve should

and

lower

for

the condition

lim n is

in the expression

<*n

would be divergent by Gauss's

Theorems

of Abel,

test

17 -

Dint and PrinffsJieim and

their

application to a fresh deduction of the logarithmic scale of comparison tests. Our previous manner of deducing the logarithmic tests invests these, the most general criteria yet obtained, with something of a fortuitous character. In fact everything turned on the use, as comparison which were obtained themselves only as chance

series, of Abel's series,

applications of Cauchy's condensation test. This character of fortuitousness disappears to some extent if we approach the subject from a different

direction,

involving a greater

Our

degree of inevitablencss.

starting point for this is the following

173.

Theorem

of

Abel and Dini ls

and

series of positive terms,

:

Dn = d^

If

j dn

is

n-l -f-

d^

-J-

an arbitrary divergent -f-

dn denotes

its

partial

the series

suniSy

_

dn

f

n =i

Proof.

=

i

"

I

+

cx)

>

1

a <^

1

when a

.

^n

i

h

J

As D,,->

converges

n=i D% diverges when In the case cc 1,

>

by hypothesis, we can therefore choose k

=

ft

n , for

each n> so that

17

"

Cahen, E.: Nouv. Annales de Math., (3) Vol. 5, p. 535. N. H. Abel (J. f. d. reine u. angew. Math , Vol. 3, p. 81.

proved the divergence of

*

n

J

1828) only

U. Dini (Sulle serie a termini positivi,

An-

1867) established the theorem in the above com1881 that writings of Abel were discovered (CEuvres 11, the theorem p. 197) which also contain the part relative to convergence of given above. nali Univ.

plete form.

Toscana Vol. It

was not

9.

till

Theorems

39.

by 81,2, the

series

2 an

The proof of troublesome.

its

We of

= 1,

must accordingly diverge when

and

>

1 is slightly more convergence in the case a at the same time prove the following extension,

>

JPringshehn: The

Dn

where d n and

have

same

the

174.

series

meaning as

before,

converges

for

0.

Choose a

Proof. suffices

291

may Pnngsheim.

Theorem

every Q

and Pringsheim.

when a<^l.

a fortiori

clue to

of Abel, Dini

that

P


It

then

prove the convergence of the above series when the ex-

to

is

ponent Q

number 6 r such

natural

=

replaced by T

Since, further, the series

.

1

Dn _

converges, by 131, since all positive,

it

would also

^D

+

-\-oo, and since its i n suffice to establish the inequality

_.

terms are

!_:

or

D' ^

that is to say, to prove that

a-*')

<x< - x) = (1 (1

x such

for every

that

Therefore the theorem

is

But

1.

this is

+x+

)(!

obvious at once, from

+ a;"-

1

).

established.

Additions and Examples.

Dn

175.

1. In the theorem of Abel-Dmi, we may of course replace the quantities ' by any other quantities Dn asymptotically equal to them, or for which the

D~

'

ratio

lies

some stage

between two fixed positive numbers, for every n

on).

By 70,4

(at least

the convergence or divergence of the series

from

2 a*

cannot be affected by this change. 2. By the theorem of Abel-Dim,

~v j" diverges with

2 dn

.

We may

--v .

dn

D.

enquire what

between the partial sums of the two Math. Annalen, Vol. 35,

t

p.

series.

329.

is the relation as to magnitude Here we have the following elegant

1890.

292

Series of positive terms.

Chapter IX.

Theorem 180

~~ -

//

.

'!

0,

we have

dA

I

The new partial sums thus increase

Proof.

It

a; n

ai

=-^->0, we

essentially like the

logarithms

of the old ones.

have, by y 1 112, b,

dn

*!-\ The undefined number D we here assume = 1, also replacing the above ratio by 1 for all indices n for which a;n = 0. By the theorem of limits 44,4, since + OO we then have log

>>

,

"

lg

7

This proves the theorem. Further, it is at once clear that in the statement of this theorem, the numbers Dn may on both sides be replaced by others D n f asymptotically equal to them. 3. These remarks now enable us to elaborate in the simplest manner the considerations indicated at the beginning of (his section: 00

a)

The

d nt with dn

series

n=l

=

l,

e.

i.

Dn

n, must be considered as the

D

n = n form the protosimplest of all divergent series, for the natural numbers type of divergence to 4-OO. The theorem of Abel-Dim then shows at once that the harmonic series C01 converges for for a 1 na di\

i-( =i

and the theorem

(cf.

in 2.

\ diverges

shows further that

<J

,

in the latter

case

we have

for

a

=

1

,

128,2). b)

Now

choosing for

2 dn

,

in the

newly recognised to be divergent by ' by n = logw, we conclude that

Dn

a),

theorem of Abel-Dini, the series and replacing, as

we may by Land 2.,

>

i

n

The theorem

in 2.

a

(log n)

C01 converges when ( diverges when \ din

a

>

1

a

<

1

.

shows further that

1.1.

.1

80

v. Cesaro, E.:

Nouv. Annales de Math.,

21

This condition

is

(3) Vol. 9, p. 353. 1890. the numbers d n remain bounded, hence in all the series which will occur in the sequel.

certainly satisfied

if

-

Theorems

39.

If

and quite independently of our previous

afresh,

Starting from, a suitably large index

n log n whatever value

a=

for

method

repetition of this extremely simple

By

c)

and Prmgsheim.

of Abel. Dini

.

.

when a

converges

when

\ diverges

a

> <

1

,

1

,

The partial sums of

given positive integer p. satisfy the asymptotic relation

1

we

obtain

the series 2a

the

to

is

(log^ n)

of inference,

results'

1),

-f-

a

logp _ t n

.

(ep

293

the

series

fm,

A

4. is

theorem analogous

Theorem rn

to

173, but starting from a convergent

series,

the following:

_l

= cn

-j-

cn

Dfnl.

of

+

1

+

Sc n

If

denotes

-

its

is a convergent series of positive terms, and remainder after the (n l y th term, then

v _n_ s v (c n

or

=

1

---- ) a -|

t

The divergent case

Proof. for

-{-

when

converges

Cn rn H

again

is

when

diverges

I

<

1

,

a :>

1

.

or

ea sily dealt with, since,

quite

v

,

_?*__ 4. ...

and for eveiy of ^, as r^

a

this will

(fixed) n,

-0.

By 81,2

fortiori

may be made

value

this

Z

by a suitable choice

must therefore then diverge.

the series

also be the

-

^>

since rn

case,

<;

is

1

for

a>

For

1

every sufficiently

large n. If,

however,

o:

<<

1,

we may choose

and it now suffices again because vergence of the series

rn

a positive integer p so that

<

1

for

n >> w x

-<

1

--

,

to establish the con-

-l

where

T

=

Now

.

2

tends monotonely to and consequently f> r is cer" ( n-i~" n) with It terms. therefore suffices to show that tainly convergent positive rn

that is to say

(i- y *)Pd-y) But the 22

latter relation is evident, since If

we

wiite

e

=e',

e

e

'

=


e",

.

.

.,

c'

^

=

we the largest integer contained in (<) , denominators of the terms of our series are from the value (^+1). (

aa

v.

footnote 18, p. 290.

<

1

.

c (|i+1)

may all

,

...

and denote by

(v) [fi

J

=^

say that the factors in the if n be taken to start

> 1,

Chapter IX. Series of positive terms.

294

40.

Series of monotonely diminishing positive terms.

Our

previous investigations concerned for the most part series of quite arbitrary positive terms. The comparison series used for the construction of our criteria, however, were almost always of a much simpler It in particular, their terms decreased monotonely. for such scries simpler laws altogether will become valid

nature;

may be

also simpler tests of convergence

We

have already shown in 80 that

is

clear that

and perhaps

constructed.

2

c n the a convergent series terms dimmish monotonely to zero, we have necessarily n c n ~> 0, a fact which need not occur in the case of other convergent series (even with Again, Cauchy's condensation test 77 belongs to positive terms only).

the series

We

we

if in

are considering.

one or two further investigations of this to deduce for such series a few very and at time the same very far reaching criteria. Their consimple we is often as shall see, very much more easily determined vergence, propose to

kind and, in the

institute

first

instance,

more general types

than that of

of series. CO

176.

24

The

!

2 an

be a given series of monotonely n=l If there exist a function f(x), positive and monotone

integral test'

diminishing terms.

Let

.

decreasing for x ^> 1 , for which

f(n) then

2a n

converges

are bounded*

Proof. for

if,

the

for

numbers

*.

Since,

for

1)<^<^A, we

(k

f(t)a k

have

an integer 2* 2), (A

,

it

f(f)^a

j(

,

follows (by

and 19,

20), that k

fc+l

! f(t)dt^a^ f

Assuming these

we

f(t)dt

(ft

= 2,

3f

...)

k-i

*

added,

every n,

7

*<*<* + !,

Theorem

and only

if,

an

written

inequalities

down

for

A

= 2,

3,..., n and

obtain

n+i

n

f(t)dt

,

+

94

Cauchy: Exerciccs

85

By 70, 4

8

+

mathem

+ ,

Vol 2

p 221.

Paris 1827.

be asymptotically proportional to the terms anl or that f(n} = cc n a n with a positive lower limit Instead of requiring- that /M should remain bounded, we can of for it

is

of course sufficient that f(n] should

.

op

course also require that J

/"(/)

di should

l

19, Def. 14) are exactly equivalent.

converge.

The two conditions (by

Series of

40.

From

the right

hand

295

monotonely diminishing positive terms. it

inequality

the

as

follows,

integrals

Jn

are

so are the partial sums of the series; from the left bounded, hand inequality the converse is inferred. This, by 7O, proves all that that

was

required.

Supplement. The

Jn

differences (sn

)

at the

and a r

decreasing sequence with limit between

same time form a monotone fact, we have

In

fH- 1

whence the statement The limit in question monotone decreasing.

^

sn follows, since a a Jn ^> a^ J, I> 0. therefore certainly positive, if f(f) is strictly

is

Examples and 1.

Illustrations.

This test not only enables us to determine the convergence of numerous

series, but is also frequently a means of conveniently estimating the rapidity of their convergence or divergence. Thus e. g. we can see at once that for

a

>

1

the series n vi

*

must converge, whereas n 00

n=l n

j A

/

-I

where / =

,

= log n

* + OO,

l

J i

But we learn further

must diverge.

ii< <

( J

i

n+l

that, for

a

>

1

,

nf k

n

^

i

^<J

f

+1

1^'

n

and therefore T

For a

= 2,

*

~

~~_i "^

j

was already established on p. 260. In the same way gives a fresh proof of the fact that the difference

this evaluation

the supplement to

176

the term of a monotone descending sequence tending- to a positive limit between and 1. This was Euler's constant mentioned in 128, 2. a 1 , the difference Similarly, the supplement also shows that when is

< <

i

is

monotone descending sequence with a positive <; a -< 1 particular (cf. 44, 6), for

the term of a

Therefore, in

and

it

is

limit less than

:

easily seen that this relation holds equally

when a

< 0.

1.

296

Chapter IX.

Series of positive terms.

More generally, from

2.

ifa=li logpi/( same method, the known conditions ot convergence and divergence of Abel's series. We have now three totally distinct methods of obtaining these. The supplement to 176 again affords us good evaluations of the remainders in the case of convergence, and of the we can immediately

partial

sums

in

deduce, by the

the case of divergence.

f(x) be positive for every sufficiently large x, and possesses, for those x's, a differential coefficient equal to a monotone decreasing (also posiat infinity, the ratio f'(x)lf(x) is also monotive) function with the limit If

3.

tone decreasing.

Since

f

tiw

j~JW it

d '~

follows that the integrals X

J

f

(/)

and

dt

Hence we conclude

are either both bounded or both unbounded.

and

2f'(n) will

either both

necessarily f(n)

that the series

J7-C'-

converge or both diverge. *-f-OO, we have f f \(n\ n' '

In the case of divergence,

V

convergent when a

when

>

1

.

[foolIn fact, here

L

i

/"(<)

whence the validity of the statement can be directly inferred. are closely connected with the theorem of Abel-Dim.

A

2.

test of practically the

integral calculus in

its

wording,

same

and independent of the

is

Ermakoffs 177.

scope,

These theorems

test 29 .

2

a n of positive, monotonely If f(x) is related to a given series diminishing terms, in the manner described in the integral test, and also satisfies the conditions there laid down, then l

f(x)

\ diverges

for every sufficiently large x. If we suppose the we have for these x's

Proof.

xx

86

9

first

of these inequalities satisfied for

Bulletin des sciences mathe"m., (1) Vol. 2, p. 250. 1871.

40.

Scries of

297

monotonely diminishing positive terms.

Consequently tx

- 0) (1

/

*

x

*[ /

f(t)dt

f(t)dt

XQ

jX

/

e

f(t}dt]

X

^^('S f(f)dt-S X

f(t)dt]

Xo

e xn

^*/ f(f}dt. x, t

X

Thus the

integral on the

and hence also

left,

J f(f)dt,

is,

for every

3*o

x>x

,

less

than a certain fixed number.

fore converge, by the integral test. on the other hand, we assume the If, we have, for these a;'s, for x afj,

The

series 2"

n

must

second inequality

there-

satisfied

>

A

comparison of the

On y

the

> 0,

first

and

third integrals

shows further

that

right hand side of this inequality, we have a fixed quantity and the inequality expresses the fact that for every w(>ar 1 )

we can assign

k n so that (with the

By 46 and 5O,

the

cannot converge * 7

same meaning

for

numbers Jn cannot be bounded and

Jn

as in

176)

2, a n therefore

.

Remarks. Ennahof/'s test bears a certain resemblance to Cauchy's condensation It contains, in particular, like the latter, the complete logarithmic comtest parison scale, to which we have thus a fourth mode of approach. In fact, the behaviour of the series 1.

nlogn is

determined by that of the

a? It is

but

it

makes

..\

ratio

not difficult to carry out the proof without introducing integrals, it rather more clumsy. 1

Chapter IX.

298

Series of positive terras.

<

>

1 1 , but tends to zero, when a Ermako/fs *-f-OO, when a. provides the known conditions for convergence and divergenc** of these series, as asserted 28 2. may of course make use of other functions instead of e x If q> (x)

As

this ratio

,

test therefore

.

We

.

any monotone increasing- positive function, everywhere differentiate, for which

> x always, the series 2a H will converge or diverge according as we have is

(

<.

1

5

l

for all sufficiently large x s

we have command

With Ermakoffs test and Cauchy's integral test, the most important tests for our present series.

over

General remarks on the theory of the convergence and divergence of series of positive terms.

41.

whole of the 19 th century was required to estabconvergence tests set forth in the preceding sections and to elucidate their meaning. It was not till the end of that century, and in particular by Pringsheini's investigations, that the fundamental questions were brought to a satisfactory conclusion. By these researches, which covered an extiemely extensive field, a scries of questions were also solved, which were only timidly approached before his time, although now they appear to us so simple and transparent that it seems almost inconceivable that they should have ever presented any 20 still more so, that they should have been answered m a comdifficulty pletely erroneous manner. How great a distance had to be traversed before this point could be reached is clear if we reflect that Eider Practically the

lish the

,

all about questions of convergence; when a he would attribute to it, without any hesitation, the value of the expression which gave rise to the series 30 Lagrange in 17 70 31 was still of the opinion that a series represents a definite 32 To refute the latter value, provided only that its terms decrease to O

never troubled himself at series occurred,

.

.

= 0, if we interpret log^x to mean e*. This also holds for As a curiosity, we may mention that, as late as 1885 and 1889, memoirs were published with the object of demonstrating- the existence 28

29

vergent series 80

Thus

J

c * for

-"-^" 1

which

cn

in all seriousness

did not tend to a limit! (Cf. 159,

he deduced from

-

-

1

x

=

1 4-

x

-f-

several of con3.)

x2 -f-

,

that

and

l=l o Cf the

first

few paragraphs of

81

V. CEuvres, Vol.

ia

In this,

59.

3, p. 61.

however, some traces of a sense for convergence

may be

seen,

41.

General remarks on series ot positive terms. the

to

assumption expressly by referring

fact

time already

that

(at

299

appears to us at present known) of the divergence of J? superfluous, and many other presumptions and attempts at proof current in previous times are in the same case. Their interest is therefore for the most part historical. A few of the questions raised, however, whether answeied in the affirmative or negative, remain of well

,

A

for us to give a rapid account of them. conproportion of these are indeed of a type to which anyone occupies himself much with series is naturally led.

interest

sufficient

siderable

who

The source

questions which

the

of all

we propose

discuss

to

Those which are necessary

resides in the inadequacy of the ciiteria.

and

sufficient for convergence (the main criterion 81) are of so general a nature, that in particular cases the convergence can only rarely be ascertained by their means. All our remaining tests (comparison tests or trans-

formations of comparison tests) were sufficient criteria only, and they only enabled us to recognise as convergent series which converge at least

The

as rapidly as the comparison series employed. arises

Does a

1.

This question

which converges less rapidly than any other/ already answered, in the negative, by the theorem

series exist is

In fact,

4.

175,

question at once

:

when Zc n converges,

so docs

2c n

'

=

2 -r -* though, V r

2c n

obviously, less rapidly than

The

who

question

is

takes the series

the ratio c n

'' = VV

as c :c n n

,

'

= r_

n-l

l

> 0.

answered almost more simply by

~c n n-1

'

= ^(l/rn _

+ Wn

*

V

1

r n ).

Since

The accented

0.

/.

cn

Hadamard 2

= rn _

1

*',

rw ,

conver-

series

ges less rapidly than the unaccented series. The next question is equally easy to solve: 2. Does a series exist which diverges less rapidly than any other? Here again, the theorem of Abel-Dini 173 shows us that when 2dn diverges, so does

'

In fact as d n

the negative. for

2dn = 2j~>

each given divergent

:

dn

'

series,

an d hence the answer has to be in

= Dn

*

-|-

oo, the theorem

another whose divergence

provides, not so

is

rapid.

These

show

circumstances,

together

with

our

preliminary

with

all series.

remarks,

that 3.

No comparison

test

can be

Closely connected with this, and also answered, by Abel**: 83

Actti ).

f.

effective

we have

the following question, raised*

mathematica, Vol. 18, p. 319. 1894. reine u. angew. Math., Vol. 3, p. 80.

d.

1828

178.

300

Series of positive terms.

Chapter IX. 4.

Can we

a/) P~ r n &n n aw

b)

*

find positive numbers pn , such that, simultaneously, I tj A 3 ., f convergence \ \ are su'ff t cient conditions for \ T } a J divergence J .

.

.

.

'I

^ >

.

Vy;y possible series of positive terms? It again follows from the theorem of Abel-Dini that this

o/

the case.

In fact,

diverges,

ily

if

we

put a n

= --, a > 0, r

and hence so does

But, for the latter,

pn

an

/

an

the series

^0n

is

not

necessar-

/I

'^~

>

where

sn

=a

+ #n

L -}-

.

=~^0.

The object of the comparison tests was, to some extent, the construction of the widest possible conditions sufficient for the determination of the convergence or divergence of a series. Conversely, it might be required to construct the narrowest possible conditions necessary for the convergence or divergence of a series. The only information we is necessary for have so far gathered on this subject is that a n > It will at once occur to us to ask: convergence. tend to zero with 5. Must the terms a n of a convergent series any particular rapidity? It was shown by Pringsheim** that this is not the case. However slowly the numbers p n may tend to -{- oo, we can invariably construct conveigent series 2 c n for which

KPn C n= + 00

'

Indeed every convergent series -Tc /, by a suitable rearrangement, will 36 cn to support this statement produce a series Proof. We assume given the numbers p n increasing to -|- oo, and the convergent scries 2c n'. Let us choose the indices x n 2 ..., odd and such that n 7

2

.

,

,

,

and

.

,

.

.

let '

us write c n

= cj

r -i,

in their original c/, But c n '. arrangement of c4

y

...

filling in

order.

Pn

whenever n becomes equal

to

C

the remaining c 's with the terms n

The

series

2 cn

is

obviously a re-

n>*

one of the indices n 9

.

Accordingly, as

asserted,

The underlying or a sequence of the

fact in this connection is

form (pn

to

c n)

bears

no

simply that the behaviour

essential relation to that of

Math. Annalen, Vol. 35, p 344. 1890 Theorem 82, 3, which takes into account a sort of decrease on the average of the terms a n 86

Cf.

,

General remarks on series of positive terms.

41.

2 cn

301

the sequence of partial sums of this though not the former, may be fundamentally altered by a rearrangement of its terms. is necessary 6. Similarly, no condition of the form lim p n dn

the

series

with

e.

i.

since

series,

the

latter,

>

2 dn

however rapidly the positive numbers p n for divergence of 37 to On the contrary, every divergent series 2d n ', increase -f-oo may its tend terms to becomes, on being suitably rearranged, 0, provided Q. a series dn (still divergent, of course) for which \imp n d n the

,

.

2

The proof is easily deduced on the same lines as the The following question goes somewhat further: Does a

7.

comparison tests exist which is sufficient for Given a number of convergent series

scale of

More

cases?

all

preceding.

precisely:

v

-^ r

^y Crn

(i)

n

>

each of which converges

(2) '

'

>

^y Crn

(*) >

'

'

less rapidly than the preceding, with e. g.

>

()

+ ao,

for fixed k.

(The logarithmic scale affords an example of such sible

7s it posseries.) construct a series converging less rapidly than any of the given The answer is in the affirmative 38 The actual construction

to

series?

.

With a

of such a series is indeed not difficult.

n 19 w 3

indices

is

itself

,

...,

w ,..., the

of the kind required.

large that the series

if

we

denote by

2 c^ \

for every

k

n I> n l

w^n >w fc

r^

We

fc

>

.1

need only choose these indices so

the remainder,

we have

,

^. Wt i* ->

-

suitable choice of the

series

fe

rn

^

after the

n th

(3) <[ -^ with c n 2

^^ <

*

term, of

(l) ^> 2 cn

-^ o ^ -^

M W

M "

y (3 ^ r n

02

M W

r (3) C tt

n

w

C^'<~

n

c^ >2cn w

, (

A|

The it

series c n is certainly convergent, for each successive portion of (fc) is certainly less than the belonging to one of the series -2*cn 87

J. is

Pringsheim, loc.

cit. p.

357

For the logarithmic scale, this was shewn by P. du Bois-Reymond (J. f. reine u. ungew. Math., Vol. 76, p. 88. 1873). The above extended solution due to /. Iladamard (Acta math., Vol. 18, p. 325. 1894). 88

302 remainder of

<

Series of positive terms.

Chapter IX.

(k

^

this

= 2,

3, ...).

with

starting

series,

On

> n q (q > k)

n

that was required. more slowly than all the

all

We

8.

term,

i.

e

we have

+ OOJ obviously

^>

2*

This proves

*.

In particular, there are series series of our logarithmic scale 39 .

converging

show, quite as simply, that, given a number of di(k 1, 2, ..., each diverging less rapidly than \ &

may

vergent series

initial

the other hand, for every fixed k,

2--* in fact for

same

the

=

2dn

^

the preceding, with, specifically, d n diverging divergent series

2

+1)

-f-d n

less

(fc)

say, there are

+0,

rapidly than

every

always one of the

2 d^

series

'.

All the above remarks bring us near to the question whether and what extent the terms of convergent series are fundamentally dishn guishable from those of divergent series. In consequence of 7. and 8., we shall no longer be surprised at the observation of Stieltjesi to

an arbitrary monotone descending seDenoting by (e l , e 3 .) a with limit 0, convergent series 2c n and a divergent series quence 9.

2dn

,

.

.

can always be specif ied, such that

monotonely, p n

= --

>

-f-

cn

= en dn

==

n=l also

divergent

*0

divergent.

By

if

series

ff

whose partial sums are the numbers p n the theorem of Abel-Dini, the series

is

The

oo monotonely.

en

In fact,

.

^

is

,

therefore

v P+I""P + ii i

But the series

2cz==2s d^~y]\\

)

"^""^

**

"Fn

4-

is

1

convergent by 131.

The

following remark

is

only a re-statement in other words

of

the above: 10. However slowly *+oo, there is a convergent series 2c n n and a divergent series 2 dn for which ^n pn cn two the remarks due to Pringsheim, given in 5. In this respect, and 6., may be formulated even more forcibly as follows:

=

89

The

missing- initial

replaced by unity.

Urms

of these series

.

may be assumed

to

be each

General remarks on series of positive terms.

41.

303

However rapidly 2cn may converge, there are always divergent indeed divergent series with monotonely diminishing terms of limit 0, for which 1J.

series,

2 dn

Thus

must have an

However

rapidly

2 dn

may

We have

2 cn

of terms

essentially smaller

Conversely:

.

diverge,

2cn

are always convergent series

of the

number

infinite

than the corresponding terms of

provided only dn

which

for

there

scries

2 dn

= +00.

lim^

Here a

only to prove the former statement.

*0,

form

V

d =-

4-

-4-

-1-

,1

I-

,1

-

-\~

-

-

,1

,1

,

4-

-4-

is of the required kind, if the increasing sequence of indices n ... I9 w 3 be chosen suitably and the successive groups of equal terms contain n1 ), (n 3 ~ w a ), ... terms. In fact, in order that respectively n 19 (n. this scries may diverge, it is sufficient to choose the number of terms in each group so large that their sum 1, and in order that the sebe monotone, it is sufficient to choose quence of terms in the series so that r c nk > n k ^ l 1, 2, ; n large 1) as is always _ (ft ,

>

nfc

possible, since c n it

follows that

*0.

As

= 0,

km n

<

=

.

. .

=

,

n/

j

has the value

the ratio

-

n

for

=n

k

,

as required.

In the preceding remarks we have considered only convergence or divergence per se. It might be hoped that wiih narrower requirements, e. g. that the terms of the series should diminish monotonely,

a correspondingly greater amount of information could be obtained. Thus, as we have seen, for a convergent series 2c n whose terms diminish monotonely, we hiwe nc n *0. Can more than this be asserted?

The answer 12. there

for

is

in the negative (cf. Rem. 5): the positive numbers

However slowly

are

always convergent

series

of

+

oo, p n may increase to monotonely diminishing terms

which

n Pn

cn

not only does not tend to 0, but has

+00

for

40 upper limit

.

40 Pnngsheim, loc. cit. In particular it was much discussed whether for convergent series of positive terms* diminishing- monotonrly, the expression nlogn>cn must -*(); the opinion was held by many, as late as I860, that n log n*c n * was necessary for convergence.

Chapter IX.

304

The

is

proof

again

Series of positive terms.

Choose

quite easy.

n

indices

<

n.2

<

such that

(*=1,2,.

P*,>** and write

=

c

= ...==

ca

=

c ni

1

-^

"'

,

>M'YC i

The groups 2

2*

>*

of terms here indicated

On

was

the other hand, for each

required,

limn-pn .c n These remarks may

13.

possible

2c

the series

of

2"

converge.

so that, as

sum

to the

>

contribute successively

directions.

so that this series

= w,

n

we have

= +00. be multiplied and extended in

easily

They make

,

less than

it

clear

that

it

all

quite useless to

is

of a boundary between was suggested by P. du BoisReymond. The notion involved is of course vague at the outset. But in whatever manner we may choose to render it precise, it will never correspond to the actual circumstances. We may illustrate this on the 41 following lines, which obviously suggest themselves

attempt to introduce convergent and

anything

of

divergent series,

the nature

as

.

a)

to

no

As long

as the terms of the series -S"c n

restriction

of assuming

all

-

lim -^ an

(excepting that of being

> 0),

and

2 dn

the ratio

aie subjected

~

is

capable

possible values, as besides the inevitable relation

=

we may

also have

lim-^ an

= +00.

The

polygonal graphs by which the two sequences (cn) and (dn ) may be represented, in accordance with 7, 6, can therefore intersect at an indefinite number of points (which may grow more and more numerous,

to an arbitrary extent). 41

A

detailed

and careful discussion of all the questions belonging to the submentioned on p. 2, and also in his writings Munch. Ber. Vol. 26 (1890) and 27 (181)7),

ject will be found in Pringsheim*s work in the Math. Ann. Vol. 35 and in the

to

which we have repeatedly

referred.

42.

Systematization of the general theory of convergence.

305

b) By our remark 11, this remains true when the two sequences and (cn ) (dn ) are both monotone, in which case the graphs above referred It is therefore certainly to are both monotone descending polygonal lines. not possible to draw a line stretching to the right, with the property that

every sequence of type (c n ) has a graph, no part of which lies above the line in question, and every sequence of type (dn ) a graph, no part of which lies even if the two graphs are monotone and are considered below this line,

only from some point situated at a sufficiently great distance to the right.

Notes 11 and 12 suggest the question whether the statements

14.

made remain unaltered if the terms of the constructed scries 2 cn and 27 dn are not merely simply monotone as above, but fully monotone

there

in the sense of p. 263.

This question has been answered in the affirmative

by H. Hahn^.

42.

Systematization of the general theory of convergence.

The element

of chance inherent in the theory of convergence as rise to various attempts to systematize the criteria

developed so far gave

from more general points of view. The first extensive attempts of this made by P. du Bois-Reymond 43 but were by no means brought to a conclusion by him. A. Pringsheim** has been the first to accomplish this, in a manner satisfactory both from a theoretical and a practical stand-

kind were

,

We

point.

propose to give a short account of the leading features of the

developments due to him

and the

.

All the criteria set forth in these chapters have been comparison tests, their common source is to be found in the two comparison tests of first

and second kinds, 157 and 158.

=
(I)

is

45

s

e>

The

an

former, namely

^dn

:

V,

undoubtedly the simplest and most natural test imaginable; form

not so

that of the second kind, given originally in the

42 f.

//.

Math.

Hahn, Dber Reihcn mit monoton abnehmenden Ghedern, Monatsheft

u. Physik, Vol. 33, pp.

43

J. f. d.

44

Math. We have

45

121134,

1923.

reine u. angew. Math. Vol. 76, p. 61. Ann. Vol. 35, pp. 297394. 1890.

1873.

all the more reason for dispensing with details in this connexion, seeing Pringsheim's researches have been developed by the author himself in a very complete, detailed, and readily accessible form.

306

Chapter IX.

Series of positive terms.

In considering the ratio of two successive terms of a series we are already going beyond what is directly provided by the series itself. might therefore in the first instance endeavour to construct further

We

types of tests by means of other combinations of two or more terms This procedure has, however, not yielded any criterion of the series. of interest in the study of general types of series. If we restrict our consideration to the ratio of two terms, it is possible to assign a number of other forms to the criterion of the second kind; e. g. the inequalities may be multiplied by the positive still

We

shall return to without altering their significance. these for relatively unimportant transformations, Except must regard (I) and (II) as the fundamental forms of all

factors a n or cn this point later.

however,

we

46 All conceivable special comconvergence and divergence will tests be obtained by introducing in (1) and (II) all conceivparison able convergent and divergent series, and, if necessary, carrying ovit transformations of the kind just indicated.

criteria of

.

The task of systematizing the general theory of convergence will accordingly involve above all that of providing a general survey of all conceivable convergent and divergent series. This problem of course cannot be solved in a literal sense, since the behaviour of every series would be determined thereby. can reduce it endeavour to to factors in themselves easier to only survey and therefore not appearing so urgently to require further treatment.

We

and this is essentially the starting point of his that a systematization of the general theory of convergence carried out when we assume as given the totality of all

Pringsheim shows investigations

can be fully monotone sequences of (positive] numbers increasing

Such a sequence

will

principle,

the

problem

+00.

be denoted by (pj; thus

< Po ^ Pi ^ P2 ^ In

to

solved

is

Pn -*

and

by the

two

+ following

simple

remarks: a)

series

Every divergent

2dn *zpo + (Pi

n=0 (each

in one

type (p n ).

is

JP

)

2 dn H

is expressible in

h (Pn

and only one way) in terms

of

the

form

Pn-l) H a suitable sequence of

Also, every series of this form is divergent.

46 Thus since (as seen in 16O, 1,2) (II) ultimately from (1) that all the rest follows.

is

a consequence of

(I)

-

it

V

^

/ C c= /

I

(each in

type

is

*

1

1

!

1

I

Q

{

-

expressible in the

-

+./ ^\P n I

*

form \ I

+ ,

*

Pn+l)^

one and only one way) in terms of a suitable sequence of Also, every series of this form is convergent.

w ).

(

2c n

47

Mi/ - + ^ - - \i+ P,)^ Pj \P

~\P

H

series

Every convergent

b)

307

Systematization of the general tneory of convergence.

42

when

In fact,

these statements have been established,

only to substitute, in the

two comparison

tests (I)

and

we have

(II),

respectively for c n and d n > to obtain in principle all conceivable tests of the first and second kinds: All particular criteria must necessarily follow by more or less obvious transformation from the tests so obtained; for this very reason, the former can never present anything fundamentally new. They become of considerable importance, howthat they give deeper insight into the connexion between the ever, and state the latter in a coherent form, and also apply criteria various

m

them in practice. Herein lies the chief value of the whole method. It would accordingly be well worth our while to describe the details of the construction of special criteria exactly; but for the reasons given, shall abide by our plan of giving only a brief account.

we

The

and b) must be regarded as undoubtedly 180. for convergent and divergent series. But we can obviously replace them by many other forms, thereby altering the outward form of the criteria in various ways. For instance, by the theorem of Abel-Dini 173, 1.

the

typical

forms

a)

imaginable forms

simplest

diverge with

2(p n

/> n -i)>

while at the

same

time,

by Pringsheim's

theorem 174,

2~n-~^-

and

2 -",,

With a few restrictions of little importance, all for Q > 0. series are also expressible in one of these and convergent divergent

converge

new

forms. 2.

Since the only condition to be satisfied by the numbers p 9 forms of divergent and convergent series which we are

in the typical 7

48

them

all from some stage on. oofs of these two statements are so easy that

Unless the terms are

The

pi

further.

we need

not

go

into

308

Chapter IX. Series of positive terms.

considering, is that they are to increase monotonely to f- oo, we may of course write \ogp n iog 2 /> n ... or generally F (p n ) instead of /> n where and increasing monotonely (x) denotes any function defined for x ,

,

,

F

>

+0

(in the strict sense) to

with

This again leads to

x.

criteria

which,

though not essentially new, are formally so when the /> w 's arc specially chosen. It is easy to verify that the first named types of series diverge or converge more and more slowly, as />-> oo more and more slowly;

+

we therefore by replacing p n successively e. g. by logp n Iog 2 /> n 4a criteria The n scales case p n obtain a means of constructing of on of its account the peculiar simplicity; naturally calls for consideration ,

,

.

.

.

,

=

.

development of the ideas indicated above for 37 and 38. the main contents of

particular case forms

this

3. A further advantage of this method is due to the fact that one and same sequence (p n ) will serve to represent both a divergent and a convergent series. The criteria therefore naturally occur in pairs. E. g. every comparison test of the first kind may be deduced from the pair of tests:

the

<; 'Pn

~

PnPn-l n

= .

and similarly

The

4.

for other typical

right

hand

* Pn-l A.-I

forms of

sides can

series.

be combined to form a single

disjunctive

we

introduce a modification, arbitrary in character in so far as it is not necessarily suggested by the general trend of ideas, but otherwise of a simple nature. We see at once, for instance, that the series criterion, if

_

Pn

n

>

^

] 1 and diverge when a For the first of these scries when a the proof has just been given; and the second has all its terms less than the first if a 1, while if a 1, and hence for all a 2> 1, it is immediately

converge

.

=

>

seen to be divergent. The pair of criteria set up in be replaced by the following disjunctive criterion:

49

The

usual passage from

arbitrary step, of course.

Between instance

e.

g.

p n and

e**^ which

3.

may

accordingly

is again quite an . . , step natural, however. could easily introduce intermediary stages, for

pn direct to log pn Iog 2 pn Theorems 77 and 175, 2 render the

log/> n ,

,

we

,

.

in fact less rapidly than /> n> yet more rapidly any fixed positive power of p n however small its exponent, than every fixed positive power of log p n however large its exponent.

increases less rapidly than ,

,

Systcmatization of the general theory of convergence.

42.

and, in

essentials 50 , also by:

all

-i

.,

with

(>1 {>! ^

remarkable that in the

is

It is

all.

-**-*and

(cc~

p )

p n -j), and hence

2(p n

for arbitrary

H

GC

+

should be monotone. In

sufficient that (p n )

ded, the convergence of

:

criteria of convergence arising through + oo is no longer necessary

these transformations, the assumption p n at

a

e

:

1

I

It

309

> 0,

fact,

it

*

that of J

(p n )

-

follows from that of (p n ),

are also bounded sequences.

These convergence

is

-

boun-

and

as (p~

a )

tests 51 thus

possess a special degree of generality, similar to that of Kummers^ criterion of the second kind, mentioned below in 7. as indeed in general from any 5. From this disjunctive criterion others may again be deduced by various transformations, criteria so obtained can be new only in form. For these the though transformations we can of course lay down no general rule; new ways criterion

may always be found by skill and intuition. This the great number of criteria which ultimately remain

is

the reason for

outside the scope

of

any given systematization. It is obvious that every inequality may be multiplied by arbitrary positive factors without altering its meaning; similarly we may form the same function F(x) of either member, provided F(x) be monotone

in particular we may take logincreasing (in the stricter sense), E. of cither side. etc. roots, arithms, g. the last disjunctive criterion the form be into therefore may put

or

^# !*/__ P f

V

We

see at a glance that

work

===

n

:

&

-Pn-l\ by

this

means we obtain a general framewere set up by

of the preceding sections which or == log n.

for the criteria

assuming p n the

n

L

50 The equivalence is not complete, i. e. with the same sequence (pn ) as basis, new criterion is not so effective as the old one; in fact, the divergence of

-

5?

"" ,

for instance,

may

be inferred from the old criterion, but not

Pn from the new one 61

Pnngsheim: Math. Ann Vol. 35, p. 342. 1890 f. d. reine u. an^ew. Math., Vol. 13, p. 78. 1835 ,

62

11

Journ.

(o5l)

310

Series of positive terms.

Chapter IX.

same remarks remain

Substantially the

6.

"" *

stitute

for cn

Pn'Pni of the

terion

and p n

second kind

p n -i

dn

f r

valid,,

m me

when we

sub-

fundamental

cri-

or perform any of the other typical way we obtain the most general

(II),

substitutions for c n and dn there. In this form of the criteria of the second kind.

We

1. may observe (cf. Rem. 4.) that here again, after carrying out a simple transformation, we may so frame the convergence test that it combines with the divergence test to form a single disjunctive criterion. The convergence test requires in the first instance that, for

every sufficiently large n, or

If

here

we

~

replace cn by

j>~^"

^ie

f

rmer

an

pn-1

inequality reduces to

-Q

.

'

p n cancels out, the typical terms of a divergent series automatically appear, so that the convergence test reduces to

as

or /o

.

if

Finally,

we

take into account the fact that

with

2dn

Now

the original criterion

,

2 Q dn

(Q

>

0) diverges

the criterion takes the form:

_i n

is

certainly satisfied a n+\

an

by the assumption

n -^ *t> v O* -^ tf **>

cn + l

thus appears that in this form slightly less general than the the form of convergence test, it is absolutely indifferent original whether a convergent series or a divergent series is introduced as comparison

It

series.

Hence,

still

of the criterion

we may

write:

more

may be

generally, the cn 's

and dn 's

in the

above forms

replaced by any (positive) numbers bn ; thus

Exercises on Chapter IX.

This extremely general criterion On the other hand,

is

due

^

to E.

311

Kummer. 181

( 3)

represents a disjunctive criterion of the second kind which immediately follows, as the part relative to divergence is merely a slight transformation of (II) All further details will be found in the papers and treatise by A. Pringsheim. The sequences of ideas sketched above can of course lead only to criteria having the nature of comparison tests of the first or second kinds, though all criteria of this character may be developed thereby. The integral test 176 and Ermakoff's test 177 of course

could not occur in the considerations of

this

section, as they

do not

possess the character in question.

Exercises on Chapter IX. 133. Prove

in the case of

each of the following series that the given

indications of convergence or divergence are correct:

'

2-4... (2n)

>2 <2

d)

e/

v(__i___lo g -!^^l>) ^-j

7*i _L_ i \

/o

-

_i_ 1 \

:

:

C,

:

S>;

S;

/^nrzriT

was given by Kummer as early as 1835 (Journ. f. d. reinc u. angew. Vol. 13, p. 172) though with a restrictive condition which was first recognized as superfluous by U.Dmi in 1867. Later it was rediscovered several 68 It

Math

,

1888, to v.olent contentions on questions of O. Stoh (Vorlesungen liber allgem. Arithmetik, Vol. 1, p. 259) was the first to give the following extremely simple proof, by means of which the criterion was first rendered fully intelligible:

times and gave rise, as late as priority.

Direct proof: The

It

criterion

is

that from

some stage on

follows in particular that the products an bn diminish monotonely and

therefore tend to a definite limit

y>0. By

thus a convergent series of positive terms the corresponding terms of ~a n this series ,

131,

And is

as

(<*& its

an + ibn + i)

is

terms are not less than

also convergent.

Chapter X. Series of arbitrary terms.

312

134* For every

fixed p, the expression

n \

Cp when n > -f- oo integer for which log p n^>l.

has a definite limit the

first

135* For every

fixed Q in

when w

has a definite limit y

136.

If

<< g

#->?,

it

-f

,

<

summation commences with

if

the

1

the expression

,

OO.

follows that

where p, />', and q denote given natural numbers. and if the 137. If 2dH is divergent, with dn -> we have ,

Dn 's

are

its

partial suras

r=l

138.

when

If

p-a>pn

139.

If

2a n

has monotonely diminishing terms, it is certainly divergent for a fixed p and every sufficiently large n.

^ < dn
two series

for every n, the

are convergent, for every Q ^>

.

14O. Give a direct proof, without the use of Ermako/f's

test

and without

the help of the integral calculus, of the criterion

__ 2a.2W

<1 l>2

for series of

141.

If

:

J

~^

:

monotonely diminishing terms the convergence of a series 2an follows from one of the criteria 164, II, then, as n >-}-oo,

of the logarithmic scale

[n log n loga n

.

.

.

log k n\-a n ->

and diminishes monotonely from a certain stage on, whatever the value of the positive integer h

may

be.

Chapter X. Series of arbitrary terms. Tests of convergence for series of arbitrary terms. With series of positive terms, the study of convergence and divergence was capable of systematization to some extent; in the 43.

case to

of

series

of

be abandoned.

arbitrary

terms,

The reason

lies

all

not

attempts of so much in

this

kind

have

insufficient de-

43.

Tests of convergence for series of arbitrary terms.

velopment of the

as

theory,

essence

the

in

of

the

313

matter

itself.

A series of arbitrary terms may- converge, without converging abso1 Indeed this is practically the only case which will interest us lutely .

here, as the question of absolute convergence reduces, by 85, to the therefore need only consider study of a series of positive terms.

We

the case in which either the series

gent or its absolute convergence the previously acquired means.

actually not

is

absolutely conver-

cannot be demonstrated by any of If a series is conditionally conver-

gent, however, this convergence is dependent on the mode of succession of the terms as well as on their individual values; any comparison test which we might set up would therefoie have to concern the series

and not merely its terms individually, as before. This means that each series has to be examined by itself and we cannot obtain a general method of approach valid for them all. as a whole,

ultimately

Accordingly

more is

we have

be content

to

The

restricted field of validity.

the formula

known

+

<*0

^

criteria

with a

<*1

.

// a Q ,a 19 ...

and

= An

H-----h

b Q , b^, ... denote

("

Proof.

k 0)

and every k^>l,

We

have

by summation from v follows

=n

-\-

1

to v

n

-f-

k,

the statement at once

3 .

The formula continues

1.

Supplements.

we put

A_i = 0.

to

hold

when n=^

1,183,

1 The case in which the series may be transformed into one with positerms only, by means of a "finite number of alterations" (v. 82,4) or by a change of sign of all its terms, of course requires no special treatment.

tive

2

182.

n+fc

n+fc

if

establish

as

Abel's partial summation 9 arbitrary numbers, and we write

then for every n

to

chief instrument for the purpose

Journ

1 It

is

f. d. reine u. angew. Math Vol. 1, p. 314. 1826. sometimes more convenient to write the formula in the form

n + fr-1

n+k

^ v=n M

a v bv

^-

^ n

f

^v(V-^ + i)~^A* 1

Chapter X. Series of arbitrary terms.

314

If c denotes an arbitrary constant, and

2.

n+k

E

'

we have

v

v

= E AJ (b - b - AJ b n+1 + A'n+k n+1 = A A _i = A A _^ a, 6,

l>+l )

v

v-w + l

also:

.

b n+1e+l

v

f

'

for a v

A = A + c,

n+k

v

v

v

v

Accordingly, in Abel's partial summation we "may" increase or diminish all the A^s by any constant amount. This is equivalent to altering a Abel's partial summation enables us to deduce a number of tests of a v b v almost immediately 4 . In the convergence for series of the form .

2

first

provides the following general

it

place,

Theorem.

184.

1) the series

2)

lim Aj>

p >+x

Proof.

-

The

2A b p+1

series

2 ab

exists.

summation

Abel's partial

k

k

Za

certainly converges, if

v

b v+l ) converges, and

(b v

v

bv

v

= 2A

v

(b v

'=0

v-^O

gives for n

=

1

- b, +1 + A k b M )

:

,

+

for every fcJjgO; making &-> oo, the statement follows, in view of The relation just written down shows further that the two hypotheses.

= +I b v+1 = (b = 0. only s

Sa

where

v

In particular,

bv 5

2A

s,

=

5'

and

if,

s'

v

v

)

if,

s',

lim

A9 b

M=

/.

/

The theorem

Ea

series

v

bv

,

does not solve the question as to the convergence of the since it merely reduces it to two new questions; but these

The result is in any case a far-reaching us enables it and one, immediately to deduce the following more special which are criteria, comparatively easy to apply. are in

many

1. is

Abel's test

monotone 4

cases simpler to treat.

6

6 .

and bounded 7

Za

v

bv

is

convergent if

2a

v

converges

and

(b n )

.

We

can of course reduce any series to this form, as any number can be Success in applying the above expressed as the product of two other numbers. theorem will depend on the skill with which the terms are so split up. 6 Abel's test provides a sufficient condition to be satisfied by (6n), loc. cit. in order that the convergence of 2 a n may involve that of Z an b n J. Hadamard .

1903) gives necessary and sufficient conditions; cf. (Acta math., Vol. 27, p. 177. E. B. Elliot (Quarterly Journ., Vol. 37, p. 222. 190(5), who gives various refinements. 6 In anticipation of the extension to complex numbers (v. p. 397) it may be emphasized already that a sequence of numbers assumed to be monotone is necessarily real.

A

7

In other words: convergent series "may" be multiplied, term by term, by Theorem 184 and the criteria factors forming a bounded and monotone sequence. deduced from it all deal with the question: By what factors may the terms of a convergent series be multplied so that a convergent series results? And by what factors must the terms of a divergent series be multiplied, so that the resulting series

may be

convergent?

Tests of convergence for series of arbitrary terms.

43.

Proof. By hypothesis (A n ) and

On

(b n ), (v. 46),

and hence

also

315

(A n

n+1 ),

the other hand,

b v+1 ) is by 131, the series (b v and indeed as its all terms have the absolutely convergent, convergent, same sign, in consequence of the monotony of (b n ). It follows, by 87, are convergent.

2,

EA

that the series

v

(b

b^ +l ) is also convergent, since a

lt

The two

certainly bounded. sequence av bv and fulfilled accordingly is

S

is

convergent.

Dirichlet's test 8 Za v b v sums and (b n ) is a monotone null

2. partial

convergent

conditions of theorem 184 are

is

.

2a

convergent if

v

has bounded

sequence.

same reasoning as above, 2 A v (& b v+l ) is conb as is is a null bounded, (A n n+l ) (A n ) sequence if (b n ) vergent. Further, The two conditions of 184 are again is is, i. e. it certainly convergent.

Proof. By

the

fulfilled.

3.

Tests of

2a

a)

v

bv

is

du Bois-Reymond* and Dedekind

2 (b

convergent if

^.+i) converges absolutely

v

and

av

converges, at least conditionally.

Proof. By bounded.

tainly

(*o

ZA 1

87,

2,

(b v

- *i) + (*i ~ *2) +

tends to a limit

when n ->

+ GO,

and the existence of lim

thesis,

b v+l ) also converges, as (A n )

-

v

is

-

-

+ (ft-i - 6) = *o - bn

so does b n

A n b n+1

itself;

lim

An

exists

by hypo-

follows.

Z

2

a v b v is convergent if 6, +1 ) converges absolutely and (b v b) has bounded partial sums, provided b n -> 0.

Proof.

cer-

Since further

2A

v

b y+1 )

(b v

is

again convergent and

E av

A n bn+l -> 0. 185

Examples and Applications. 1.

The convergence

2.

J?(

1)"

of

2 an

involves,

by Abel's

has bounded partial sums.

test, that

Hence

if

of

E

(6 n ) is a

n ,

monotone

null

sequence,

8 9

101. Vorlesungen uber Zahlentheorie, l sfc edition, Brunswick 1863, The designation Antnttsprogramm d. Univ. Freiburg, 1871.

above

adopted for the three tests is rather a conventional one, as all three are substantially due to Abel. For the history of these criteria cf. A. Pringsheim, Math. Ann., Vol. 25, p. 423. 10

1S85.

143 of the work referred to in footnote 8.

Chapter X. Series ot aroitrary terms.

316

converges by Dmchlefs

This

test.

series with alternately positive

kn has bounded k 2 , ... such that 2"( \) number of even integers over that exponents fc lf & 2 , . .

Given positive integers &

3.

sums

,

fc

1}

for this the excess of the

partial of odd integers

as n -> -f

a fresh proof of Leibniz's criterion for

is

and negative terms (82,5).

the n the series

among

oo

first

.

denotes any null sequence. an x n is convergent for convergent, the power series n 0<jo;<-f-l, since the factors x form a monotone and bounded sequence. If E a n merely has bounded partial sums, the power series at any rate conn monotoncly. verges for every x such that 0
converges, 4.

If

(&n )

2 an

2

is

--

sin sin (a

+ x) -f sin (a -f 2 x)

-f-

---H sin (a -f

n

x)

=

n

x

/

sin

f a.

sin

The proof

of the formula is given in

x -f

sin

2

a; -f-

-f-

sin

=

nx

we

0,

sin (n

-

sin

,

.

and for a

JT

=

,

a;

sinn cos

a;

+ cos 2 + cc

-f

cos w

a;

=

this the

Thus

if

~J

.

-f-

1)

(x

,

=j=

2

fc

rc)

-

-cos (n sin

From

1)

get

--n

x\

-f-

|

-

201. For a sin

sin

=

+ (n

a;

+l)-(x

,

-]-

2 A n)

.

|

boundedness of the partial sums can be inferred at once. 2(b n & n +i) converges absolutely and & ->0, we conclude from /t

the criterion 3b that ^T bn sin

nx

2bn cos n x In particular 6. If

where

3

fact, if

a

>

>

12 ,

this is the case

converges for every x converges for every x

when

the bn 's are positive, and

o and 0, it

n

(/? )

is

,

=f-

2&

^r

.

b n diminishes monotonely to 0. if we may write

bounded, then 2"(--

l)

n b n converges

follows from these hypotheses that

if,

--!<;

and only 1

t/ f

a

> 0.

from some stage on,

decreases monotonely, and the convergence of the series in question therefore secured by 2., if we can show that 6n ->0. The proof of this i.

e. (6n)

similar to that of the parallel fact in 17O, sufficiently large v say

1

:

Jf

< a' < a,

we have

11

For x=2k7t, the sum has obviously the value n

18

Malmsten, C.

/.:

Nova acta

Upsaliensis

(2),

sin a, for all n's.

Vol. 12, p. 255.

is

is

for every

v>w,

t

In

1844.

Tests of convergence for series of arbitrary terms.

43.

Writing

down

together,

we

inequality for v

this

= m,

m-f-1, ..., n

1

317

and multiplying

obtain

the divergence of the harmonic series, it follows as in 170, 1 that 6 n ->0. In the case a < 0, b n must for similar reasons increase monotonely from n b some stage on, so that n certainly cannot converge. Finally, when ( l) a = 0, we deduce in precisely the same way as on p. 289, that bn cannot tend to

From

2

and the series therefore cannot converge. If

7.

series;

we

such series are known as Dirichlet

a series of the form ** ,57^ X YI shall investigate

them

in

more

x>x09

it

,

also

is con58, A) ( converges for every

This simple application of is a monotone null sequence. x~x \n J by reasoning quite similar to that employed for power series (93),

for

Abel's test,

=x

on

later

detail

vergent for a particular value of x, say x f

)

theorem: Every

leads to the

of convergence

with the

JL

diverges whenever

series of the

that

property

the

form

possesses a definite abscissa

converges whenever

series

(For further details,

x<Ji.

^~

v.

x

>

Jl

and

58, A.)

186.

General Remarks.

We

have already mentioned the

fact that the magnitude of the indivarbitrary scries is not conclusive with regard to convergence. a n and Zb n whose terms are asymptotically equal, In particular, two series 1.

idual term in an

2

i.

e.

*

such that

vergence

7O,

(cf.

Thus

-

1

,

need not exhibit the same behaviour as regards con-

,

4).

for

e. g.

we have ~~

But

Sb n

positive

convergent and

is

// the series

2.

and

precisely,

let

<

when a n

it*

~

an

~*

bn

log n

S an

divergent, since

2(a n

bn ) diverges

is non-absolutely convergent^ (cf. p. 136,

negative terms,

an when a n pn and =0 when

0,

by 79,2.

footnote

9), its

taken separately, form two divergent series. More when a n an 0, and similarly let qn = 0, and = aw ^>0. 18 The two series n and qn are scries

<

>

2p

2

2

an and the containing only the positive terms of second only the absolute values of the negative terms of 2a nj in either case with the places unchanged, while their other terms are all 0. Both these series are divergent. In fact, as every partial sum of 2 an is the difference of two suitable partial sums of H and qn , it follows at once that if pn and qn were both convergent, so would 2"|a w be (by 70), contrary to hypothesis; and if the one were convergent, the other divergent, the partial sums of an of positive terms,

the

first

2p

2

2

2

|

2

1 11US p Thus i> n

it*

-

'

*"

'

(051)

Chapter X. Series of arbitrary terms.

318

2 pn

would tend to oo or -f oo (according as which is again contrary to hypothesis. -

3.

2 4n

01

is

assumed convergent),

the preceding remark, a conditionally convergent series, or rather by its partial sums, is exhibited as the difference of two

By

the sequence formed

monotone increasing sequences of numbers tending to the rapidity with which these increase, we may easily The partial sums of

Theorem. In fact,

2 pn

and

2 qn

infinity

14 .

establish

As regards the following

are asymptotically equal.

we have

since the numerator in the latter ratio remains bounded, while the denominator increases to -J-CX) with n t this ratio tends to 0, which proves the result. 4.

The

relative frequency of positive and negative terms in a conditionally diminishes monotonely is subject to the a n for which \an

convergent series

2

\

following elegant theorem, due to E. Cesaro: The limit, ratio

pn -

of

Qn for

v<w,

44.

PM is

the number o/ positive terms to }

necessarily

it

of the

exists,

the number of negative terms a vt

1

of conditionally convergent series.

Rearrangement

The fundamental

QM

if

distinction

between absolutely and non-absolutely

convergent series has already been made clear in 89, 2. This is, that the behaviour of non-absolutely convergent series depends essentially on the order of the terms in the series, so that for these series the

commutative law of addition no longer holds. The proof consisted in showing that a non-absolutely convergent series could, by a mere rearrangement in the order of its terms, be transformed into a divergent series. This result may now be considerably elaborated. In fact it

may be shewn iour,

theorem which

187.

that

as regards

by a

suitable rearrangement

convergence

we

obtain

or divergence,

any prescribed behav-

may be

induced.

The

is

Riemann's rearrangement

theorem.

//

2a

n

is

a conditionally

convergent series, we may, by a suitable rearrangement (v. 27, duce a series 2a^ with any one of the following properties:

3),

de-

14 It is best to avoid, as being far too superficial in character, the mode of expression which may be found in some writings: "the sum of a conditionCO." ally convergent series is given in the form CO

Cf. a Note by Rom. Ace. Lincei Rend. (4), Vol. 4, p. 133 1888. G. H. Hardy, Messenger of Math. (2), Vol. 41, p. 17. 1911, and one by H.Radt macher. Math. Zeitschr., Vol 11, pp. 276288. 1921.

44.

a)

to

Rearrangement

converge

an

to

b) to diverge to c)

-f-

arbitrary numbers

p

16

arbitrary

oo or

and

x, with

sum

prescribed

oo

to

convergent s'

319

series.

;

;

upper and lower limits

exhibit as

to

of conditionally

its

of

sums two

partial

ju^>x.

Proof. It suffices to prove c), since a) and b) are particular cases s' and the latter for x the former for -f- oo or p, p, c), oo. To prove c), let (xn) be any sequence tending to x and (/*n ) any xn and 17 0. sequence tending to p, y with jjin

= =

= =

of

=

^>

>

2

the terms in an E= a 1 ^- # 2 H---Let us denote by p^ 3 , in in the which order which are 0, they occur, and by q^ 9 q^, the absolute values of those which are 0, again in their proper .

.

.

^

.

.

.

<

The series thus slightly modifying the definition in 186, 2. absence of a the differ from those in 2 186, by q n only number of zero terms, and are accordingly both divergent, with posiorder,

2p

tive

and

2

We

terms which tend to 0.

show

to

proceed

that

a series of

the type

Pl

+ P* ----h Pm

fe+i

-----

ft

?i

l

-----

+ Pm^l H-----h

?*,

+ #+i H----

fc

Such a

series is clearly a reindeed one which leaves unterms relatively to one another and that of the negative terms relatively to one another. Let us choose the indices m^ m 3 -. ..., k in the k 2
all

satisfy

the

requirements.

arrangement of the given series, altered the order of the positive

and

is

<

<

1)

the

partial

sum whose

2) the partial

sum whose

partial

sum whose

16

term

.

p mi has a value

>

// x

,

;

q^ has a value

is

< ^,

^> x x ;

is

last

while that ending one term earlier

is

^ /^

is

last

while that ending one term earlier 3) the

term

last

while that ending one term earlier

.

term

is

<^

;

is

/v 2

p m^ has a

value

>

yu

,

Riemann.B.: Abb. d. Ges. d. Wiss. z. Gottingcn, Vol. 13, p. 97. 186668. b) and c) are obvious supplementary propositions. This is clearly possible in any number of ways. In fact, if * = /* with

The statements 17

a

finite

value

s',

say, take *

= sf

n

and

ftn

=

s'H

x = ^ = -f OO ( oo), take * w = n ( necessary. finally, *
If

n

,

taking ^. even larger,

and // n = x w + 2. If, and p\ from some stage we can arrange that this n)

^^O.

Chapter X. Series of arbitrary terms.

320

sum whose

4) the partial

term

that ending one

earlier is

term

last

^x

2

q kl has a value

is

<x

2,

while

;

and so on. for by taking a sufficient number of sum the may be made as large as we please, and partial positive terms, of negative ones to follow, the partial number a sufficient by allowing sum may again be depressed below any assigned value. On the other

This can always be arranged;

<

so hand, at least one term must be taken at each stage, since x n /z n in new occur the series. series does of the term really original every a n so obtained; a n denote the definite rearrangement of Let

H

the partial

E

'

sums of

for brevity fact, are terms /> Wl , /> m2

fc,

Since

,

,

.

.

'

have the prescribed upper and lower limits. the partial sums whose denote by r lf r 2

and by

cr

l9

o-

2,

.

.

,

.

.

.

.

.

In last

,

those whose last terms arc

,

we have and q n ->

p n ->

x and /* sums of 27 an

S an we

if

fe

;

it

0,

that a, ->

follows

x and r v ->

/z,

so

certainly represent values of accumulation of the partial Now a partial sum s n f of an \ which is neither a a v nor

that

2

.

T,,, has necessarily a value between those of two successive partial sums ' of this special type; hence s n can have no value of accumulation outside

a

the interval

x

.

.

.

/i,

(or different

common

from the

value of x and

IJL

if

In other words, /x and x are themselves the upper and these coincide). the lower limit of the partial sums, q. e. d. as a

Various researches of an analogous nature were started in different directions 18 and O. Schlomilch 19 investigated consequence of this theorem. M. Ohm

the effect of rearrangement on the special series

1

^

+

-

-+

..., in par-

which p positive terms are followed by q negative terms throughout Exercise 148). A. Pringsheim 20 was the first, however, to aim at general results for the case in which the relative frequency of the positive and negative terms in a conditionally convergent series is modified according to definite prescribed rules. E. Borel 21 investigated the opposite problem, as to what rearrangements in a con22 showed ditionally convergent series do not alter its sum. Later, W. Sierpinski s converges conditionally and s' s the series can be made to have that if 27 a n the sum s' by rearranging only the positive terms in the series, leaving all the negative terms with unaltered place and order while similarly it can be made to have any sum s" > s by rearranging only the negative terms. (The proof is not so simple.) ticular the case in (cf.

=

<

t

>

45.

Multiplication of conditionally convergent series.

We

showed in the preceding section, thus completing the considerations of 89, 2, that the commutative law of addition no longer holds for series which converge only conditionally. have also seen

We

18

19 Zeitschr. f. Math. u. Phys., Vol. 18, p. Antrittsprogramm, Berlin, 1839. 20 21 Math. Ann., Vol. 22, p. 455. 1883. 1873. Bulletin des sciences mathcm. 22 1890. Bull, internat. A'c. Sciences Cracovie, p. 149. 1911. (2), Vol. 14, p. 97.

520.

45.

321

Multiplication of conditionally convergent series.

in an example due to Cauchy, that the dis17), law does not in general subsist, so that the product of two a n and 2b n may no longer be formed according to the such series The question remained unsolved, however, whether rules. elementary

already (end of tributive

2

=

+

a bn the product series Sc n (with cn (- a n 6 ) might a^ 6 W _ 1 -j an A not continue to converge under less stringent conditions for and 2bn 17, it was required B, and to have the sum A-B. In that both Za n and 2'6 M should converge absolutely.

=

2

=

we have

In this connection,

Theorem oiMertens

Z

=A

an

and

2 bn = B

Proof. We

23

the

first

If at least

.

one of the

E cn

converges absolutely,

have only to show

that,

two convergent

series

and = A

converges

with increasing

188.

B.

n, the partial

sums

Cn

= <0 + c -!-...+* = *o h + K *i + b + l

o

tend to

A B

We may

as limit.

Bn

by

,

Cn or,

we

if

Since

^4

put

n

-B

Hb

those of

>-yl

-5,

nj

<*

1

<*i

b n -i

+ an b

+

)

Z an

is, of the two series, the denote by A n the partial sums of

+

Bn_ 1

/?+

only /?n

+

B

,

1

/.-!+-+

remains

to

show

A)'

when

lhat

2an

is

*(), the expressions

.^o +

form a null sequence. But we have only to put xn

.-iA+- +

o/

an immediate consequence of 44, 9 b; and yn a n there. Thus the theorem

this is

=

is

we

If

+

,

(

and

=

w

fln

it

absolutely convergent

ao b n

we have

= <*o-B n +

Bn = B -\= *n B +

(

assume that

one that converges absolutely. 27 # n

+

-

o)

<*i

f)n

=

proved. Finally,

2cn

we

shall

answer the question whether

if convergent, necessarily has the

,

The answer Theorem

2c n = 2(a

is

in the affirmative, as the following

Abel**.

of

the

+

b n -}--

n&

If )

are

the

product series

sum A-B.

three

convergent,

series

theorem shows:

2a n

,

2bn

and A, B, and

C

and 189. are

C. sums, we have A-B The theorem follows immediately from Abel's limit 1. Proof. theorem (10O) and was first proved by Abel in this way. If we their

write

S* i

J.

given by 94

J.

f.

d.

*n

=

reine

/"x

u.

d.

2bn x

=

angew. Math., Vol. (Nouv. Annales

/; (x), 79, p 182.

2cn x n = fs (*), 1875.

An

Vol.6, p. 210. 1887). reine u. angew. Math., Vol. 1, p. 318. 1826.

T. /. Stieltjes f.

(*)>

(3),

extension

was

Chapter X. Series of arbitrary terms.

322

these three power series (cf. 185, 4) certainly converge absolutely for 1, and for these values of x, the relation <^ a;

<

A (*)/;(*)

(a)

The assumed convergence

holds.

= /;(*)

of

2a n 2bn ,

and

2cn

implies,

each of the three functions tends theorem 100, when a? * 1 from the left; and that

Abel's limit

by

to a

+

limit

fi(x)-+A=2an Since the relation (by

(a)

Theorem

19,

We may

f,(x)-+B

,

holds for

that l)

it

= Sbn

the values of

all

must hold

= 2c n

f^(x)-+C

,

x concerned,

it

.

follows

in the limit:

and adopt

also dispense with the use of functions

the

following

Proof due

2.

From

this

it

to Cesdro**.

It

was shown above

that

follows that

Dividing both sides of this equality by n -f- 1 and letting n we obtain C as limit on the left hand side (by 43,2) and

=

+

-f-

A-B

oo, as

on the right (by 44, 9 a). Hence A-B C, q. e. d. In consequence of this interesting theorem, with which we shall again be concerned later on, any further elaboration of the question of multiplication of series has only to deal with the problem whether limit

the series

propose

2 c n converges.

Into these investigations

we do

not,

however,

to enter 36 .

Examples and Applications. 1. It

follows from !L

*

= n-rO

^^ = ^

n

~>~

L

1

J. *

+ -L _ I + f)

.

.

.,

by the

pre-

'

cedingf theorem, that

provided the series thus obtained converges. 26

26

Bull, des sciences math. (2), Vol. 14, p. 114. 1890. Theorems of the kind in question have been proved

by A. Pringsheim (Math. Ann., Vol.21, p. 340. 1883), and in connection with the latter's work, by A. Voss (ibid. Vol. 24, p. 42. 1884) and F. Cajori (Bull, of the Americ. Math. Soc., Vol. 8, p. 231. 1901-2 and Vol. 9, p. 188. 1902-3). Cf. also 66 of A. Prings heim's treatise, Vorlesungen Uber Zahlen- und Funktionenlehre (Leipzig- 1916), to which we have already referred more than once. G. H. Hardy (Proc. London Math. Soc. (2), vol. 6, p. 410, 1908) has proved a particularly elegant example of a related group of much more fundamental theorems.

323

Multiplication of conditionally convergent series.

45.

Now

+ 1)

p

(2

(2

n

+1-2

+ 12n

2ln+l)V2

)

new

so that the generic terra of the

series has the value

_ _1_\

,

Since ^ 4 W

t 1

3

V

tends monotoncly

--

-f"

and the new series therefore have

to zero,

does

=

The

3.

+ ---h

-

1

result obtained

00

1

=

7T

'

w-M,/ its

mean

arithmetic

we deduce

(v.

We

82, 5

Leibniz's test

converge by

as series log 2

2

so docs

a precisely similar manner,

2. In

r

,

,

n+1

ISO), by squaring- the

,

in

1.

mode

provides a fresh

of

approach to the

3

--, which has occupied us repeatedly before now J>!\ b *=!*" To see this, we first prove the followingand 15ft) equation

f>

Theorem. for which

2 an 2

Let (aot a lt 2 , . . .) fo a monotone Then the series ts convergent.

J}(

1-

thus

=

1)"

2

*;

n~0

^

136

sequence of positive numbers.

a n a n+f

n=0

(v.

= S J/f

p=1.2,...,

anc2 3.

(-1)

P

=J,

converge, with

J>

(c)

M

*

= s*-2J.

n=o

^

Proof. Since -S 9 converges, a->0; accordingly the series 1 cona aw s for every ^ 1, and ^"an verges by Leibniz's test. As a n a n +p converges, for >1. Further, as a n + p + l -< an + p9 we the series 2 are also convergent The series 3 will accordingly converge if cJ^-^O. Now have d p + i<_dp 1

<

^

.

given ra

e

^> 0,'

we can choose

ciently large p, p


Hence

O

op

a/>

4-

^*i

we a + /;

m

shall then i

+

'

-f

so that aji 77

.

T"

1 -j- aj* A l

a

a m ap + m

2

-f-

,

^-pr-: for every suffi-

2

have 8

+ "2" < ap

and the series 3 also converges.

a,

- -

T aa -J-

a/

a, a, -f

^ a,

(

aO

"I"

ai H

Let us

H

.

h

O

now form

S -f -g-

<

-

the array

324

Series of arbitrary terms.

Chapter X.

^

al aft for which A and fi are <j n. and let Sn denote the sum of the products These obviously fill up a square in the upper left hand corner of the array, and

Sn =

-a1 + ---- + (_!)

(a

)_,!.

other hand, the sum of all the (primary) diagonals which contain at least one product a^ a^ belonging: to that square, is clearly

On

the

r-O Hence, to obtain (cj, it now suffices to prove that out the above array in a more detailed fashion, we

(-

n

l)

- Sn

(Tn

2

==

)

+

1

-1

This

we

^

a,

r
-

a,

>

a

4.

+ 2 -f ---- ] f-2

H---- ]

,fl n

+1

+ a^

-2[a

If,

+

>a \

was

thus, as

an

an

j

hl

-f-

3

+ 3 -\---- ]


---I

t-i

+ ... + (_ we have

+ (- 1)"

l)--i

(of.

81

c,

/?n

,

1^)

Tn~ ^[^^-r-^^^-f/?!,;

we now

in 3.,

0,

n

Tn

asserted,

,-

^

5 ->0 and 7l

=

take an

therefore

--

-

2i

11 -f-

^

M

s3

2

2

/f

.

the hypotheses are obviously

-,

1

all

and we have

fulfilled,

But

- 2 [a a an

-

Sn *0. By writing moreover, that

write for brevity

and as

3 4

+ +

a n +1

[a a

Tn see,

we

in this case,

have, by 133,1,

00

*

1

y^

# f for

every p

>

1

__ -_, 16

_

n=0^2w

By used

the

yi

and hence

,

+

1)

a

equality (a) proved in

1.,

V

,

3^.....+ 2n

hand

the right

137 from 136,

deduce

to

"+ 1

n-0

1 - -

equality ^=-l

The

fresh

By

-=-.

o

op

the

=

side

=

^

^2 b

the method

follows at once

proof thus obtained for this relation

most elementary of

all

known

proofs, since

of functions except the Leibniz series 122. back to Nicolaus Bernoulli 21

may be regarded as the borrows nothing from the theory The main idea of the proof goes

it

.

Exercises on Chapter X. 142. Determine the behaviour

of the following- series:

n=l '

87

sin

\

Comment. Ac. Imp

scient. Petropolitanae, Vol.

X,

p. 19.

1738.

Exercises on Chapter X.

27(-l)"

e)

sin-?-,

g) 2&\n(n*x),

325

f)

27sini

h)

2 sin (w! nx),

4-

+ '" +

n

It

In the last series,

"*

s *" 2

(~ 1)n

-,

2

m)

n

J

f

n

a monotone null sequence. The series g) does not converge

(ct n ) is

x-kn\

unless

v = e, =

the series h) converges for all rational values of x, also 2 k = sin 1, = cos 1, and for (2fc-f-l)0, = ,

1_ 5! +

1

X

cli

1

2__

!_

"24!

and many other special values of tainly

g. for

e.

2~6!

1_

7

"*"

!

1

"*""" !

values of x for which

Indicate

a?.

1

2 8

cer-

it

\cTges.

*.

+

J7 L-qraV-i

x ;> 144. If (wa w ) and

for every

F+ aU

~

^] "

log 2

.

2"

w

an + 1)

(a n

converge, the series

Z an

also

con-

verges.

145. p 2>

a) If

sums,

partial

2an

2

/> 1

\

1

2a H b H *

the series

1

and 2\bn b n + l both converge, or b), if 2a n has bounded bn + 1 converges and 6n -0, then for every integer is

146. The conditions

convergent.

184, 3 are in a certain sense necessary, as well as sufficient, for the convergence of 2an b n If it be required that for a given (&), 2a n b n always converges with 2a nt the necessary and sufficient bn + l condition is that 2\bn should converge. Show also that it makes of the test

:

\

little

difference in this connection whether

verges or merely that (&)

147. a

way

2an

If

2pn

that

is

we

require that

^\bn

bn

+l

con\

monotone.

converges, and if pn increases monotonely to -f-oo in such is divergent, we have

~l

n

148. Let an tend 00

we

write

J?

W (

1)

M

=

monotonely, and assume that

to 5>

an ^

now rearrange

hm n an

this series (cf.

n=o

exists.

If

Ex. 51) so as to

have alternately p positive and q negative terms: the

sum

s'

a o-i-^

+ -"+ a 2i-a--0i-*3 ----- a a ?- !+**+.

of the

new

series satisfies the relation s'

140.

A

product series

of

= s -f

*

hm (n an )-log

?-. 9

necessary and sufficient condition

v

CB

= l'(a

two convergent series -Tan ,

6B

2bnt

fib=-
should form a null sequence.

+a

l

is

6,1

for

_ 1 +...

that the

the convergence of the

+ aB 6

)

numbers

+ ^-l + --- + ^-r4.|)

326

Chapter

XL

Series of variable terms.

150. If (an ) and (bn) are monotone sequences with limit n n product series of 2( l) a n and 2( l) bn is convergent if, = b and r b numbers on an (bQ -f t -f+ n) n = b n (a -f- a t ^-----j-

0,

the Cauchy's if, the also form a

and only an )

null sequence.

151. The two series

multiplied together

and

^~^"

by Cauchy's rule

-^7

and only

if,

>>

'

'

"/si

>0> may

be

a-J-^>l.

if,

152. If (#) and (& n ) are monotone null sequences, Cawc/ty's product of and J( l)"&n certainly converges if 2a H bn converges. the series 2( !)" A necessary and sutficient condition for the convergence of the product series that

is

2(an

153.

bn )

If,

l

'*~

e

should converge for every

for every sufficiently large

an 6n

and

2b n

if

= n '.(logn)' = w^.(logw/'

converges,

tt

t

we can

write

(log, n)"

(log r

n)' ,

nA

(log,

nf*

(Iog3

we have, provided

-f a,

n

an

is

,

not equal to bn for every n

&_,

t

r-0

Chapter

XI.

Series of variable terms (Sequences of functions). 46.

Uniform convergence.

Thus far, we have almost whose terms were given

exclusively

taken

into

consideration

It was only in (constant) numbers. the value cases that of the terms depended on the particularly simple choice of a definite quantity, or variable. Such was the case e. g. when

series

we were

y

1

na

;

considering the geometric series

their

2an

or the harmonic series

behaviour was dependent on the choice of a or of a.

2

A more

n

is that of the power series where the number an x be given, before we could attack the problem of its convergence or divergence. This type of case will now be generalized in the following obvious way: we shall consider series whose terms depend

general example

x had

in

any manner on a

We the

,

to

variable

x,

i.

e.

are functions of this

variable.

and consider

series of

accordingly denote these terms by fn

form

(x)

2fn (x).

A

function of x, in the general case, is defined only for certain values of x (v. 19, Def. 1); for our purposes, it will be sufficient to assume that the functions fn (x) are defined in one or more (open or closed) intervals

For the given series to have a meaning

for

any value

327

Uniform convergence.

46.

of x at all, we have to require that at least one point x belongs to the intervals of definition of all the functions fn (x). shall, however,

We

once lay down the condition that there exists at least one interval, in which all the functions fn (x) are simultaneously defined. For every particular x in this interval, the terms of the series 2fn (x) arc in any case all determinate numbers, and the question of its convergence can be raised. We shall now assume further that an interval / (possibly smaller than the former) exists, for every point of which the at

series

found

fn (x) is

Definition

.

of the series

neither

or

both,

and

An

1

to converge.

interval

2fn (x)

of

its

will be called

J

an interval of conver- 190.

at every one of its points (including one,

if,

endpoints), all the functions

fn (x) are defined

the series converges.

Examples and

2

Illustrations.

n

<

+

1. For the geometric series x the interval 1 a;
A power series ~ an (x x ) , provided it converges at one point at other than x09 always possesses an interval of convergence of the form When r is r) (x (Xfi-i-r), inclusive or exclusive of one or both endpoints. properly chosen, no further interval of convergence exists outside that one. n

2.

least,

.

8.

axis

x

.

.

The harmonic

>

1

,

1

series

has as interval of convergence the semi-

2j

n*

with no further interval of convergence outside

it.

4. As a series is no more than a symbolic expression for a certain sequence of numbers, so the series 2fn (x) represents no more than a different symbolic form for a sequence of functions) namely that of its partial sums

In principle,

it

is therefore

immaterial whether the terms of the series or

its

partial

sums are assigned, as each set determines tht other uniquely. Thus, in principle, it also does not matter whether we speak of infinite series of variable terms or of sequences of functions. We shall accordingly state our definitions and theorems only for the case of series and leave it to the student to formulate them for the case of sequences of functions*. 5.

For the

series

r+

j

For the case of complex numbers and functions, we have here to substitute throughout the word region for the word interval and boundary points of the region for endpoints of the interval. With this modification, the sign o has the same sig1

nificance in this chapter as previously. 2 Occasionally, however, the definitions

to sequences of functions.

and theorems

will also

be applied

328

Chapter XI. Series of variable terms.

we have

The

series converges for every real x. a)

sH

b)

sn (x)

c)

s*(x)-+l,

6.

On

defines

lim sn

(x)

a

x

if

,

we have

|*,<1,

if

(x)-+0, -> 1

Clearly, indeed,

|

|

if

|0|

>

1

=

1.

and

,

the other hand,

with an infinity

series

obviously exists

if,

of

separate

and only

if,

intervals

of

<

75- ,


-
'

or

^

convergence; i.e.

foi

if

if a; lies in an interval deduced from these by a displacement through an throughout the interior integral multiple of 2vt. The sum of the seties = 1 at the included endpoint. of the interval and

or

=

7.

,

Ihe

sin 3 sin 2 x -- ---h --

x

~\

-^

1

X

=f=

converges, by 185,

O

fj

real

o *-

a:

.

series sin

cos -3 -- ----O

cos 2 x\ the series cosxH--- ^ 6

a;

a:

,

,

1

1

r

r

5. for

.

converges

every .

for

every

real

2kyt.

2

If a given series of the form fn (x) is convergent in a determinate interval /, there corresponds to every point of / a perfectly definite value of the sum of the series. This sum accordingly ( 19, Def. l) is itself a function of x, which is defined or represented by

the series. is

we

also

When

said

to

the latter function

be expanded in

is

the chief centre of interest, it In this sense,

the series in question.

write

n=0

power series and of the functions they represent and VI), these ideas are already familiar to us. (v. Chapters The most important question to be solved, when a series of variable terms is given, will usually be whether, and to what extent, properties In

the

case

of

V

belonging to

all

the functions fn (%),

series, are transferred to its

i.

e.

to the

terms

of the given

sum.

Even the simple examples given above show that this need not be the case for any of the properties which are of particular interest in the case of functions. The geometric series shows that all the functions fn (x) may be bounded, without F (x) being so; the power series for sin a;, x 0, shows that every fn (x) may be monotone, without F(x) being so; example 5 shows that every fn (x) may be continuous,

>

Uniform convergence.

46.

and the same example

without F(x) being so, for

fact

ponding showing

{

Then

for

1

illustrates the corres-

easy to construct

that the property of integrability

For instance,

=

differentiability.

is

It

329

may

an example

also disappear.

let

every rational x expressible as a fraction with denominator

<

n, (positive and) for every other x

=

.

for each n, and consequently fn (x), for each n, is intcover any bounded interval, as it has only a finite number of discontinuities in such an interval (cf. Also lim sn (x) = F (x) exists 19, theorem 13) s n (x),

grable

for every x.

In fact,

if

x

is

rational, say

=

(?>0, p

and q prime

sn (x) = l and hence F(x) = l. another), we have, for every the other hand, x is irrational, s n = for every n and so F(o;) = 0. (a;) ~fn ( x) = lim sn (x) defines the function

n>q,

= = This function

is

Even by

not integrable,

to

one

on Thus

If,

for a rational x, an irrational x.

1

for

for

it

is

discontinuous

we

these few

3

for every x.

to see that a quite examples, of problems arises with the consideration of series of variable terms. have to investigate under what supplementary conditions this or the other property of the terms f n (x) is transferred to the It is clear from the F(x). examples cited that the mere fact of

are led

new category

We

sum

the cause must reside in the convergence does not secure this, mode of convergence. A concept of the greatest importance in this respect is that known as uniform convergence of a series fn (x) in one of its intervals of convergence or in part of such an interval. This idea is easy to explain, but its underlying nature is not so

2

intuitively,

We

shall therefore first illustrate the matter before proceeding to the abstract formulation:

readily grasped.

somewhat

CO

2 fn n=0

Let

(x)

converge, and have for

sum

F(x), in an interval/, a

<x
we shall speak of the graph of the function y = s n (x) = f (x) -\ h fn (x) as being the nU* curve of approximation and of the graph of the function y = F(x) 8 We may modify this definition a little by xs whose denominators are factors of n^ and

taking sn (x) = 1 for all rational elsewhere; the rational a?'s in question comprise, for each n, a definite number of other values besides the integers used above. then obtain as limsn (#) the same function F(x) as above. In this case, however, both s n (x) and F(x) may be represented in terms of a closed expression, by the usual means; in fact, we have 2 k $n (x) = lim (cos nl nx) t and therefore

<w

=0

We

F(x)

=

lim

[

lim (cos 2 n! ytx) k}.

This curious example of a function, discontinuous everywhere, yet obtainable by a repeated passage to the limit from continuous functions, is due to Dirichlet.

Chapter XI. Series of variable terms.

330

00

as

The

the limiting curve.

fact of the

convergence of

n=o

fn

to

(x)

F (x)

in

J

then appears to imply that for increasing- n, the curves of approximation lie closer and closer to the limiting curve. This, however, is only a very imperfect description of what actually occurs. In fact, the convergence in / implies only, in the first instance, that at each individual point there is convergence; all we can say, to begin with, is therefore that when any definite abscissa x is singled out (and kept fixed) the corresponding ordinates of the curves oi approximation approach, as n increases, the ordinate of the limiting curve for as a whole, the same abscissa. There is no reason why the curve y = sn (x) should lie closer and closer to the limiting curve. This statement sounds rather paradoxical, but an example will immediately make it clear. ,

The

whose

series

n=

for

in the interval 1

certainly converges

The limiting curve

sums

partial

have the values

1, 2, ...

<x<2

In fact, in that interval,

.

< <

2 on the axis of x. The n** therefore the stretch 1 a; lies above this stretch and, by the above inequality, at a

is

curve of approximation distance

of less than

interval 1

<x<2

from the limiting curve, throughout

For large

.

n's,

the whole of the

the distance all along the curve

is

therefore

very small. In this case, therefore, matters are much as we should expect; the position is 1 x entirely altered if we consider the same series in the interval at every point of this interval 4 still have lim sn (x) = so that the limiting curve is the corresponding poition of the a;- axis. But in this case the

< <

.

We

,

n**1

approximation curve no longer

out the interval, sn

(a:)

=

,

lies

any n (however

for

close to

the

limiting curve

For #==

large).

,

through-

we have always

so that, for every n, the approximation curve in the interval from

t

to 1 has a

hump

of height

~2

!

!

The graph

of the curve

y

=

S 4 (x)

has the

following appearance:

Fig. 4. 4

In

every n

>

for

fact,

X

;

for

x

>

x

we have ,

sn (x)

=

<

sn (x)

< nx

as before,

even permanently.

i.

e.

<

e

for

46.

The curve y

),

Uniform convergence.

331

however, corresponds more nearly to the following graph:

Fig. 5.

For larger

the

n's,

hump

without diminishing in height beThe approximation

in question

comes compressed nearer and nearer

to the ordinate-axis. 5

curve springs more and more steeply upwards

from the origin

to the height

,

Ci

which

for x

attains

it

n

,

within a very small distance of the

The beginner,

whom

down again almost

only to drop a;

as rapidly to

-axis.

phenomenon will appear very odd, should take care to get it quite clear in his mind that the ordmates of the approximation curves do nevertheless, for every fixed x, ultimately shrink up to the point on the tf-axis, so that we do have, for every fixed x, lim sn (x) = 0* If x is given a fixed value (however small), the disturbing hump of the curve y=sn (x) to

this

will ultimately, i. e. for sufficiently large w's, be situated entirely to the left of the ordinate through x (though still to the right of the y-axis) and on this ordinate the curve will again have already dropped very close to the a;- axis*.

Therefore the convergence of our series will be called uniform 2 but not in the interval 1 x x

< <

interval 1

We now possesses an

< <

,

to

proceed

the abstract formulation:

interval of

convergence /; it XQ idual point of /, for instance at X

=

F(x) = sw (#) + rn

number nQ

x and assume > ( ] such that, for every n > n

Suppose

2fn (x)

convergent for every indiv-

is \

in the

.

this

means

arbitrarily

that

given,

if

we

there

write is

a

,

Of course the number nQ as was already emphasized (v. 10, rem. 3), depends on the choice of e. But n Q now depends on the choice of XQ also. In fact for some points of / the series will in general converge more ,

6

8

At the If

we

point of the to a height

origin, its slope take,

hump

<

say, is

.

x

=

is s n '(Q)

y^r~

ffinnftflft'

and

=

n.

and n at

=

1000000, the abscissa of the highest

our point * the curve has already dropped

Chapter XI. Series of variable terms.

332

By analogy with 10, 3, we shall therefore and more simply, dispensing with the index with the special emphasis on the dependence on e, we shall say: Given e > and given x in the interval /, a number n (x) can always be assigned, such that for every n > n (x) 7 rapidly than for others write w w (e,a: ); or

.

=

,

we now assume n(x) still for the definite given e chosen, say as an integer, as small as possible, its value is then uniquely In a defined by the value of x; as such it represents a function of #. certain sense, its value may be considered as a measure of the rapidIf

convergence of the series at the point

ity of

We now

x.

define as

follows:

191.

Definition of uniform convergence (1 st form). The series 2fn (%) convergent in the interval f, is said to be uniformly convergent in the sub-interval ]' of /, if the function n(x) defined above is bounded in in / each value 8 of e. Supposing we then have n (x) this

N

will

of course

n(x) themselves

depend on

we may

the

choice of

like

c,

A

assigned independently

numbers

2f n (x),

con-

convergent

in a

series

vergent in the interval J, is said to be uniformly sub-interval /' of /, if, given e, a single number of x,

the

also say:

2 nd (principal) form of the definition.

N = N(e)

can be

such that

n>N,

but also for every x in /'. in /'. also say that the remainders rn (x) tend uniformly to

not only (as formerly) for every

We

/',


for

Illustrations and Examples. 1. Uniformity of convergence invariably concerns a whole 9 an isolated point

interval,

nevei

.

2. A series 2 fn (x) convergent in an interval / does not necessarily converge uniformly in any sub-interval of /. X ) n has the positive radius r and if 3. If the power series 2 an (x

the series

is

uniformly convergent in the closed sub-interval /' of

The student should compare, for instance, the rapidity of convergence n geometric series 2x (i. e. the rapidity with which the remainder diminishes 1 99 as n increases) for the values 3 = -^ and 05 = ^^^. IUU 1UO 8 the above-mentioned measure of the rapidity of conIf, that is to say, In parvergence evinces no unduly great irregularities in the interval /'. ticular cases /' may of course consist of the complete interval /. 9 More generally, it may have reference to sets of points more than finite in number. 7

of the

Uniform convergence.

46.

<

333

<+

interval of convergence, defined by x x Q. In fact as the point tne interior of the interval of convergence of the power series, li es #Q-}n But if the latter is absolutely convergent at that point. n Q converges choose so that for e we ;> can, given 0, every absolutely, N=N(e)

its

x

m

*=

,

2a

n> N

n+ * -f +i \-e

I

Also, since

Thus /'

xQ

|a5

\
*+2

I

for every

The

-e

|

rn (x)

-

M -h

<.

we have

in /',

a;

n ^> N, we certainly have

for

may be

1

n

\

O>

whatever the position

x

of

in

.

we have

result

obtained

is

as follows

2an (x~x

o Theorem. A power series formly in every sub-interval of

the

form

\

n )

x

of positive radius r converges unir of its interval of conQ

X

\

< <

vergence. 4. The above example enables us to make ourselves understood, if we formulate the definition of uniform convergence a little more loosely, as follows:

2 fn (x)

is said to be uniformly convergent in J', if it is possible to make a statement about the value of the remainder, in the form "\ rn (x) *", valid for all positions of x simultaneously.

<

\

The

5.

series

-

2

for,

whatever the position

of

uniformly convergent for every value of x\

is

5 *

n=l

x may

be,

~

whence the

rest

be inferred by

may

(>. The geometric series 1 < x of convergence -|-

<

however

<

x

large 1, for

<

N

may be

which

for instance,

If,

is

we

not uniformly convergent

in the

whole

interval

For

1.

chosen,

e. g. rn (x)

4.

>

we can

always find an rn

(x)

with n

">

N

and

1.

choose any fixed n

>

N

t

then as x ->

we have

1

x n+i

Hence r n

(x)

>

1 for all

x in a

definite interval of the

<

form x

x

<

1.

7. The above clears up the meaning of the statement Sfn (x) is not uniformly convergent in a portion J' of its interval of convergence. A special value of e, say the value e<j > 0, exists, such that an index n greater than any assigned may be found, so that the inequality rn (x) < e is not satisfied for some suitably chosen x in J' :

N

|

|

.

=

With

sn (x) t our definition reference to the curves of approximation y clearly implies that, with increasing n t the curve should lie arbitrarily close to the 0, limiting curve throughout the portion which lies above J'. If, for any given e sn (x) will we draw the two curves y e, the approximation curves y (x) ultimately, for every sufficiently large n, come to he entirely within the strip bounded 8.

=F

by the two curves.

=

>

334

Chapter XI. Series of variable terms.

9. The distinction between uniform and non-uniform convergence, and the great significance of the former in the theory of infinite series, were first recognized (almost simultaneously) by Ph. L. v. Seidel (Abh. d. Mimch. Akad. r

1848) and by G. G. Stokes (Transactions of the Vol. 8, p. 533. 1848). It appears, however, from a paper published till 1894 (Werke, Vol. 1, p. 67), that the latter distinction as early as 1841. The concept of uniform

Cambridge Phil. Soc., by K. Weierstrass, unmust have drawn the convergence did not

p. 383,

become common property

much

till

through the lectures of

chiefly

later,

Weierstrass.

Other forms of the definition of uniform convergence.

3 rd form. in whatever

2fn (x)

said

is

way we may

to

uniformly convergent in

be

choose the sequence

10

the

in

(x n )

J

interval

f

^f

)

J\

the corresponding remainders 11 invariably form a null sequence . We can verify as follows that this definition

is

equivalent to the

preceding: nd Suppose that the conditions of the 2 form of the definition are so that r n (x) 6 fulfilled. Then, given e, we can always determine for every n > and every x in /'; in particular

a)

N

|

N

I

hence

rn( x n)

<e

I

*or

\

<

n> N;

ever y

rn (xn )-+0. rd

b) Suppose, conversely, that the conditions of the 3 Thus for every (o;n ) belonging to /' , rn (xn ) *

filled.

of the 2 nd

form must then be

N=

if a number the case, did not exist for every e

>

satisfied also.

In fact,

form are

The

.

this

if

ful-

conditions

were not

-^(e) with the properties formulated there

this would imply that for some had these properties; above any no number number N, however large, there would be at least one other index n such e xn in /', rn (xn ) Let n be an that, for some suitable point x s Above n l there would be another index index such that r n (x n ) e for a suitable corresponding point x n r (x n 2 such that ^ and n2 ^ so on. We can choose (x n ) mj' so that the points xn x n ^ belong to (x n ), in which case

special e,

say e

=

,

N

,

=

|

|

,

^

\

|

|

\

^

li

^

,

10

.

.

The sequence need not

converge, but rn (x)

11

Should each of the functions choose x n in particular so that rn (x n ) |

|

\

.

.

.

may occupy any position in./'. attain a maximum in J' we may t

\

= Max

|

rn (x)

\

;

our definition thus takes

the special form: Zfn (x) is said to be uniformly convergent in /' if the maxima Max rn (x) in J' form a null sequence. does not attain a maximum in _/', it has, however, a rn (x) If the function We may also formulate the definition in the general form: definite upper bound /iw Form 3 a. 2f (x) is said to be uniformly convergent in J' if pn -> 0. (Proof?) |

\

\

|

.

n

46.

Uniform convergence.

335

will certainly not form a null sequence, contrary to hypothesis. Our assumption that the conditions of the 2 nd form could not be fulfilled is inadmissible; nd

the 3 rd form of the definition

is completely equivalent to the 2 In the previous forms of the definition, it was always the remainder of the series which we estimated, the series being already assumed to converge. By using portions of the series instead of infinite remainders (v. 81) .

the definition of uniform convergence may be stated so as to include that obtain the following definition

We

of convergence.

:

4 th form. A e,

given s

if,

for every n

> N,

every

and

|

all

we

find that

then

x

rn (x)

|


n

all

> N and

In the inequality, we may make k tend e for each x in J'. Conversely, if

^

\

x in /', then for

all

+fn+k (x) -

+

|

This shows, however, that the 4 th form,

depending

(e)

all

these n,

k ^>

all

1,

we have

in /',

l/n+i (x)

may

N = TV

every x in /'. For if the conditions of it follows firstly (by 81) that fn (x)

k^.1 and

converges for each fixed x iny'. to QO, and rn (x)

said to be uniformly convergent in the

> 0,

this definition are satisfied,

|

is

we can assign a number and independent of x, such that

interval /'

only on

Efn (x)

series

.

I

Hfn (x)

the series

if

- rn+k (x) ^ 2

rn (x)

|

the conditions of

satisfies

We

also satisfies those of the 2 nd form, -and conversely.

it

finally express this definition in the following

5 th form. A series interval J' if, when positive

Sfn (x) integers

is

form

(cf.

8 la):

said to be uniformly convergent in the

k ly k 2 & 3 ,

,

.

.

.

and points x^ x 2J # a

,

.

.

.

of J' are chosen arbitrarily, the quantities [/nfl (*n) invariably

form a

+/n +2

null sequence

12

(*n)

+

+/nf/r n (*n)

]

.

Further Examples and Illustrations. 1.

The

student should examine afresh the behaviour of the series

a) in the interval 1

b) in the interval 2.

For the

<x< ^ x 5^

series 1

+

(x

-

1)

+

(x*

Zfn (x), with 192*

2, 1 (cf.

the considerations on pp. 330

- x) +

-

+

(x

n

-

~ xn l

)

1).

+.

+A

for the above, write C/^+i (*) + w+* n (*n)] any integers tending to + <. Exactly as in 81, we may speak of a sequence of portions, except that here we may substitute a different value of x in each portion. The statement we then obtain is: A series 2fn (x) is said to be uniformly convergent in J' if every sequence of portions of the series forms a null 12

By

where the

51,

we might even

.

.

.

vn 's are

sequence. Similarly:

A

sequence offunctions

gent inj' if every difference-sequence

is

a

sn (x) is

null sequence.

said to be uniformly conver-

336

Chapter XI. Series of variable terms.

we have val /:

obviously

< < x

1

-f-

s n (x) 1 , in

= xn The

scries accordingly converges in the inter Here x 1 particular in the sub-interval /': .

= =

F(x)

The convergence in this interval x < 1 for here rH (x) = F(x)

<

;

in /') the

(hence

< <

for

have

=

1

I

.

.

s n (x)

.

sequence of points

=1-

I

rn (xn )

I

\

1

1

V

n

I

(n=l \

n

1

29

) )

1

*

)

e

,

so that the series cannot converge uni-

This may be made clear geometrically by examining the position successive curves of approximation, as illustrated by the accompanying 13 .

formly of

x

not uniform. It is not so even in /": = xn We have only to choose in /"

is

xn to

<x<

for 1

.

figure

:

For large values of n the curve y ~ s n (x) remains, almost throughout the whole interval quite close to the #-axis, which represents the limiting curve. Just before the ordmate as = +l, until it reaches its terminal it rises abruptly point (1, 1). However large a value may be assumed for n, the curve y = sn (x) will never remain close to the limiting curve throughout the entire l * inter val (or./'). In the preceding example, we could 3. almost expect a priori that the convergence would not be uniform, as F(x) itself has a "jump" of height 1 at the endpoint of the interval. Fig. 6. The case was different with the example treated on p. 330. An example similar to the latter, but even more striking, is the following: Consider the series for which ,

y

nx

(11=1,2,...). x* the number e~~~* for every n\ for x =)= is , 0, we have sn (0) , positive and less than 1, so that (by 38,1) sn (x) *0. Our series is therefore 0, i. e. the limiting curve coinconvergent for every x and its sum is F(a;) cides with the a; -axis. The convergence is not in the least uniform, however,

=

For a! =

=

if

we

consider an interval containing the origin.

Thus, for xn

=

rr=-

'

V"

which certainly does not ->

For xn =

f

1 g-J

,

.

The approximation curves have a

we even have

rn (xn )

-+

1

similar

.

< <

14

In spite of this, it is easy to see that for every fixed x (in x 1) sn (x) diminish to as n increases, so that the abrupt rise to the 1, providheight 1 occurs to the right of x, however near x may be taken to ed only that n is chosen sufficiently large. the values

+

Uniform convergence.

46.

m

Figs. 4 and 5, with this modification, that the height of increases indefinitely with n ; this is because 15

appearance to those

hump now

the

337

~+ -r-OO.

We

4.

i

mst emphasize particularly that uniform convergence does not fn (x) to be individually bounded. The series

require each of the functions L_

x

1 4-

a;

-f

'

the

sum

.,

x2

+

j^

for instance,

,

since the remainders

.,

< x
uniformly convergent in

is

,

with

have the value

xn == t2n-l

\-x

The first term of this series (as also the limiting function) the interval in question. (Cf., however, theorem 4. below.)

not

is

bounded

in

With a view to calculation with uniformly convergent series, it convenient to formulate the following theorems specially, although the proofs are so simple that we may leave them to the reader: is

Theorem

// the

1.

2fn

series

p

^

(x),

2 fn2 (x),

.

.

.,

2fnp (x)

same interval J, simultaneously, uniformly convergent the series which whole fn (x) for definite number), in

the

2

are,

(p is a

denote ., c uniformly convergent in that interval, if c19 c a , e.: series be Uniformly convergent may any (I. multiplied by constant factors and then added term by term?)

is

also

.

.

constants.

// 2fn (x) is uniformly convergent in J, so is the where g(x) denotes any function defined and bounded in the interval /. (I. e.: A uniformly convergent series may be multiplied term by term by a bounded function.)

Theorem

series

2.

2 g(x}fn (x), Theorem

// not

3.

merely

2fn (x), but H\fn (x}\ is uniformly 2gn (x)fn (x), provided that when m

convergent in /, then so is the series is

the functions g m ^\(x],

suitably chosen,

gm +*(x), ..., are uniformly

and a J, provided we can find an integer m > number G > such that gn (x) < G for every x in J and every n > m. A series which still converges uniformly when its terms are taken (7. e.: bounded in

i.

e.

\

\

in absolute value all

a

but

finite

may

be

number

multiplied term by term by any functions which, at most, are uniformly bounded

of

in J.) 15

y

The point

s n (x),

as

for

may be

which x

~ v*

inferred from

is

s'

n

actually the (n

n9 x 2)

maximum e~~ *

nx

=

point of the curve .

Chapter XI. Series of variable terms.

338

Theorem

m

Sfn (x)

converges uniformly in /, then for a suitable fm+l (x), fm+2 (x), . . . are uniformly bounded in and con4.

If

J

the functions

verge uniformly to 0.

Theorem 5. If the functions gn (x) converge uniformly to inj, so do the functions yn (x) gn (x\ where the functions y n (x) are any functions and with the possible exception of a finite number of them defined in

J

uniformly bounded in J. We may give as a model the proofs of

Theorems 3 and

3. By hypothesis, given e > 0, so that for every n > and every x in

Proof of Theorem

> m

termine nQ

For the same |ft+i/.+i This proves

we can

de-

J

and

n's

+ all

4:

I

5S

that

#'s

I

we

g.+i

y

then have |/.+i

I

< G (!/

+

I

,-i

I

+

.

.

< e.

.)

was required.

Proof of Theorem 4. By hypothesis, there exists an m such that, ^ m and every x in y, rn (x) < \. Hence for n > m and

for every n every x in /,

\

|

I/. (*)

= I

I

r.-i (*)

- rn (x) ^ |

|

r.-!

|

+

|

rn

< 1,

|

>m

so If we now choose nQ part of the theorem. in J, rn (x) i e, (e being previously assigned) the second part follows in quite a similar way.

which proves the that for every n

first

^ nQ

and every x

|

|

<

-**

v

47.

Passage to the

limit

term by term. ^

*

Whereas we saw on pp. 328 9 that the fundamental properties of the functions fn (x) do not in general hold for the function F (x) represented by 2fn (x), we shall now show that, roughly speaking, this mil be the case when the

We

first

series is

uniformly convergent

16

give the following simple theorem, which

.

becomes particularly

important in applications:

193.

Theorem interval

and

function

F (x)

16

We

1.

// the

if its terms

fn

series

2fn

(x) is

(x) are continuous at

represented by the series

may, however, mention

at

is

uniformly convergent in an

a point xn of

this interval^ the

also continuous at this point

17 .

once that uniform convergence still only and is not in general

represents a sufficient condition in the following theorems necessary.

17 If x is an endpoint of the interval y, only one-sided continuity can of course be asserted at XQ for F (x), but of course only the corresponding one-sided continuity need be assumed at x for /n (x).

Passage to the limit term by term.

47.

>

Proof. to

show

that

|

Given s 0, we have a number d d (e)

F (x ) < e

F (x)

Now we may

-

F(x) the

assumed

large that,

)=

F(*

fact of

for every

x

19, Def.

accordance with

(in

>

6b)

such that

exists

x with

for every

|

in the interval.

By

=

339

|

z

XQ

\

<8

write

- sM + rn (x) - rn (xQ).

s n (x)

we can choose n

uniform convergence, in the interval,

|

rm (x)

<

\

.

=m

so

Then

The integer m being thus determined, s m (x) is the sum of a fixed number of functions continuous ata? and is therefore (by 19, Theorem 3) ,

for

We

can accordingly choose 6 so small that for which )# XQ interval in the x (5, we have every

itself

continuous at XQ

.

<

\

For the same

x's

we

then have

which establishes the continuity of F(x) Corollary. //

and

if

2fn (x]

= F(s)

the functions fn (x\ are

all

at

a;

.

uniformly convergent in an interval, continuous throughout the interval,

is

'

then so is F(x). In connection with example 3 of 191,2,

we have in the above a fresh proof of the continuity of the function represented by a power series in its interval of convergence. If we use the lim-defmition of continuity 19, Def. 6) instead (v.

of the e- definition, the statement of the

theorem may be put

into the

form:

"m

(

jyn (X))

n=0

appears as a special case of the following elaborate theorem: In this form

it

Theorem

2.

We assume

formly convergent in the open

when x approaches XQ from

the

that the series

interval

interior

lim /(*)

>

18

x

F(x)

much more

= ^fn (x)

and that the . x l 19 , of the interval .

.

is

uni-

n=o

limit,

=*

18 or < #, Whether the series remains convergent at a? X Q may be and indeed whether the functions fn (a;) are defined there at all, is immaterial .

,

for the present theorem.

We

19 are therefore concerned here, as also in the two subsequent statements, with a one-sided limit.

194.

Series of variable terms.

Chapter XI.

340

00

The

exists.

series

n the above

manner,

21 a n

^ en

exists.

Moreover,

if

we write

lim F(a) or,

and\imF(x), when

converges

o

2a n = A

,

x+x

in

we have

A,

otherwise,

n=0

(The

form

expressed shortly by saying: In the case of uniwe may proceed to the limit term by term.) th form of the definiProof. Given e > 0, first choose w (v. 4 and every x in our so that for k 1 n every every ^> x 191)

form

latter

convergence

is

,

,

>

tion

,

interval,

Let us for the 19,

And

Theorem

moment keep n and la,

it

k fixed,

and make

x+x

By

.

follows that

2

>

true for every n n and every & ^> 1. Hence a n is us sums of this denote series Let the A by partial convergent. n and It is easy to see now that F(x) >A. If, for a given e, its sum by A. we not only have w n Q is determined so that, for every n this

is

>

then, for a (fixed)

m>

n

,

,

|F(*)-4|

= !(*.(*) - A J ~(A- ^+rm (x)\^\s m (x) - A m As

for

*-a?

a;

involves 5 m

(a?)

>^4 m ,

we can determine 5

every x belonging to the interval, such that also have a; s, we then

For these

+-5-

\

so that

<

x |

XQ

\


.

f

\F(x)-A\<*, which proves If

(o;n )

is

that we required. chosen arbitrarily in the interval of uniform convergence,

all

it

follows from

rd n, (a?n ) -* (v. 191, 3 form) that the sequences F(xn ) and sn (xn ) will invariably exhibit the same behaviour as regards convergence or divergence, and that if they converge, the limits will coincide. may contrast this with the case

and

We

Passage to the limit term by term

47.

of the series, already seen to be non-umformly convergent, whose partial are s n (x)

we

If here

-r~ir~ir~*

xn

take

F (xn )

we have

,

=

con-

e. it is

i.

0,

sums

J, i. e. it also converges, but with the vergent with the limit 0, whereas sn (xn ) limit J. The two sequences do not have the same behaviour.

Theorem

The

3.

series

and

vergent in the interval/,

= Efn (x)

F(x)

all the functions

^x^

a

over the closed sub-interval /':

is

assumed

F (x)

b, so that

con-

uniformly

fn (x) are supposed is

integrable

also continuous

Then F (x) is also integrable over J' and the integral F (x) over the interval/' may then be obtained by term-by -term integration in that sub-interval.

,

b

b

J

a

precisely:

has for

its

sum

The

s

m

e.

series

[//(

side is also convergent

and

so large that for every n

>m

on the right hand

F (x). determine m

S

7i-0 '-' a

the required integral of

Proof. Given and every x

Since

n

a

(More

of

b

X= f\Vf L =0 n (x)}d J

or

F(x)dx

Jf

i.

s

> 0,

we

in a ... b,

sum

(x) is the

itself integrable

number of

of a finite

By

over/'.

the interval J' into p parts t l9 lation of sm (x) in it, , we have

19, i2 ,

.

.

.

it

integrable functions,

is

theorem 11, we can therefore divide such that, if ov denotes the oscilij> ,

< *=i

Now which

the oscillation of rm (x)

m

is

<2

certainly

was determined. Also the

?7,

1:~S

oscillation of the

ky

>

sum

manner ' n

t ^ie

of two functions

never greater than the sum of the oscillations of the two functions. So i v of the interval a . . . b, we have . for the same subdivision i l9 i 2

is

,

.

.

,

<

iv

where v v denotes the 11)

F(x)

for every

oscillation of .F (x) in

also is integrable over/'.

e,

*"

.

Thus

(again

Furthermore, as

by

theorem

19,

F = s n + rn>

we

have,

n^m, b

b

b

fF(x)dx- afsn (x)dx

=

frn (x)dx <-J
a

the latter by

of functions;

19,

theorem

applying

19,

21.

Now sn (x)

theorem

f

a

22,

we

is

the

sum

of a finite

number

therefore at once obtain

b

b

f F(x)dx- E aff(x)d a ~~

(061)

195.

342

Chapter XI. Series of variable terms. b

however, implies the convergence of

Tliis,

2J

fv (x)dx and the iden-

a tity

its sum with the corresponding integral of F(x). Matters are not so simple in the case of term-by-term differen-

of

tiation.

In

190,

we

7,

saw, for instance, that the series

every #, and so represents a function F(x) defined for every terras of this series are, without exception, continuous and dilfer-

converges for

The

real x.

entiable functions.

If

we

term by term, we obtain the series

differentiate 00

2

cos n x n=l

,

20

for every x. Even which is divergent for every x, as for instance the series

Kxample 5, 191, by term we obtain (cf.

the position

2),

The theorem on of a different stamp.

for

e. g.

a series converges uniformly

better,

since on differentiating term

cos n x

V a series which diverges

no

is

if

~i x=

n Q.

term-by-term differentiation must accordingly be runs as follows:

It

CO

Theorem

196.

Given

4.

21

a

/= a

liable in the interval

.

by

E fn (x) n=0 (a < b); if

1

/;'(*).

series

.

.

n=0 deduced from in /,

one point by

the,

the

terms

are

differen-

series

by differentiating term by term, converges uniformly

it

then so

whose

does

of J.

the

given series, provided

it

converges at least at

if F(x) and (p(x)are the functions represented is differentiable and we have F(x)

Further t

two series,

f

*(*)-?(*). In other words, with the given hypotheses, the series entiated term by term. 20

The formulae established on

p.

357 give, for every x sin

1 jr-

2

21

-f

cos x

+ cos 2 x + '

As regards the convergence

the first instance.

may

={=

2 k

be

differ-

JT,

+!

+ cos n x = of the series, no assumption

is

made

in

47.

to the limit

Passage

term by term.

343

Proof, a) Let c denote a point of / (existent by hypothesis) for which 2fn (c) converges. By the first mean value theorem of the differential calculus ( 19, theorem 8)

2 (/,(*)-

= (*- c)' 2 //(),

(<))

v=n+l

r-n + l

where f denotes a suitable point between x and c. can, by hypothesis, choose n so that for every n and every x in J,

Given

> nQ

Under the same

we

conditions,

we 1,

therefore have

n+fc

< e.

27

r=n

> 0,

'

a

6

e

every k ^>

,

H(

fn (c)), and hence Sfn {x) itself, is uniformly 2(fn (x) convergent in the whole interval / and accordingly represents a de-

This shows that finite

function F(x) in that interval. b)

Now

let

A(*o

These functions are defined to

As above, we may

/.

/ and

XQ be a special point of

+ A)-A.(*o) for every

=

write

gy(/t)>

h^O

for

(,,

= 0,1,2,...).

which XQ

-f-

n + ls

n+fc

27 /;'(* + **) ^ (*) =y=+l r=fl 27

and we

find,

as in

that

a),

w

27 ^n

n=0 converges uniformly for

& belongs

write

all

(o

< * < i)

W

these values of h.

This series represents

the function h

By theorem 2, we may F* ( xo) ex i sts> Wlt^

let

>0 term by

= 270 n=0 A->0 F*(x = q>(x

^(*o) This signifies that

h

)

ft, (*))

),

term,

and we conclude

that

= n=0

as asserted.

Examples and Remarks.

< <

r, the series ^ xj* has the radius f>0 and if Q. By theorem 4, the converges uniformly for every x x given power series accordingly represents a function which is differentiable for XQ \
If

an (x 1

(a?

sfy)*""

|

<

\

<

|

|

<

\

<

Series of variable terms.

Chapter XI.

344

2a

n therefore remains differentiable at every function represented by n (x-~x ) interval r. the of x x open point |

2.

and

its

The

<

|

derived function

^-

-

function represented by

-

is

.

n^

n=l

(Cf,

differentiable

is

Example

5,

191,

for

every

2.)

3. The condition of uniform convergence is certainly sufficient in four theorems. But it remains questionable whether it is also necessary.

a)

In the case of the continuity -theorem

The

1

or

its

x

corollary, this

is

all

cert-

192, 2 and 4 have everywhere-conand represent everywhere-continuous functions themselves. Yet convergence was not uniform. The framing- of necessary and sufficient

ainly not so. tinuous terms their

scries considered

in

is not exactly easy. S. ArzelA (Rendiconti Accad. Bologna, (1), Vol. 19, 1883) was the first to do so in a satisfactory manner. A simplified proof of the main theorem enunciated by him will be found in G. Vivanti (Rendiconti del circ. matem. di Palermo, Vol. 30, p 83. 1910). In the case in which the functions / (x) are positive t it has been shown by V. Dim that uniform convergence is also necessary for the continuity of F(x). Cf. Ex. 158.

conditions

p. 85.

b)

The

convergence

in theorem 195 on term-by-term integration uniform again not a necessary condition may also be verified by various

fact that is

CO

examples.

Taking the

series

n=i

fn

x

( )

discussed on pp. 330-1,

whose

partial

sums are .

and whose sum

is

F(a?)

v=l

=

0,

we

nx

see at once that

00

Thus term-by-tcrm integration

leads to the correct result.

In the case of the

i

series

192,3, however,

in

which we also have J F(x) dx = 0, term-by-term o

integration gives, on the contrary,

In this case, therefore, term-by-term integration

48.

Now

we

is

not allowed.

Tests of uniform convergence.

acquainted with the meaning of the concept convergence, we shall naturally inquire how we can determine whether a given series does or does not converge uniformly in the whole or a part of its interval of However convergence. and we know it often is so to determine difficult it may be the mere convergence of a given series, the difficulties will of course be considerably enhanced when the question of uniform convergence of uniform

that

are

Tests of uniform convergence.

48.

345

is approached. The lest which is the most important for applications, because it is the easiest to handle, is the following:

Weierstrass 9

bounded

2fn

each of the functions fn

//

is

(x)

defined

and 197.

say

2y n

if the series

(of positive terms)

converges, the

converges uniformly in J.

(*t)

Proof.

the

and

J

throughout series

test.

in the interval /,

the

sequence

By 81, 2, the left. By 191,

5 th form,

If

right

is

(#n)

hand

chosen

we have

arbitrarily in /,

*0 when n *oo; hence

side

2 fn (x)

is

therefore

so does

uniformly conver-

gent in /.

1.

In the example 191, 3

Examples. we have already made

use of the substance of

Weierstrass* test. 2.

The harmonic

series Jj?

convergent on the semi-axis fact, for such s's,

,

which converges for x >1,

#>l + 1

where

<5,

<

d

is

uniformly

is

any positive number.

In

1

where 2yn converges. This proves the statement. known as Riemann's The function represented by the harmonic series is therefore certainly continuous for every 2a (a) ^-function and denoted by

x>

1.

3.

Differentiating the harmonic series term by term,

This again

uniformly convergent

is

m#^>l-|-<5>l.

logn ciently large n,

we

n6

-<1

(by 38,4);

the series

In fact, for every suffi-

for these n's and

for every

#>

then have 1

log n

1


n

7T~

is accordingly difFerentiable for every x represented by the series (*).

Riemann's f-function is

we deduce

4. If 27

>

1,

and

its

derivative

a n converges absolutely, the series 2 an cos n x and 2 a n sin n x

are uniformly convergent for every x, since e. g. a n cos n series accordingly define functions continuous everywhere. |

x

\

^ an = yw

.

These

In spite of its great practical importance, Weierstrass* test will necessarily be applicable only to a restricted class of series, since it 22

In

so that x

fact, if

>

1

+

we

8.

consider a special x

>

1,

we can

always assume 8

>

chosen

Series of variable terms.

Chapter XI.

346 in

requires

that

particular

When

absolutely. delicate tests,

the

scries

this is not the case,

investigated

we have

should

converge

make use

to

more

of

43. The which we construct by analogy with those of most powerful means for the purpose is again Abel's partial summation

On

formula.

from

tain

it

we

lines quite similar to those already followed,

first

ob-

the 00

A

Theorem.

198.

series of the

form

2a

n

(

x }'^n(x }

certainly converges

n-^O

in the interval /,

uniformly

if,

in /,

00

2jA v -(bp

1)

b v+1 ) is

uniformly convergent (as a

series)

and

v=0 2 2) (A n -6 n + 1 ) is uniformly convergent (as a sequence) *.

Here

the functions

A n = A n (x)

As formerly

Proof. ities

a v , b v and

first

have

Av

n+k

we have merely

as no longer

sums

denote the partial

to interpret

n+fc

x and k vary

2a

the

numbers, but functions of

2A r -(br -br ^) + (A n+t .bn+1l+1 2*, \ =r=n+l v^n-t-1 Letting

of

quant-

we

a;

-A n .bn+1

}.

any manner with n, we have on the

in

n (x).

left z

sequence of portions

of the series to the series

G^n'^n+i)' (v.

191,

2a b 2A v (bv v

v,

and on the right the corresponding one relative & y+1 ), and a difference-sequence of the sequence

Since by hypothesis the latter sequences always tend to it follows that so does the sequence on the left.

5 th form),

This (again by 191, Exactly as in

proves the statement

5),

43, the above theorem, which

in character, leads to the following

ageable tests

special, but

is still

more

very general easily

man-

:

2

a v (x) b v (x} is uniformly convergent in /, test. converges uniformly in /, if further, for every fixed value 25 and if, for the numbers b n (x) form a real monotone sequence

1.

if

24

more

Abel's

2a v (x)

of x,

A

23 fl , b , n are now always functions of x defined in the interval /; only n n For the notion of the for brevity we often leave the variable x unmentioned.

uniform convergence of a sequence of functions cf. 190, 4. 24 For simplicity's sake, we name these criteria after the corresponding ones for constant terms. 25

Cf. p. 315, footnote 8.

Cf. footnote to 184,

I.

Tests of uniform convergence.

48.

every n and every x in J, the functions and the same number 28 K.

347

b n (x) are less in absolute

vahie than one

Let us denote by an (x) the remainder corresponding to

Proof.

oo

the partial

sum A n (x);

of Abel's partial stitute u for

i.e.

n=o

a v (x]

summation, we

A r and we

= An

may

(x)

+ #(#)

In the formula

(by the supplement

183)

sub-

bv + l )

and

obtain

,

n\-k

2
it

(a n -& n +

1

)

again

<* 1

suffices

show

to

converge uniformly

both

that

2a

v (bv

However, the#n (#/s,

in /.

as remainders

and the bv (xjs of a uniformly convergent series, tend uniformly to in absolute value for every x in /; it follows that (an 'b n + 1 ) remain in /. On the other hand, if we conalso converges uniformly to


sider the portions n\-k

we can

easily

show

that these tend

uniformly to

in /,

thereby

completing the proof of the uniform convergence in / of the series under discussion. In fact, if av denotes the upper bound of a v (x) in /, Thus if f % is the largest of the numbers & n + l9 -*() (v. form 3 a). n+l

\Tn \<

2\b Vv=n+l

v

- 6, +1 ^ vl&.-M -

involves the fact that T"n

|

*0

uniformly in /.

00

2.

Dirichlet's

test.

J

n-O t'/

^^

and

a^

(a;)-

6 n (x) is

uniformly

convergent in /,

2

f

a n (x) are uniformly bounded 26 in of the series in J, the converif the functions b n (x) converge uniformly to partial

sums

gence being monotone for every fixed x.

Proof. The hypotheses and 192, 5 uniform convergence (again to 0) of (A n 'b n +

:L

immediately involve the K' denotes If, further, ).

The b n (x)'s form, for a fixed x a sequence of numbers bQ (x), 6 (#), . . . ; for a fixed n, however, b n (x) is a function of x, defined in /. The above assumption may, then, be expressed as follows: All the sequences, for the various values of x, shall be uniformly bounded with regard to all these values of x\ in other words, each one is bounded and there is a number which is !ft

}

K

simtdtaneously a bound above for them all. Or again: All the functions defined in / for the various values of n shall be uniformly bounded with regard to all these values of n\ i. e. each function is bounded, and a number J\ exists which simultaneously exceeds them all in absolute value.

Chapter XI. Series

348

a number greater than

all

the |^4 n

of variable terms.

n+k 2j bv r=n+l

n+k

b v+l

I

x 9 we have

for every

(a;)|'s

|

K

<*

-\b n + le+1

bn + l

\

way x and & may depend on n, the right hand side will by the hypotheses, hence also the left. This proves the uniform convergence in / of the series under consideration. The monotony of the convergence of bn (x) for fixed x has only been used in each of these tests to enable us to obtain convenient In whatever

tend to

b v + l \. By slightly modifying upper estimations of the portions 2\by the hypotheses with the same end in view, we obtain

Two

3.

The

du Bois-Reymond and

tests of

2a

Dedekinrt.

b v (x) is uniformly convergent in J, if both converge uniformly in J and if, at the same time, the functions b n (x) are uniformly bounded in /.

2a

a)

and

v

2

series bv

\

We

Proof.

n+k

the remainders

every v n ;> m,

|

use the transformation

n+k

As

v (x)

& v+ i

> m,

cc

y (x)

now converge

and every x

say,

in /,

n+k

we have, for Hence for every

uniformly to 0, |

<*(#)!

<

1.

n\-k

^r=n-fl 2\b,-b, +l

\;

x and k are made to depend as n increases, hence so does the expression on the left. That # M -& nfl tends uniformly to in / follows, by 192, 5, from the fact that an (x) does and that the 6 n (oj)'s are uniformly bounded in /.

on the manner any

the expression

on n,

in

b) series

The

S\b

v

series

b v+1

Sa \

v

even

right

now

(x)

if

tends to

b v (x)

is

uniformly

converges uniformly in

J

y

formly bounded partial sums, provided the functions b n in J.

Proof.

From

the hypotheses,

converges uniformly number greater than

(x)

->

uniformly

again follows at once that A n b n Hl more denotes a

Further, if K' once the |^ n ()|'s for every x,

in /. (to 0) all

it

J

in if the the series 27 a v has uni-

convergent

and

n+k

'-Sl&r-W vn+l

whence, on account of our present hypotheses, the uniform conver&y + 1 ) may at once be inferred A v (bv gence in / of the series

2

Tests of uniform convergence.

g 48.

Examples and

Illustrations.

1. Tn applications, one or other of the often reduce to a constant, for every n\

\vill

349

two functions a n it

and

(x)

b n (x)

usually be the former.

will

Now a series of constant terms 2 a v must, if it converges, of couisc be regarded as uniformly convergent in every interval; for, its terms being independent of #, so are its portions, and any upper estimation valid for the latter is valid ipso facto for every x. Similarly the partial sums of a series of constant terms 2a y if bounded, must be accounted uniformly bounded m every interval^ ,

Let (a n ) be a sequence of numbers with -T n convergent, and let for the x bn (x) = x n 1 The series 2a n x n is uniformly convergent in conditions of AbeV test are fulfilled in this interval. In fact, 2a n as remarked in 1., is uniformly convergent; fuither, for every fixed x in the intern zn 1. By the theorem 194 on term-by-terin val, (x ) is monotone and passage to the limit, we may therefore conclude that 2.

< <

.

,

,

|

lim

<

|

(2a n

x")

=

an x n ),

(lim

e.

i.

This gives a fresh proof of Abel's limit theorem 100. 3.

The functions

/ (namely, again we deduce that

in

bn (x)

<

1),

-

=-

also

and monotone

2 an

or

Hence, as above,

x.

(Abel's

limit

theorem

series.)

Let an

cos n x

(x)

v5!

/

N

t

/

N

a n (x).bn (x)

n=l then

every fixed

denotes a convergent series of constant terms.

Dinchlet 4.

x

for

-*..

"

if

form a sequence bounded uniformly

=sinng, and &() =

or

vi cos -

=

nx

M \i sm ---\]

x

_,

or

n-1

n-1

The

>*0.

-,

nn

i

(a

"*

^

>

series

t\\

0)

,

27 5 satisfy the conditions of DiricMet's test in every interval of the form. TT IT. 8, where 8 denotes a positive number

;S 2

In fact,

by 185,5, the

in the interval

partial

/we may take

K

sums

--- -

\

of

< 2a n (x)

and bn

uniformly, because b n does not depend on a:. it follows for the same reason that

(x)

are

^

uniformly bounded

tends monotonely to 0,

If (bn )

denotes any monotone

null sequence,

,2"

bn cos

nx

and

S bn sin n x

are uniformly convergent in the same intervals (cf. 185, 5). All these series 28 for every accordingly represent functions which are defined and continuous 87 Or in intervals obtained from the above by displacement through an integral multiple of 2 jr. 28 Every fixed x ={= 2 k n may indeed be regarded as belonging to an interval of the above form, if 8 is suitably chosen (cf. p. 343, example 1, and p. 345,

footnote).

12*

(G51)

199.

350 x

Chapter XI. Series of variable terms.

Whether the continuity subsists at the excluded points x = 2 k TT we not even in the case of the series 27 b n sin n x although once determine, certainly converges at these points (cf. 216, 4).

=j=

2 k

cannot it

IT.

at

t

Fourier

49. A.

Among

series.

Euler's formulae.

the fields to which

we may apply

the considerations developed

in the preceding sections, one of the most important, and also one of the most interesting in itself, is provided by the theory of Fourier series, and

more

by that of

generally

trigonometrical series, into

29 pose to enter By a trigonometrical series

which we now pro-

.

1

aQ

2 30

is

meant any

series of the

form

2 (an cos n x + bn sin n x), + w=i

a n and b n

If such a series converges in an interval of the form 2Tr, converges, in consequence of the periodicity of the trigonometrical functions, for every real #, and accordingly represents a function defined for all values of x and periodic with the period 2 TT.

with constant

.

c^x
it

We

have already come across trigonometrical series convergent everywhere, for instance, the series, occurring a few lines back,

.fr-~' We

a

^ ~

t

0; B

?r~^~'

have never been in a position, so

of these series for

all

values of x.

far, to

It will

a ^

.,

1;

etc -

determine the

sum

of any

appear very soon, however, that

trigonometrical series are capable of representing the most curious types such as one would not have ventured to call functions of functions at all in Euler's time, as they

may

exhibit discontinuities and irregularities

of the most complicated description, so that they seem rather to represent a patchwork of several functions than to form one individual function. 29 More or less detailed and extensive accounts of the theory are to be found most of the larger text books on the differential calculus (in particular, that referred to on p. 2, by H. v. Mangoldt and K. Knopp, Vol. 3, 8 th ed., Part 8, 1944). For separate accounts, we may refer to H. Lebesgue, Lecons sur les series tngonome'triques, Paris 1906, and to the particularly elementary Introduction to the 152. theory of Fourier's series, by M. Backer, Annals of Math. (2), Vol. 7, pp. 81 1906. A particularly detailed account of the theory is given by E. W. Hobson, The theory of functions of a real variable and the theory of Fourier series, Cambridge, 2 ud ed., Vol. 1, 1921, and Vol. 2, 1926. The comprehensive works of L. Tonelli, Sene trigonometnche, Bologna 1928, and A. Zygmund, Trigonometrical series, Warsaw 1935, are quite modern treatments; the little volume by W. Rogostnski, Fouriersche Reihen, Sammlung Goschen 1930, is particularly attractive and con-

in

tains a wealth of matter. 80

It is

only for reasons of convenience that

aQ

is

written instead of

a

.

Thus we

shall see later

=:0

/

2j

nx

sin

_ -

\

=i

A. Euler's formulae.

Fourier series.

49.

(2

on z x

or for ft

+

I

210 a)

(v.

=

that

e.

= 0,

n ft:T,'(ft

351

g.

2, ...), but

1,

-x !)*-!! for 2 o

2

+

(ft

the function represented by this series thus has a graph of the following type: *

Fig. 7.

we

Similarly,

shall see (v. 209) that =

^ j|

^i

\t->

'*

2w

n^O

for

for 2

j

~r

n=

ft

ft

n,

JT

but

< < (2 :r

ft -f-

1)

ar,

and

+X =-

~

for

thus the function represented by the series has a graph of the type: A

- 2ji

-

.?r

Fig. 8. In either case, the graph of the function consists of separated stretches (unclosed at either end) and of isolated points. However, the circumstance that simple trigonometrical series such

of representing functions which are themand "pieced together", is precisely what discontinuous selves altogether

as the above

was

are capable

chiefly responsible for the

of function,

thorough revision

and thence the whole foundation of

which the concept analysis, came to be

to

We

th shall see that century. subjected at the beginning of the 19 of the so-called are of most series capable representing trigonometrical 31 this a far more in constitute functions" ; respect, they "arbitrary in than series. instrument higher analysis power powerful 81

Of course the concept of an "arbitrary function"

is

not sharply defined.

The term usually denotes a function which cannot be assigned by means a single

closed,

formula

(i.

e.

one avoiding the use of

limiting- processes) in

of

terms

Chapter XI. Series of variable terms.

352

We

mention only incidentally that the range of this instrumeans restricted to pure mathematics Quite the conno by trary: such scries were first obtained in theoretical physics, in the course of investigations on periodic motion, i. e. chiefly in acoustics, optics, electrodynamics, and the theory of heat; Fourier, in his Thorie de la chaleur (1822) instituted the first more thorough study of certain trigonometrical series, although he did not discover any

ment

will

is

of the fundamental results of their theory. What functions can be represented by trigonometrical series and by what means can we obtain the representation of a given function, sup-

posing this to be feasible? In order to lead up to a solution of this question, let us first assume that we have been able to represent a particular function f(x) by a trigonometrical series convergent everywhere:

On f(x)

is

account of the periodicity of the sine and cosine functions, then necessarily periodic with the period 2n, and it is suffi-

cient, therefore, to consider

any

interval, for all that follows, to be

interval of length 2n. < x where 2 n,

We

choose this

one of the end-

<j points inay, moreover, be omitted. The function f(x) is then represented in this interval by a conknow that f(x) may none vergent series of continuous functions.

We

the less be discontinuous,

although it also will be continuous if the For the moment, series in question converges uniformly in the interval we will assume this to be the case. With these hypotheses, we obtain a relationship between f(x) and the coefficients a n and b n which was conjectured by Euler: i. e. in particular, it denotes a elementary functions alone, is apparently built up from separate portions of simple functions of this type, like the functions given as examples in the text, or the following, defined for every real x:

of the so-called

function

which

for irrational

x for rational x

x ,

however, the "arbitrary" function expressed by means of limiting processes on p 329, footnote. Not until it was found that even a perfectly "arbitrary" function such as these could be represented by a single (relatively simple) expression, as for instance by our trigonometrical series or by other did any necessity arise for regarding it as being actually limiting processes, one function, instead of a mere patchwork of several functions. etc.

Cf.,

Theorem

1.

The

200.

series

-0-00+ J;(0w cosn& 6 n=l

is

the

853

A. Euler's formulae.

Fourier series.

49.

+ &w sinna;)

assumed uniformly convergent** in the sum f(x). Then for n 0, 1, 2, ...,

interval

=

0<Ja?
33 .

(Euler or Euler-Fourier formulae)

As is known by elementary considerations, the following hold for every integral p and q (^> 0):

Proof. formulae

34

= a)

cospx-cos qxdx

J

=====

2* cos

/ o

V sin I

c)

px-

sin

qxdx

px

sin

qxdx

rc

=

( \

o

for

JT

=2 =

o

b)

for

for

=7i

[

for

Let us multiply the series for

for

/"(#),

/>

p />

p

+g = > = =

and

=j=

p

=

=

which

is

uniformly convergent

0<^x<^2n, by cospx; by 192,2 the uniformity of the conver gence is not destroyed, and after performing the multiplication we to 2n. may accordingly (v. 195) integrate term by term from

in

We

immediately obtain:

= V6 a 1

.-t

J f(x)cospxdx

f o J o

cospxdx

for

p

=

'

=a

/ cospx'Cospxdx

for

In consequence of the periodicity of cos re and sin uniformly convergent for every x.

32

facto,

a;,

^;

it

is

then, ipso

88

This designation is a purely conventional one; historical remarks are given by H. Lebesgue, loc. cit., p. 23; A. Sachse, Versuch einer Geschichte der trigonometrischen Reihen, Inaug.-Diss., Gottingen 1879; P. du Bois-Reymond, in his answer to the last-named paper; as well as very extensively by H. Burkhardt, Trigonometrische Reihen und Integrale bis etwa 1850 (Enzyklop. d. math. Wiss., Vol. 84

II,

1,

Parts 7 and

8,

191415).

We

have only to transform the product of the two functions in the integrand into a sum in accordance with the known addition theorems, fe. g. cos

p x cos q x =

-jr-

integrate straight away.

[cos

(/>

q)

x + cos (p + q) xn ,

in order to

be able

to

Chapter XI. Series of variable terms,

354 i.

e

in either case jt

f(x)cospxdx;

j

remaining terms give, on integration, the value 0. In the same way, multiplying the assumed expansion of f(x) by sinpx and then integrating, we at once deduce the second of Eider's formulae

for the

2

b = p

Jt

f(x)s'mpxdx.

I

The value of this theorem is diminished by the number of assumptions required to carry out the proof. Also, it gives no indication how to determine whether a given function can be expanded in a trigonometrical series at all, or, if it can, what the values of the coefficients will be.

However, the theorem suggests the following mode of procedure: Let f(x) be an arbitrary function defined in the interval <[ x <J 2 n, and integrable in Riemann's sense in the interval. In that case the 19, integrals in Euler's formulae certainly have a meaning, by

We therefore theorem 22, and give definite values for an and bn note that these numbers, exist, on the single hypothesis that f(x) is .

integrable.

The numbers

by Euler's formulae

will

-^-

a Q a lf a^, ,

2

.

.

and

b 13 b

9

...

thus defined

be called the Fourier constants or Fourier

coefficients of the function f(x). -?r &(\

.

The

series

4- b + n~^ J? #n cos n x ^ ^ f

"

sin

n x)'

may now be

written down, although this implies nothing as regards possible convergence. This series will be called (without reference to its behaviour or to the value of its sum, if existent) the Fourier

its

aeries generated by, or belonging to, f(x)

9

and

this

is

expressed

symbolically by

/()~4This formula accordingly implies no more than that certain constants an> b n > have been deduced from f(x) (assumed only to be integrable) by means of Euler's formulae, and that then the above series has been written

down 35

.

3i The symbol "/-v/" has of course no connection here with the symbol introduced in 4O, Definition 5, for "asymptotically proportional". There is no

fear of confusion.

49.

From theorem we

have,

it

is

true,

Fourier series.

and

1.

some

the

A. Euler's formulae.

manner

in

which

justification for the

converge and have f(x) for

its

this series

hope

355 was derived,

that the series

may

sum.

Unfortunately, this is not the case in general. (Examples will be the contrary, the series may not converge shortly.) On

met with very whole

in the

nor even at any single point; and if it does so, It is impossible to say off-hand necessarily f(x). case the other may occur; it is this circumstance which

interval,

sum is not when the one or

the

prevents the theory of Fourier series from being entirely a simple subject, but which, on the other hand, renders it extraordinarily fascinating; for here entirely new problems arise, and we are faced with a funda-

mental property of functions which appears to be essentially new in the property of producing a Fourier series whose sum is The next task is then to elucidate the function itself. to the equal

character:

connection between

new property and

the old ones, viz. conand so More conon. tinuity, monotony, differentiability, mtegrability, arise as which are therefore follows: the stated, problems cretely this

Is the Fourier series of a given (integrable) function f(x) con-

1.

< x
vergent for some or all values of x in

// it converges, does the Fourier series the value of the generating function ?

2.

sum

3.

the Fourier

If

u^ ^P> x

is

series

converges

the convergence

at

uniform in

n? of f(x)

all points of this interval?

have for the

its

interval

As it is conceivable that a trigonometrical expansion of f(x) might be obtained by other means than that of Euler's formulae, we may also raise the further question at once: 4. 7s it possible for a function which is capable of expansion in a trigonometrical series to possess several such expansions, in particular, can it possess another trigonometrical expansion besides the

possible Fourier expansion provided by Euler's formulae? is

It

not very

easy to find answers to

all

no complete answer to any of them is known would take us too far to treat all four questions

fact

these questions; in at the present day.

in accordance with our attention chiefly to the first two; the third we shall touch on only incidentally, and we shall leave the last almost entirely out of account 36

It

modern knowledge.

We

shall

turn

.

36

It should be noted, however, that the fourth question is answered under extremely general hypotheses by the fact that two trigonometrical series which 2 TT cannot represent the same function in that interval x converge in without being entirely identical. And if/(#), the function represented, is integrable 2 TT, its Fourier coefficients are equal to the coefficients of the trigonoover metrical expansion; cf. G. Cantor (J. f. d. reine u. angew. Math., Vol. 72, p. 139. 1870) and P. du Boit-Reymond (Munch. Abh., Vol. 12, Section I, p. 117. 1870).

^ ^

.

.

.

356

Chapter XI. Series of variable terms.

With the designations introduced above, the content of Theorem

1

be expressed as follows:

may

Theorem 5^ x 5^ 2

TT

(t.

la.

If a

e.

all #), it is the

for

converges uniformly in Fourier series of the function repre-

trigonometrical series

sented by it, and this function 37 admits of no other representation by x metrical series converging uniformly in 2 TT.

^ <

a

trigono-

The

fact that the Fourier scries of an integrable function does not necesconverge will be seen further on; that even when it does converge, it need not have / (
sarily

;

values of x, \\ithout coinciding everywhere (v. The fact that 19, theorem 18). in an interval of convergence the series need not converge uniformly is shown by

the example already used above; for the series

converges everywhere

J

^ ^

8 x and if the convergence were uniform, say in the interval 8, (v. 8 0, it would have to represent a continuous function in that interval, by 193. This is not the case, however, as we mentioned before on p. 351 and will prove later on p. 375.

185,

f>),

These few remarks suffice to show that the questions formulated above are not of a simple nature. In answering them, we shall follow the line adopted by G. Lejeune-Dirichlet, who took the first notable step towards a solution of the above questions, in his paper Sur la convergence des series trigonometriques

38

.

B. Dirichlet's integral.

We

proceed to attack the the question of convergence: If the Fourier series

-

a

2i

first

of the proposed problems, namely,

+ E (a n cos n x + bn sin n x)

generated by

i. e. with coefficients given in terms a given integrable function /(#), XQ its is to converge at the point x of f(x) by Euler's formulae,

=

partial

"

1

must tend

to a limit

whether or no

when n

this is the case,

+b ->

+

oo

.

v

sin v

XQ)

It is often possible to

by expressing

s n (x ) in

determine

the form of a definite

integral as follows:

87

88

,

sums

This function Journ.

f.

is

then (by 193, Corollary) everywhere continuous. angew. Math., Vol. 4, p. 157. 1829.

d. reine u.

49.

B. Dinchlet's integral.

Fourier series.

+b

For i>^l, the function a v cos v XQ

I

sin v

XQ

is

represented by

39

2

2,-t

~

v

357

+

f(f)cosvtdt\cosvx

j

Thus

We

take the important step of replacing the sum of the (n -f- 1) terms 40 for every by a single closed expression. We have indeed 4= %kn, for every a and all positive integral w's,

now

in brackets z

cos (a

+ + ,?)

sin

(

f

os

(

+ 2 2) H-----

1-

+^m+

sin

1

f

-~-J

cos

+ /w-)

(

201.

+ -5-)

2 sin 25

sin HI

39

point

a;

40

~cos

In order to distinguish

--

/ f

,

-j"

Z\ m 4~rr ~)

the parameter of integration from the fixed

we

henceforth denote the former by Proof. If the expression on the left ,

1

t.

is

denoted by

Cmt we have

+ sin *-)

+ sin (a + 2T+T -|-

r=2sinm-^-.cos fa-f

w + I ~J

.

Moreover the above formula continues to hold for z = 2 A JT provided we ute to the ratio on the right hand side the limiting value for z i. e. the value wcosct. ,

attrib-

358

Series of variable terms.

Chapter XI.

from which many analogous formulae may be deduced as XQ> m cases 41 t n, we obtain 0, z Taking a

=

.

+ cos

-5-

XG )

(t

^

~~~

O~

Accordingly

particular

=

=

-{-

-\

x

cos n(i

)

-

-

I

42 ,

'

N

"

'

sin(2n+l)-^5L

/A

(a)

we may

Finally,

transform

this

f(x) need only be defined

over

The

this interval.

latter

modify the value of f(2jr) to

and define f(x)

/*(())

expression

The

somewhat.

property remains unaltered 19,

(cf.

further, for

function

0<^x<,27i and integrable

in the interval

We

theorem 17). every x such i)jz,

we merely

if

will

it

equate

that

=

(A>

2,

1,

by:

41

For subsequent

we mention

use,

the following:

JT

a gives:

-.--{-a substituted for

sin

sin(a-f

jr)

+ sin(4-2*)H

/

g

m

sin

f

a

sin of

=

gives:

cosz-j-

g -

{-sin(r sin

2.

m -f 1

-j-

-x

'

.+

cos2^H

w

T

cosm+ 1

~

mz =

cos

;

z

sin

sin 3.

a =

gives

-5t

:

sin ^ 4- sin 2 s -f

-

-f-

m-

- -

sin

m

-}-

1 -~-

w* =

sin

.

;

Z

sin 4.

= cos

2a;, /

,

(y

-f-

a \

=y ,

x) -f

5.* = 2x, u = S in(y

05,

cos

/

give: ,

(y 4-

o 3

\ a:) -| ,

~+y-x,

(-

cos

/

(y

,

-f-

o 2

m

7

%

1 -a;)

=

sin

wo; -cos r

sin

)

4- ma;) -\

give:

SinWa + ^) + sin(y+ 3 + ... + sin(y + 2^^. g = a!

(y v

x

)

42 For /rrajy, as we observed once before, we should sine-ratio the limiting value for / *a; , here (2w-f 1) .

-

^

+ ma;) .

s

attribute

to the

Fourier series.

49.

Our function f(x)

now

is

defined for

/

(p(f)dt

=

/

cp(t)dt

=

9

/

(p(c

anc*

*)^*

-f-

/

the integrand in

now a

is

(a)

for

any function theorem 19), what-

19,


a

c

As

Now

to

it

and we have

real values of x

all

be periodic with period 2n. arranged with period 2n, we have (by (p (x) periodic ever the values of c and c' may be, for

359

B. Dirichlet's integral.

W<^

=

/


a-f-2?c

function of this type,

we have

8

/?

^J we

sin

the

into

this

integral up and n to 2n, substituting becomes If

to

split

t

7i

T the

pans

relative

for

in the second,

t

- 2w

to

intervals

the latter

t

r

sin(2n+l)-=-

* sin

i.

e.

by the above remark with regard

to

TT 2

J
sin(2n+l) ~ sin

-

o

.

i

and we accordingly obtain

o

Substituting 2

This

for

/

2

we

are ultimately led to the formula

3

by which the partial sums of the Fourier by f(x) may be expressed. We may therefore state,

is Dirichlet's

series generated

t,

integral*

,

important result, the theorem: In order that the Fourier series generated by a junc2. tion f(x), integrable (hence bounded) and periodic with period 2n, may

as our

first

Theorem

43

We

designate

as.

Dinchlet's

integrals

two forms a

a

sinkt

/

,

or

all

integrals

of

either

of the

360

XL

Chapter

converge at a point xQ9

it

Series of variable terms.

is

necessary and sufficient that Dirichlefs

integral

1

, (

sin/

n J should tend

sum

to

a

limit

(finite)

as

n

*

of the Fourier series at the point

+ oo #

TiWs

.

xs

fo'wutf

then the

.

Let us denote this sum by S(XQ ). The second question (p. 355), concerning the sum of the Fourier series, when convergent, may be included in our present considerations and our result may be put in a form still more advantageous in the sequel, by expressing the quantity a Dirichlet integral also. As S(XQ ) in the form of

-H-

+ cos + cos 2 t

1 -\

-----(- cos nt

=

sin (2

*+!)-

we have

or,

effecting

same transformations

the

before

as

with

the

general

integral,

o

44 Multiplying this equation

by

5 (#

),

we

finally obtain,

by subtraction from

202,

-

2O3

Our preceding theorem may now be expressed

Theorem2a.

/w order that the Fourier

t

as follows:

series

generated by a function

f(x), integrable and periodic with period 2ir, should converge s (x ) at the point XQ it is necessary and sufficient that, as n -> 00 ,

rf

+

to ,

the

sum

Dirichlet' $

integral

This equation may also be obtained from 202, by substituting f (x) ~ 1 ; a = 2 and, for every n 7-: 1, a n - b n - 0, i. e. sn (X Q ) = 1 for every n and every x . 44

this gives

Fourier series.

49.

should tend to 0, where for brevity

Dinchlet's integral.

361

we have put

theorem by no means solves questions

this

Although a

13.

1

and 2

such

in

manner

that the answer in given concrete cases lies ready to hand, yet furnishes an entirely new method of attack for their solution. Indeed

it

same may be

the

on

said with regard to the third of the questions proposed at once be modified to the following:

theorem 2 a may

p. 355, for

Theorem to s (x) at

3. On the assumption that the partial sums s n (x) converge every point of the interval a 5^ x 5^ ft, they will converge uniformly

and only

to this limit in the interval, if,

the integral, depending on

if,

J

sin

x9

t

u

as n

tends uniformly to e 0, we car assign

>

value for every

Before

-

>

oo

-

-f

a 5^ x fg

in

that

ft,

N = N so that this integral n > N and every x in a rg x fg (e)

is

is less

to

say

than

if,

given

in absolute

ft.

we make

use of theorem 2 to construct immediate tests of

series, we proceed first to transform and simplify theorem in various ways. For this purpose, we begin by proving the following theorems, which apparently lead us rather off the track, but

convergence for Fourier

this

also claim considerable interest in themselves.

Theorem

4.

... 2

integrable over

is

Iff(x)

and

77,

if (a n )

and

(b n)


are

its

2

Fourier constants, then

71-1

The

Proof.

^ 0,

as its integrand

is

)

converges.

( 1

a cos v

t 'I-

<-

dt

2 ** sin vi\

On

never negative.

the other hand,

2n

'2x

f

bn

n

2

[/(O

i'

is

-f-

2

integral

27t

J

(a n

2

[/(O]

2

dt2[a, J/ + J [27 (a

it is

27i

v

(*)

id t]

cos v

cos v

t

+b

v

2

sin v

2 [b 2

t)]

v

d

J/(f) sin v

td t]

t

o

dt

-2

where each summation expression

is

is

non-negative,

extended from v

we have

=1

to

v

= n.

Since this

362

Chapter XI. Series ot variable terms.

Thus the partial sums of the series (of positive terms) bounded and the series is convergent, as asserted.

The above Theorem

in question are

contains in particular

The Fourier constants (aj and

5.

of

(6 n)

an integrable

function form a null sequence.

From

we may deduce

this,

Theorem

6.

// y>(t) is integrable in the interval b

An /*

/ tp()cosn

=/ a

Proof. the

If

= f(i)

other real

ty(f) sin

tit

+

a<^t^b,

then

-+ 0,

nt dt ->

0.

a and b both belong to one and the we define f(t) t y; 1) n <^ 2 (k

form 2 k n
and

quite simply the further

=

same

interval of

in a <[

t
at the

t,

An

=fy

(t)

cos n tdt

= / f(t) cos ntdt = na n o

a

B

=

n bn similarly n of the function f(f). By

where a n and & M denote the Fourier constants theorem 5, A n and 5 W therefore 0. If a and 6 do not fulfil the above condition, we can split up the interval a < t < 6 into a finite number of portions, each of which satisfies the condition. A n and B n then appear as the sum of a (fixed) finite number as n *oo. Hence A n and B n do of terms, each of which tends to the same 45

and

,

.

This important theorem

will

enable us to simplify the problem of

the convergence of Dirichlet's integral

Supposing 6 chosen

~

(/

.,o)

arbitrarily

46 .

with

< d < -J

,

the function

|[n

45 This important theorem appears intuitively plausible if we imagine the curve y \p (t) cos nt to be drawn for large values of n: We isolate a small interval a . ft in which y (t) has an almost negligible oscillation (is practically constant) and proceed to choose n so large that the number of oscillations of cosn* is fairly large in the interval; in that case, the arc of the curve y = y>(/)cosw/ corresponding to .../? will enclose positive and negative areas in approximately equal numbers and of approximately the same size, so that the integral is almost 0. 46 Of course theorem 6 may be proved quite directly, without first proving theorem 4. The latter is, however, an equally important theorem in the theory, even though, as it happens, we shall not need it again in the sequel. .

.

is

6^t^^.

integrable in

368

B. Dirichlet's integral.

Fourier series.

49.

Hence,

for fixed d,

n ~2

/

c)

The limit as

Dirichlet

w->oo,

value of d

t/>

(0 sin (2 n

and only

>

new

the

t

-

d t -*

theorem 2 a

of

integral

if,

+ 1)

,

will therefore

tend to

as

for a fixed, but in itself arbitrary,

if

integral

2^

o

n

as

tends to

values of f(xQ

Since d

>

Now

increases.

2t) in

0^<<5,

may be assumed

contains at the

same time

the latter integral only involves the 2d. 2 d<^x<*xQ e. of f(x) in#

+

i.

arbitrarily small, this

remarkable result

the following

47 The behaviour of the 204. (Ricinann's theorem. ) X the at of f(x) point Q depends only on the values of XQ the This neighbourhood may be asin of neighbourhood f(x) sumed as small as we please In order to illustrate this peculiar theorem, we may mention the following consequence of it: Consider all possible functions f(x) (inte2n 2 n) which coincide at a point XQ of the interval grable in this of however and in some neighbourhood small, possibly point,

Theorem

Fourier

7.

series

.

.

.

varying with

.

.

the

particular

Then

function.

the

Fourier series

.

.

of all

however much they may differ outside the neighthese functions bourhood in question must, at XQ itself, either all converge or all in the former case they have the same sum S(XQ ) (which and diverge, be to not or may may equal f(x^)). After criterion

theorem

inserting

obtained

these remarks, we proceed to re-formulate the above, which we may henceforth substitute for

2:

Theorem

8.

The necessary and sufficient condition for the Fourier X Q to the sum s(# ), is that for an ar-

series of f(x) to converge at

bitrarily chosen positive 6

<

-5- ,

Dirichlet's integral

3

_;_ /o

i

sin/

should tend 47

to

as

n

increases

i \ A

dt

48 .

liber die Darstellbarkeit einer Funktion durch cine trigonometrische nd ed. p. 227). Reihe, Hab.-Schrift, Gottingen 1854 (Werke, 2 4* As of regards uniformity convergence, we can assert nothing straight away, since we are ignorant as to whether the integral (c) above considered, as n increases, for every fixed a? , will do so uniformly for which tends to every 2 of a specified interval on the a;- axis. Actually this is the case, but we do not propose to enter into the question further.

Chapter Xf. Series of variable terms.

364 There

is

no

in

difficulty

that

showing

denominator

the

In fact the the last integrand may be replaced by t. tween the original integral and the one so obtained, i.

sin

t

in

difference bee.

the integral

6,

because

s

automatically tends to

-

-T-T

Thus we may

Theorem

205*

as

n

by theorem

increases,

continuous and bounded 49 , and hence intcgrable, in

is

finally state:

The necessary and sufficient condition for

9.

series of a function f(x), periodic with the period

Q...271,

< t^ d.

2n and

the Fourier

integrable over

converge to S(XQ ) at the point XQ , is that for an arbitrarily

to

chosen positive d

(

<

-2

the sequence of the values of the integral

,

J

-g-

f J

,

.

X

v

sin (2

n -f2 T-

)

1) t

,^ dt

o

forms a null sequence. Here

>

can assign d

<

N>

? and

0, so that

50

for every n

> N,

6

^L

f

\

ft'

sin (2

n

+

1)

t

C. Conditions of convergence.

Our preliminary first

investigations

two questions of

p.

have

prospered so far

355 may now be attacked

that

the

By

the

directly.

above, these are completely reduced to the following problem: Given a function
"

In fact.1 -T sin/

-

:

tends to 60

t

~

-:

/.sin

/

=

-\

1

in

h-" ;

the interval, and thus

itself

as l-~*0.

The student should make

it quite clear to himself that the second foractually equivalent to the first, although d need only be determined after the value of e has been chosen.

mulation

61

is

For

t

=

0,

we

attribute to

in the integrand the

value A.

should tend

C. Conditions of convergence.

Fourier series.

49.

a limit as k increases, and what, in

to

value of this limit?

Since in

this

that

365

case,

the

is

52

& has a fixed but arbitrarily small value,

integral,

the answer to this question depends only on the behaviour of q>(i) immediately to interval of the form t <Jj (^ (5).

cf.

Riemann's theorem 7

the

of

right

We may

< <

What

0,

an

say in

accordingly inquire the right

properties must cp(f) possess immediately to that the limit in question may exist? order in 0, of large number of sufficient conditions for this have

also:

A

which we

of

shall

them

renders

only

most

for

sufficient

been found, the great generality of which purposes. The first of these was

two,

explain

established by Dirichlet in the above-named paper (v. p. 356) and was the first exact condition of convergence in the theory of Fourier series,

The second

winch Dirichlet's work is altogether fundamental. due to U. Dini and was discovered in 1880.

in

i.

e.

1.

Dirichlet''s rule.

in

an

// cp

interval of the

is

(t)

monotone

< <

form

t

d

(

^

to

<5)

the right

is

206.

of 0,

then the limit in

we have

question exists, and

6

lim

Jh == lirn^

^

^j yw

^

o

where

y>

denotes

the

hand) limiting value lim (p(), which

(right

tainly exists with the assumptions

Proof.

1)

In the

first

made 53

cer-

.

place,

lim

The

existence of this limit,

tegral,

follows simply from

i.

e.

the

the convergence of the improper infact

that,

o

>

values #' and x" both

,

we have

19,

(by

> 0,

and any two

theorem 26)

x"

x" sin

given e

t

, ,

hence x"

u

i

52 There is no simplification in observing that it would suffice tor k to tend to -f oo through odd integral values. 63 In fact, as

Chapter XI. Series of variable

366 as

Now,

we saw on

360, equation

p.

sin f _j

(2

*n=J6

= 0, 1, 2,

are

for

n

On

the other hand, the

.

.

.

,

all

n

(b),

+ 1) A/

Stai

=~

the integrals

, t

**

Therefore

.

terras.

we

also

have

t

w

~>

~

numbers

o

the developments on p. 364) form a null sequence, by theoiem (cf. Accordingly we also have

6.

n

_

.

Since,

this

however

19,

(v.

V

.

Psin (2 n

,

theorem

-f-

1)

*

TT

25),

implies that the above-named limit has the value 2)

By

^-.

a constant K' exists such that

1),

;

'o

for every

a?^0, and

therefore a constant

K(=2K')

such that

exists

b

a

for every a, b 3)

^ a <^

such that

Suppose

>

given

&.

and choose a

positive

<5'


^

,

so that

6,

and we

Writing 2

we

then have

fk

Jk

'

/A sin*

tending to

t

as k

>

+ oo,

by theorem

3G7

C. Conditions of convergence.

Fourier series.

49.

9 can accordingly choose k so large that

|

/

<

'

/

fc

fc

|

-g-

>

for every k

A'.

Further, T

2 f

/

sin

A =-J o For

the

ft *

,

2

.

sin

ft

o

second of these two

quantities,

we have * sin*

-,,

>

and we may accordingly choose &

>

&'

so large that

For / ", the first of the two quantities on the right second mean value theorem of the integral calculus theorem 27), which gives, for a suitable non-negative d" <^ <5',

for every A A of (d), we use the 19,

The

.

"ir^

J

latter

.

fc

integral

=

-^-dt and

therefore remains

< K in

absol-

^(5"

ute value, by

2).

Accordingly \

I

Combining the

=

<1 JT"\ x ^ I

S .

3~A'

.K A

<

e

<^

'

3

three results of this paragraph,

by means of

A = (A-A') + A"-f/r> we

see

given e !> 0,

that,

Thereby the statement 2.

Dtni's rule.

is

we can choose k

so that, for every k

>^

,

completely established.

If lim cp (t)

=

q>

exists,

and

if

for every positive

T
l9'

J

V* ^ >o1

(

T

remain

less

than

^

a fixed

number,

positive

then

lim/

fe

exi

fr-V-f-oo

More

shortly:

has a meaning.

If

the integral

I

^-^

^-^dt

t

which

is

improper

at 0,

368

Chapter XI. Series ot variable terms.

When

Proof.

r decreases to 0,

tonely but remains z

0,

Given

bounded;

which we denote

e

> 0,

the

therefore

it

for brevity

we may choose

by

a positive (ft

above integral increases monotends to a definite limit as

Vo

I

d'

<6

so small that

dt< ^'

J] Writing, as in the previous proof,

the difference (/

ft

k'

so large that

|

/k') tends /k'| < Jk

by theorem

to 0, -|-

for every &

>

before, with a suitable choice of &

&'

we

6,

> A'.

and we may choose Further, as

we saw

also have 8

J for every

i.

e.

k

when

>&

chosen,

d' is suitably

we conclude

cisely as before,

which proves the

We may 3.

Finedly,

-

1

7

" fc

<

also remains |

that, for

every k

>&

.

-q-

Thus,

pre-

,

validity of Dini's rule.

easily

MpscMtz's

deduce from rule.

//

it

the two following conditions.

two positive numbers

A

and a

exist,

such that 55 fn

< ^ /

<5,

Jk

then

+
.

Proof.

65

that lim

The "L^c^'te-condition", rp (i)

=

cp Q

exists.

|

9>

-n

K ^'^

as ^-*0,

itselt

implies

Fourier series.

49.

C. Conditions of convergence.

369

<

d the former integral remains less than so that for every positive t as required. a fixed number and in consequence of Dints rule /,, >

' (0) exists** and therefore 4

=

exists, then

A* 9V The

Proof.

implies

the

0<^<(5j,

<->+o

existence of

boundedness of the

i.e.

Hence / *
this

ratio

of a

fulfilment

an

in

interval

of

the

with a

Lipschitz- condition

form

= l.

asserted.

fc

to

corollary

these

conditions

immediately ob-

is

tained

Corollary. // cp (f) can be split up into the sum of two or more functions, each of which satisfies the conditions of one of the four rules above, then lim cp (t) (p again exists, and the Dirichlet integrals Jk t->+o of the function (p(t) tend to
=

.

The above rules may at once be transferred to the Fourier series an of integrable function f(x), which we assume from the first to be 2 n and to be extended to all other real values of x in given <^ x

<

by the equation In

order

to a

the Fourier series

thai

sum s(#

)

at the point

XQ

generated by f (x) should converge the integrals

,

,5

T

/H

=

2 f -jJ

f

.

N

v(*;*o)

~ dt

S

sin(2tt-f I)/

..

o

must, by theorem 9 (&05), form a null sequence, where, as before,

v (<; *)

= \ [/K + 2 + /(* - 2

- s K)

f)]

.

This form of the criterion shows, over and above Riemanris theorem 2O4, that neither the behaviour of f(x) immediately to the right of a? nor that immediately to the left of # , have in themselves any influence whatever on the behaviour of the Fourier series of f(x) at XQ What

,

.

is

is

that

the

behaviour of f(x)

important stand in a certain relation

to

to

the

that on the left of

x

should such that namely,

right ,

X

of

the function )

56

~ il/K + 20 +ffo> -

It suffices that cp' (0) should exist as the rv*ht 19, Def. 10), as in fact the possible values of 9 (t) for t

2

ft]

- S(XQ

)

hand differential coefficient (v. do not come into account. ~^*

370

Chapter XI. Series ot variable terms.

should possess the necessary and

sufficient

of the limit of Dirichlet's integrals It

is

not

Jk

properties

(206)

known what

57

for the existence

relative to q)(t). are. The four conditions

these properties convergence of Dirichlet's

given above for the integrals furnish us, however, with the same number of sufficient conditions for the convergence, at a special point XQ , of the Fourier series of a function f(x).

Each

of these conditions requires, in the

should tend to a limit

which we are about

A common

.


to set

Km i [f (*

(8)

-

must the

exist.

The

is

up

first

+ 2*) -/(*,,--

value of this

l/(*o

considered as a function of

At the same theorem 2 a, be 0.

above.

2

by theorem

limit,

of the Fourier scries of f(x) at X Q> This convergence is ensured if the function

=

for

assumption

all

accordingly the following:

sum

o)

instance, that the function

if

+ 2 + f(*9 ~ f)

the

rules

The limit

<)]

will

2,

then

also

be

the latter converges.

2

<)]

- s (* ),

one of the four conditions given in those conditions must,

fulfils

time, the value

We

conditions are satisfied:

207.

1 st

assumption. The function f(x) is defined and integrable (hence x 2 n and its definition is extended to all bounded] in the interval

^ <

real values of

x by means

2 nJ assumption.

of the relation

*1,

ln[f(x

+ 2t) + f(x

-2()],

where XQ denotes an arbitrary real number, but is kept fixed throughout, and its value is denoted by s (# ), so that the function

9 (0

=9

= | [/(* + = 0. lim 9

(': *o)

has a right hand limit

2,...

The limit

2

+ /(* -

2

I)]

exists 58,

- i (*o)

(f)

With

these joint assumptions, we have the following four criteria for the convergence of the Fourier series off(x) at the point x : 87

Define

e. g.

/ (x)

as entirely arbitrary to the right of x x 8 8) and, in x

an interval of the form x

~

<

<

+

x (but integrable x < x 0> let f(x)

- <

1 /( 2 *o x) say. The Fourier series off(x) at x is convergent with the (Proof, for instance, by means of Dirichlet's rule 208, 1 below.) 68 The two-sided limit then necessarily also exists.

sum

in

= 2

>

Fourier series.

49.

IMrichlct's rule.

1.

< < t

form is

C. Conditions of convergence.

monotone

//
an

in

the Fourier series of f(x) converges at

<5j,

371

interval

XQ and

its

of the

sum

59

equal to S(XQ ).

Dint's

2.

rule.

// for a fixed (otherwise arbitrary) positive

num-

ber d the integrals

p

dt

< < d,

T remain less than a fixed number for every r such that Fourier series of f(x) converges at x and its sum is S(XQ ).

The same

Lipschitz's rule. the integrals should

3.

that

numbers

A

and a should

be

exist,

is

true,

bounded, we

such

that, for

if

instead

stipulate

every

t

that

of

two

such that

the

requiring positive


4 th rule. The same is true, if instead of the Lipschitz- condition we require that
The application of these rules following corollaries:

is

made

considerably easier by the

Corollary 1. The function f(x) also fulfils the assumptions 1 and 2 Fourier series converges at X Q to the sum s(# ), if f(x) can

and

its

be split up into the sum of two or any fixed number of functions, each of which satisfies these two joint assumptions (for a suitable s) and in some neighbourhood of x fulfils the conditions of one of the above rules.

Corollary

2.

Similarly,

tion 2 that each of the

lim f(x t->+0

should

exist,

it

suffices to stipulate in place of

two (one-sided)

+ 2 = f(x + 0) f)

and

assump-

limits

lim f(x

- 2 = f(x - 0) 1)

f-v+0

and

^=/t*o +

that the

2 ')-/'(*o

two functions and
+

=

-

-

-

2 t) f(x (t) f(xQ 0) should each, individually, satisfy the conditions of one of the four rules. The Fourier series of f(x) is then convergent at XQ and has the sum * (*o)

= ![/(*(> + 0) + /X*o -<>)] One

or two special in applications, corollaries:

portance

cases,

which, however, are of particular im-

may be mentioned

in the following further

69 In case it converges at XQJ the Fourier series of a function f(x) satisfying the assumptions 207 accordingly has the sum /*(#) if, and only if, the limit s(a? ), whose existence is stipulated in the second assumption, =f(x ). Similarly in the case of the following rules.

208.

Chapter XJ. Series of variable terms.

872

Corollary 3. If f(x) satisfies the first assumption and is monotone both to the right and to the left of x , the limits mentioned in the preceding corollary exist, and the Fourier series of f(x) converges at XQ to

sum s(z

the

)

= y [f(x + 0) Q

-f-

f(x

Hence,

0)].

more

still

particularly:

The Fourier

Corollary 4. first

will

assumption

series of a function f(x) which satisfies the at the point x and its sum will be the

converge

value f(x) of the function at that point, monotone on either side of XQ

if

f(x) is continuous at

X Q and

.

Corollary limits

If

5.

f(xQ

further,

if,

o-o

Um

the first assumption, and the two both the (one-sided) limits

satisfies

f(x)

0) exist;

and

then the Fourier series of f(x)

exist;

have the sum

s (XQ )

will

converge at XQ and

will

= ~ [f(x + 0) + f(x - 0)]. Q

Corollary 6. The Fourier series of a function f(x) which satisfies the assumption will converge, and will have as its sum the value of the function, at any point XQ at which f(x) is differentiate.

first

50.

Applications of the theory of Fourier series.

As we see from

the

rules

of

convergence

developed

above,

extremely general classes of functions are represented by their Fourier This we propose to illustrate by a number of examples. series.

The

function f(x) to be expanded must always be given in the 2 n and must possess the period 2 n: f(x 2 n) <^ x f(x). series is in Fourier obtained in the then, general, corresponding

The

=

<

interval

form

In particular cases, the sine- or cosine-terms if

f(x)

(the

x

is

graph of f(x)

= k n,

= 0, (k

is

1,

symmetrical with 2,

.

.

n is

evident

partial

In fact,

.),

if

integrals.

-

bn

respect to the straight lines

and therefore

2n

as

may be absent

an even function,

n

2n

= / f(x) sin n x d x = f + / =

we replace x by 2 TT The Fourier series

,

n x in the second of these two

of f(x) thus reduces to a pure

cosine-series.

on the other hand, f(x)

If,

graph of f(x)

(the

k

= 0,

is

2,

1,

373

Applications of the theory of Fourier series.

50.

.

.

an odd function,

is

with respect to the points x

symmetrical

= kn,

and therefore

.),

271

n

.

an

= / f(x) cos n x dx = 0, o

Thus here the Fourier

series of f(x) reduces series. sine pure There are accordingly three different ways in which an arbitrary given function F(x), which is defined and integrablc in a <^ x <^ b, may be prepared for the generation of a Fourier series.

as

equally evident.

is

to a

t

l

method.

a ^> 2 n, a portion of length 2

b

If

n

cut out of

is

say cc^,x
transferred the interval (a, 6), a defined in we 2 71: thus obtain function the to point a; <^ x f(x) It is then defined for the whole #-axis 60 by means of the condition of periodicity f (x -^- 2 stant (b) in

=F

= /(#).

TT)

If 6

b^x<.a+27T

#

<2

<

define /(#) to be con-

?r,

and proceed

is

as before

61 .

^

method. Precisely as above, define a function f (x) in 5^ x TT / (2 77 (not 2 77) by means of /? (#), put / (#) #) in TT fg #
3 rd method. Define/(#) 0,

but put

f(x)~

for all further x's

The

/(2

TT

as

< x < put/(0) = /(TT) = < < 2 then again define /(#)

above for

^) in

?r

by the condition of

TT,

jc

TT;

periodicity.

functions which aie obtained by these methods from a given function F(#), and which are now suitable for the generation of a Fourier series, we shall distinguish as f^(x) t f%(x}, f9 (x)- Whereas /*j

three

certainly give a pure cosine scries and f% (x) a pure sinewill lead, as a rule, to a Fourier series of the general (x)

will

(#)

f

series,

form (unless, in fact, f (x) is itself already an odd or an even function). Since our rules of convergence enable us to recognize the convergence only at points XQ for which lim it

exists,

will

~^ [f(x + 2t) + f(x -

be advisable

to

modify

our

2

t)]

functions

further at

the

=F

>

60 If b 2 TT, a portion of the curve y a (x) is left out of the representation altogether. If we wish to avoid this, we need only alter the unit of measurement on the x-axis so that the interval of definition of (x) has the length 2 TT;

F

i.

e.

we 01

substitute

Or

a

+

-

^

- x for

x.

77

else give the interval of definition of fying the unit of measurement on the *-axis.

13

F (x)

the exact length 2

TT

by modi-

(G51)

Chapter XI. Series of variable terms,

374 junctions 2 k

by writing

TT

/(0)=/(2A7r)--:lim x ->

whenever

this

limit exists.

provides not exist,

the

condition

our resources

as with

we

=

209.

1.

now go on

3

(2 k

E=

77)

= 0.)

If

/3

(x),

limit

this

and does

value f(2kir) does not come into account, cannot discover whether the Fourier series con-

to concrete

examples.

Here

F(x) ss a =f 0.

Example. fi(x]

=/ (0)

For corresponding reasons we have already put

verges there or not. ^ above. /a 00

We

certainly the case for

is

(This

/3

functional

the

"

I

/g (a;)

EE a, while for

we have

to put

x

=

n

< < n, <x<2

and x

= n>

x

a

a

7i.

Dirichlet's conditions are evidently fulfilled at every point (inclusive of the junctions), for each of the three functions. The expansions obtained

must accordingly converge everywhere and must represent the functions For f^(x] and f%(x), however, they are trivial, as they themselves. reduce to the constant term 2

=

aQ

= a.

For fs

\f3 (x)sm

nxdx =

we

however,

obtain:

2n

*

JT

(x) f

~ \smnxdx =

\s\nnxdx

\

smnxdx

t

n i.

e.

The expansion accordingly f

/

x

4 a

r

for

even values of n,

for

odd values

of n.

is

. ,

sin 3

x

,

sin 5

a;

5

or 3t

.

~T in sin 3 a?

.

sin 5 a?

at

and at

JT,

-- in

This establishes the second provides the

sum

of

the

examples given on p. 351, and whose convergence we were

of this curious series, of

already aware

(v.

185,5)

series, with the first of

connection

(v.

62

For x

.

which we

= ~,

,

m

are familiar

1 -

13

Example.

F(x)

----

_L r

~

J

L_

_|_

ax, in

an ax

in

Here

0<#<27r, and

at

<J

7i

B)

a;

in

at 2

<^

?r

in

<x<

at

and

rc,

rc,


2

at TT,

n

in

first

of the

210.

,

,

I

which establishes the

gives:

sin4ap

sin Hac i

rc,

rrc,

After an easy calculation, the expansion of -L.

'

2'

(a 4= 0).

o;

* 3

-4

a2jr x

=

13

a (2

s' u *

. . .

'

17

~ - JL

-

ax

\

special

entirely different

n

11

(

an

obtain

1,11, _

'

we

^,

122):

^ 4-

2.

375

Applications of the theory of Fourier series.

50.

x

n

ftn

T*-

in

<

at

and

examples of

at

p. 351.

Similarly, the

expansion of f9 (x) gives .

x

(b)

.

sin oc

sin 2 '

+

sin 3

x

sin 4

a?

,

T" in at rr, a?

Or, more shortly,

_f*in at

ft

-ir-

in

ft

<

< 05

<[ 2 rr

<

TT,

TT.

62 This and the following examples are already found, for the most part, in Euler's writings. Many others have been given by Fourier; Legendre, Cauchy, Frullani, Dirichlet and others. They are collected together, in a convenient form for refer-

H. Burkhardt, Trigonometnsche Reihen und Integrate bis etwa 1850, Enzyklopadie d. math. Wiss., Vol. II A, pp. 902920.

ence, in

376

The

Chapter XI. Series of variable terms. function f2

cos

(#),

a: ,

-Tz-

however, provides the expansion:

x

cos 3 53

"I

cos 5

,

x

_

,

h

H3

1

8 |

inn S The

=

of these expansions gives for x

first

x -=

third, for

known

the

known

the series, also previously

0, gives 1

+ V + 5^ + 7 +

'

'

=

'

from which we may immediately deduce the

series for

^;

the

to us (137),

8"'

relation

i+i+i+i+...=v 83 previously established (136, 156 and 189) in an entirely different way . On comparing the two results, we obtain the remarkable fact that in

<x^

TT

the function x

capable of the two Fourier expansions

is

sin 3

_

~~

4

With

cos

rcos_x "

L"!

lr

,

7

3y

x

cos 5 y ,

.

and

_.

.

"1 '

"^

'

32

a view to penetrating

6

'

J

further into the significance of these / (x) and a few of

still

graphs of the function

results, it is well to sketch the

the corresponding curves of approximation. This we must leave to the reader, and we shall only draw attention to the following phenomenon:

The convergence that of the scries 63

A

fifth proof,

a

and

sin

uniformly convergent in

term over that

this is

117 b.

interval.

we

tt

^-

t

uniform

is

sums

for all #'s;

not so

are discontinuous, the

The expansion 123 is made in 123, together

see that the expansion

f*

^

and may therefore be integrated term-by-

process, or 7r

a

"8

note 38 to 156.)

c

Now

shewn by a recurrence Hence at once

This method was

210

b, since their

quite different again, is as follows: f x 5 1, by the stipulations

uniformly convergent in with 199, 2. Putting x

is

of the series

210

essentially given

by writing cos 1

=

_

w== o(2w~+ l)

by

Euler.

a

t

=

z and using Example

*

(Cf. the note referred to in the foot-

first at 0,

377

Applications of the theory of Fourier series.

50.

the second at

In the former case, the approximation curves

TT.

the zigzag line representing the limiting curve along the lie its whole of length, whilst in (a) and (b) the corresponding state of affairs cannot occur (cf. 216, 4). and does not close to

=

cos a x (a arbitrary 64 but 4= 0, 1, Example. F (x) We first form the function /2 (x), and accordingly define

3.

a)

ax

cos

f

2,

,

.

.).

0^#lS7r

in

| cos a (2

.

TT

in

x)

TT

^x<2

TT;

function continuous everywhere, which by Dirichlefs rule will also generate a Fourier series continuous everywhere, which represents the function, and is necessarily a pure cosine-series. Here we have thus

/2

TT

an

(#) is a

n

JT

2 J cos a x cos w

x

jc c/

J [cos (a

+ w) ^ + cos (a

w)

A;]

d x\

hence, as a was assumed not to be an integer, 7Tdn

Therefore the function /2 cos OLX in

For ^ ^^

TT

^

we

TT,

from entirely

^+

(x) in is

TT,

f

i \

(^

l;

sma TT

n 2a

g'lT^a

^ ^2

or in other words the function represented by the series Jt:

TT,

:

obtain from this the expansion 117, previously deduced

different sources:

cos 77

^?

_

----

(X.TT

sin a

=

COt

7T

a 7T

TT

2 a = - + -=a -+a a 1

r=2

2

-^ 2

'

I

-

2 a

.

.

.

*

^,2 -('

2

We

24. thus enter the sphere of the developments of Of course the other series expansions there deduced may also be obtained directly from

Thus 212

our new source.

_TT_ ~___!__ a sin a

TT

~*~ - __ 1

2j*

a2

x

gives for

_

,

2 a __ ~__"^__ 3

2 a

a 2~- 2 2

2

Subtracting the cotangent expansion obtained just before,

^

1

~_

cos arr

~sirTa

~"

w mn

aw

_ ""

~2"

4a

"" a2

^T

4a

"~

2

a2

^

2

a2

-

32

~

we

further obtain

4a

""

"

*

"

a 2 ~^~5 2

and so on. b) If we now similarly construct an cos a x, we have cos a x in

/3

= (#)

[ 84

<# <

J

J

odd function /3

at

and

cos a (2

TT

at

(#)

from

TT,

TT,

je)

in

TT

<x<2

Because otherwise the cosine-expansion would become

TT.

trivial.

F (x)

=

378

Chapter XI. Series of variable terms.

Here a may is

The

easily

<x 213.

worked

integral values without reducing the result to

assume

also

a trivial one.

coefficients b n are obtained

from

integrals

whose value

out, and they lead to the following expansions, valid

in


a) for

0,

-,

T .-

j8)

for a

. .

.

2,

1,

tin

*

\ [12

:rp

4 r

2

*

sin

^

.

sin 2

2

all

+ 32 ~^ sin 3 * + x

4

+4

-rr 2

,

5*

sin

.

.

p

2

sin 4

x

'

'

']>

+

if /> is .-

,

, '

'

it

'

.,

.

p r

is

innumerable numerical series

the above series,

odd.

may

be

taking particular values of x and a.

4.

The

5.

If the function

F (x)

treatment of

cos

x+

sin a

F (x) =

tion of a pure cosine series,

214.

+ g,

/>

p*

deduced by

-.-inSa

= i = integer

cospx =

From

+

x leads to quite similar expansions.

log (2 sin ^ J

we

arranged for the genera-

is

<x<

obtain the expansion, valid in

^. + ^^ +... = -

log

(2

sin

J)

TT,

.

however, to be shewn by a special investigation that the result

It has,

holds in spite of the fact that the function is unbounded in the neighand 2 ?r, and therefore is not (properly) intcbourhood of the points V where this will follow quite simply in another below, 55, grable. (Cf.

way.) 6.

F (x) = e yx +

Example.

We

cosine series.

~ ax ,

a 4= 0,

is

be expanded in a

to

have therefore to take /

f

\

t

F (*)

^*^* in ^x<2

in

TT

J*W~~\F(2ir-x)

IT.

After working out the extremely easy integrals giving the coefficients a nt we obtain JT

which t

go*

is

for 2 a

+-

g-qv

valid in TT

_ -

a

_1

TT 5=1

x

for simplicity,

to the relation,

^+ we

TT.

If

we

^

substitute

e. g.

,

x

=

TT

and write

are led, after a few simple transformations,

valid for every

IT _I

a

,

t

4=

_ 1 _ Al

^2 Z

.

1-

i.

to an "expansion in partial fractions" of this remarkable function;

e.

its

379

Applications of the theory of Fourier series.

50.

we

expansion in power series function

the

-~

was considered,

t

can at once deduce from

-JT?

the latter by multiplying

by

t

2

for

and adding

24, 4,

where

our function reduces to

1.

Various remarks. The very fact that trigonometrical series are capable of representing extremely general types of functions renders the question as to the limits of this capacity doubly interesting. As was already remarked, necessary and sufficient conditions for a function to

new

be representable by

of

kind, for

its

all

Fourier series are not known.

attempts to build

damental properties (continuity,

On

the con-

it

up

directly

differentiability,

by means of the other funetc.) have so far

mtegrability,

We

failed. all

its

we find ourselves obliged to consider this as a fundamental property of functions,

trary,

must deny ourselves the satisfaction of supporting this statement by working out relevant examples, but we should nevertheless like

details

put forward a few of the

in

to

facts in this connection.

of the conjectures which will naturally be made at first sight is that This is not the all continuous functions are representable by their Fourier series. case, as du Bois-Reymond was the first to show by an example (Gott. Nachr. 1873, 1.

p. 571)

2.

tinuous

One

.

On is

the other hand, to assume the function differentia ble as well as con66 is necessary, as is shown by Weierstrass* example of a uni-

more than

formly convergent trigonometrical

a n cos(b n irx) n=l

which accordingly a function that

series, viz.

/

00

is

(0 \

<

a

<

1,

b a positive integer,

is the Fourier series of its sum (v. 200, continuous but nowhere differentiable.

1 a),

ab >

3 1 4-

\

^ n), /

but which represents

We

65 now have simpler examples than that mentioned above. E. g. L. Fejer has given a very clear and beautiful example (J. f. d. reine u. angew. Math., Vol.

137, p. 06

1875.)

1.

1909).

Abhandlungen zur Funktionenlehre, Werke, Vol.

2, p. 223.

(First published

380

Chapter XI. Series of variable terms.

Whether continuous functions exist whose Fourier series are everywhere is not at present known. 4. A specially remarkable phenomenon is that known as Gibbs* phenomenon 67 which was first discovered (by J. W. Gibbs) in connection with the series 2 10 a: 3.

divergent

,

The

curves of approximation y neighbourhood of * = 0. More

maximum

greatest

ordmate.

Then

n

6a

of

->

y

=

17808

-r\

overshoot the mark, so to speak, in the by (n the abscissa of the between and IT and let yn be the corresponding

precisely, let us denote

sn (x)

but

;

=^ s n (x)

n does not

Thus

value g equal to

(1

which the curves y

= sn (x) approximate

210

a (p. 351,

fig.

length exceeds the

mation curve portion

is

is

7), a

.

.).

.

-*-

it

-, as

we

should expect, but tends to a

appears that the limiting configuration to

contains, besides the graph of the function stretch of the >--axis, between the ordinates g, whose

2

"jump" of the function by nearly

drawn

for n

=

9

m

the interval

.

In

-.

.

.

?r,

th

the

fig. 9,

and for n

=

approxi-

44 the

initial

given.

51.

Products with variable terms.

Given a product of the form

//a =i whose terms

are functions of x,

+/.(*)).

we

shall define (in

complete analogy with

the theory of series) as an interval of convergence of the product, an interval at every point of which all the functions fn (x) are defined and the product

/

itself is convergent.

Thus

e. g.

the products

/(:

5). //(-

+

).

//('

+ <-

*).(.

are convergent for every real x t and the same is true of any product of the form 77(1 + an x), if 2 an is either absolutely convergent (v. 127, theorem 7) or a con2 ditionally convergent series for which 27 a n converges absolutely (127, theorem 9). }

For every x in f> the product then has a specific value and therefore defines a determinate function F(x) in /. again say: the product

We

represents the function

The main

in /.

F (x)

question

in /, or: is

F (x)

as before:

expanded in the given product how far do the fundamental prois

(of continuity, differentiability, etc.) belonging to the terms fn (x) hold for the function (x) represented by the product? Here again the

perties still

F

67

J.

Gronwall, 68

first

W. Gibbs, Nature, Vol. 59 (London 1898-99), p. 606. Ober die G&fasche Erscheinung, Math. Annalen, Vol.

The maxima

in the interval occur at

being the greatest

x

=

maximum. The minima occur

*

~-.,

.,

at

x

=

2

*

-

f

.

.

4

77

-

n

Cf. also T. II. 72, p. 228, 1912.

IT

n

, . .

.

.

.

,

the

Products with variable terms.

51.

381

answer will be that

this is the ease in the widest measure, as long as the are uniformly convergent. considered products What the definition of uniform convergence of a product is to be is almost obvious if we refer to the corresponding definition for series,

we

since in either case

are essentially concerned with sequences of functions down the definition corresponding

However, we shall set (cf. 190, 4). to the 4 th form (191, 4) for series: Definition

The product II

.

convergent in an interval

depending only on

/,

e,

//,

+/(*))

(1

given e

> 0, a

not on x, can

is

said to be uniformly

single number

N=N

17

(z)

be chosen so that

x in /. for every n ~> N, every k > 1 and every It is not difficult to show that with this definition as basis the theorems 47 hold substantially for infinite products 71 We will, however, leave the details to the student, while we prove a few theorems which are less

of

.

which

far-reaching, but

will

amply

suffice for all

which have the advantage of providing us

our applications, and

same time with

at the

for the uniformity of the convergence of a product.

Theorem and

+ fn (x))

The product //(I

1.

We

first

criteria

have

converges uniformly in

/218.

a continuous function in that interval, if the functions fn (x) continuous in / and the series 2 fn (x) converges uniformly in /.

represents

are all

\

\

Proof.

If

2

converges in /, so does the

product // ( 1 (- /(#)), by 127, theorem 7; indeed, it converges absolutely. Let F (x) denote the function it represents. Let us choose m so large that 1

fn (x)

l/m+l (*) for

every x

in

J

I

|

+

I/H 2

(*)

and every

I

+

+

k^l;

Ifm+K (*)

this

is

|

<

possible,

1

by hypothesis.

Consider the product

// (!+/(*)),

n=m+l 69

in

The symbol

4648;

cf. p.

o in this section again holds only with the 327, footnote 1.

same

restrictions as

70

This definition includes that of convergence. If the latter be assumed, the "remainder" rn (x) and (1 n+ (#))(! H fn +* 0*0) define uniform convergence as follows: //(I n (x)) is said to converge uniformly in/, if for every (xn ) in/, however chosen, rn (x) -> 1.

+/

we may speak of

i

+/

Writing //(I

+/(*))

= Pm (x)

and 77

i/=l

quite easily deduce

fv

(x) there,

i>

e.

g.

the continuity of

by means of the

(1

= rofl

F (x)

at

x

+/(*))

= Fw (*),

we may

from that of the functions

relation

F (x) - F (*) - P m (*) Fm (*) - Pm (*) Fm (*) = [Pm (x) - P m (*)] Fm (x) + [Fm (*) - F m (*)] P m (*). 13

(051)

382

Chapter XI. Series of variable terms.

and denote

its

partial products this product.

represented by Fm,

by p n

We

~ Pm+l + (Pm+2 ~~ Pm-\ + = Pm+l + Pm\ */w+2 + Pmj l)

1

i.

Fm (x)

e.

from In

30.

fact, for

2

>

n

(x),

have

Fm (x) be the function

m. Let 190, 4)

(cf.

+ (Pn */w+3 +

+ + Pn-l '/ +

Pn-l)

as is indeed evident by an infinite series Now (by 192, theorem 3) this series converges uniformly in J. m, we have every n

is

also expressible

>

and

!/(*)

I

n*=M-\-l

of

uniformly convergent in /, by hypothesis. Accordingly the sequence its partial sums, i. e. the sequence of functions p n (x), tends uniformly

to

Fm in/, so

is

CO

that the product n

and

in /,

//

+/n (x))

(1

-m+l

seen to converge uniformly

when we

this property is not affected

Fm (x)

is

prefix the first

m

factors.

necessarily continuous in /, since the terms of the By 193, The same series which represents it are all continuous in that interval. is

is

then true of the function

F (x) =

A

Theorem 2\fn

.

.

// the functions

2.

but

(x) |, also differentiable in /.

of J

+ /i (*))

.

+ fm (*)) Fm (x),

(1

q. e. d.

similar proof holds for

if not only is

(1

where

F (x)

is

4=

fn

'

\fn (x) Moreover its \

given by

(x) are all differentiable in

converges uniformly in /, then

J and F (x)

differential coefficient at every point

72

Proof. The

proof may be put in a form analogous to that of the previous theorem; however, in order to make other methods of attack familiar, we will conduct the proof by means of the logarithmic function, as follows.

72

8

-

For

-

is

If

g

m

Let us choose

so large that

(x) is difTerentiable at a special point

called the logarithmic differential coefficient

(x)

= gi (x)

-

a

(x)

.

gk

(x),

we

SLM _ Si' W g(x)

provided that the functions

g, (x)

,

have, as

*/(*>

"*"

g,(x)

x and g

ofg

is

(x),

(x) 4=

because

,

log

|

g

(x)

|.

well known,

"*--*- *(*> ,

there, the ratio it is

,

& ffi

A (x) are all differentiable at

'

the point

x

in question.

51.

> m,

for every x in /, so that, in particular, for every n I

By 127, theorem

/(*)!
8, the series

J? log fi=m + l is

(!+/(*)) The

then absolutely convergent in /.

series obtained

from

it

by

differen-

__

term by term,

tiating

383

Products with variable terms.

!+/(*)'

is

l/n (*)

I

<\

from

that of

as before,

every

for

< 2,

if,

> m

n

y

1 |

+ fn (x) > |

and

\

therefore

so that the uniform convergence of the last series follows '

Z\fn

(x)

|.

Accordingly (by 196)

we put

//a +/(*)) =

n=m + l i.

For since

indeed also uniformly (and absolutely) convergent in J.

*",,

e.

^ m

n

log (1

+/(*))

= log Fw (*).

i-1

Since finally

and the

F (x)

last factor

on the right has been seen to be differentiate

itself is different! able in /.

If,

leads at once to the required result, tioned in the preceding footnote.

further,

F (x)

by the rule of

in

J

9

the last relation

4= 0,

men-

differentiation

Applications. 1.

The

219,

product

Fm (*)- II (l-S)' n=mH X is

(

uniformly convergent in every bounded interval, since, with

fn

(x)

w>0 x

=

>

1 ,

evidently a uniformly convergent series in that interval. The product accordingly defines a function m (x) continuous everywhere, which, in particular, is never is

F

zero in * |

|

<m

-f 1.

This function

is

also differentiate, for

S \fn

=

'

(x)

|

2 |

x

\

S-

1

384 is

Chapter XT. Series of variable terms.

uniformly convergent in every bounded interval.

Hence

for

|

x

\

<m

Fm^(x) _ 1 + f 2*_ *(*) * n JZ+i*-* ,

By 117,

this

however implies

*'<*>-- w ff cot.. "w

G m (#)

where

- G

**

J

J7 _ *-i- ^i.

*v,(*)

'<*>

G TO (*)'

,,-i

denotes the function sin

x

TT

=

1, . . . , ih w, to its limit (obviinterpreting this expression as equal, for x 0, ously existent and -J- 0) as jc tends to these values. (The corresponding convention is made for the middle term in the relation immediately preced ing.) If however two functions (x) and (x) have their logarithmic derivatives equal in an interval,

G

F

two functions never vanish, it follows that they can only constant factor (4= 0). Hence, in x < m -f- 1, in \vhich the

|

sin

where

c

is

last relation

side ->

have,

c,

first

=

x

TT

x

c

To

a suitable constant. by x and let x -> 0.

differ

//

(l

\

<

a

determine

The

hand

left

2

its value, we need only divide the side then -> ?r, while the right hand

because the product is continuous at x 0. Accordingly c for x m 1, but hence, as m was arbitrary, for all xt |

by

\

TT

and we

+

sin

= 7i x

Tx

.

M---1

m

2 and J:, as well as the remarkable product This product, and those discussed below 257, 9, and many other fundamental expansions in products, are due to Eider. 2. For cos IT x we now find, without further calculation,

COS7I* =

The

3.

sin 2 --

7T

x

n

"X

=

sine-product for special values of x leads to important numerical

product expansions.

E. g. for

==

A;

^>

/(2>-i)(2>i " As

g

i

j.

2

|

->

1,

we may

clearly

omit the brackets, and

we

+

accordingly write

ft

77

=

2

'

2

'

4 4 6 1 6-! 8 '

'

'

8

2~~ l-3-3-6-6-7-7 ; 9...

(Wales' Product). Since

it

follows from this that

/2\2

/4\ 2

246 i" 3 '5 78

/

2& 2~v-

2k -

1

rv*~"

Arithmetica infinitorum, Oxford 1656.

V7r

(Cf. pp.

218

9,

footnote

1.)

385

Exercises on Chapter XI.

we

same tune the remarkable asymptotic

obtain at the

2. 4. 6..

.2*

relation

2*

middle coefficient in the binomial expansion of the (2 w) th 2n of all the coefficients of this expansion or for the cothe sum 2

for the ratio of the

power

to

efficient of

xn

in the

expansion of

.

x

yl

The sequence

04.

(v.

128

4)

as 77(1

-h

of functions

cannot be immediately replaced by a product of the form 77(1 for

diverges

J

a; =J=

0-

this

However,

divergence

is

of

-f /*,(#))

such a

kind that

By 1S8,

2 and 42,

3, this

implies that

= tends, as

only

if

x

n *-QO, -\-

0,

a specific

to

2,

1,

.

.

.

.

and

finite

limit,

4"


(*)

0;

the latter, of course,

Accordingly

a definite number for every x 4= 0, 1, 2, .... The function of x so dea tn ma-function (T-junction). It was introduced into analysis by Euler (see above) and, next to the elementary functions, is one of the most important in analysis. Further investigation of its properties lies outside the scope of this book. (Cf., however, pp. 439 440 and p. 630.) is

fined is called the

G

Exercises on Chapter XI. I.

Arbitrary series

154* Let (nx) denote the to x,

or the value 4-77,

if

two consecutive integers. aj's.

The

nx

function represented

difference between

lies

The

~^-

series

by

ff

nx and

the integer nearest

exactly in the middle of the interval between

it,

however,

(p, q integers), while it is continuous for all irrational values of x.

155.

of variable terms.

*

is

for all

s

uniformly convergent for discontinuous for x

converges uniformly for

all x's

/ sin

^~2 q

^

other rational values of x and

a n ->0,

2^

all

n x \*

*(- .IT) Does this remain

true for an

~

1 ?

XL

Exercises on Chapter

336 156. The products

c)

77-l + sin-,

converge uniformly

The

157*

l

//

d)

158.

whose

series

sums have the values

partial

it

it

=

27l -

Draw

every interval?

in

of continuous positive functions certainly converges represents a continuous function F(x). (Cf. p. 344, Rem. 3.)

---

J>]

^=

in

converge uniformly

gr

every interval?

Is the

represents continuous?

a situation of the following kind occurred:

160. In the proof of 111, expression of the form

An

sn (x)

A series 2 fn (x) if

159. Does function

sin

every bounded interval.

in

converges for every x. Is this convergence uniform the curves of approximation. uniformly

+(_!)"

F (n) = considered, in which, as n increases. At the May we infer that

(n)

+ a, (n) +

.

+

for every fixed k

is

same

time, the

lira

F(ri)

fc

(n)

+

.

.

.

+ a fn (n)

the term a^ (n) tcnJs to a limit a^ of terms increases, p n *> QO

t

number

=

2,"

.

fcf

/i=J

n-><x>

provided the series on the right converges? missible if, for every h and every n

Show

that this

is

certainly per-

t

|

ak

(n)

remains \


and

2,"

fc

yk

Formulate the corresponding theorem for infinite products. converges. Exercise 15, where such term-by term passages to the limit were not allowed.

(Cf.

>

161. The two series

x4

x9

<x<

are both convergent for

x6

x9

x>

Q 1

and have the same sum

-

-

log 2 for x -

-f-

1

.

Li

What

is their behaviour when x * vergent for x >! 1 ,

for

0?

Examine

12112

the

two

in

< x <J 1

series,

con-

a;->4-H-0. 162. The

is

1

its

sum?

series

Is its

J?

^

convergence uniform?

-^

converges

What

Kxercises on Chapter XI.

163. Show

that, for

x ->

164. Show

that, for

#->!

a)

2

~

I

0,

a

whose

sums have the values

partial

sn (x)

over an interval with endpoint 0.

not be integrated term by term the curves of approximation.

may

Draw

Fourier scries.

II.

166. May we deduce from a)

*

a:a"*""T'

i

n=i series

2

w *n

n-i 1)

lo

*

*

n ~\ Vf (l-*)'Jt/ (-

165. The

,

rrr^r -" 4~

n=l

M C)

+

1

387

the series

210 a by y

integration term

by term:

^-^~-~

fi=i

'2

_ In

_ _

y

which intervals are these relations valid?

167.

* cos -

What would be

(Cf. 297.)

same way, deduce from 210 c the

In the

(2

relations

n-

the results of further integrations? In which intervals are these

expansions valid?

168. From 209, 210, and the relations in the two preceding exercises, deduce the following further expansions and determine their exact intervals of validity: .

a)

cos*

--

cos 3 x

3 cos 3 x

+ ,

,

-- + ...=

cos 5 x g

,

n

_,

cos 5 x

b) v

C)

.

x n-- 843 +-^5-+ sin

sin

a;

,

,

169. From 215, deduce

...

further

or by differentiating term by term. the new series so obtained?

Is

= nx/n*

x*\

_(___),

etc.

expansions by substituting n the latter operation allowed?

x

for

What

x

are

the

Series ot complex terms.

Chapter XII.

388

ax ? What is 170. What are the sine-series and the cosine-series for e sma; ? Show that the latter is of the form complete Founer expansion of e a 2

H- 6j sin

where a v and 171

x

-

a 1 cos 2 x

6 3 sin 3

x -\- a 4 cos 4 x

-f-

b.

sin 5

X

h 4-

-

b v are positive.

If

a;

and y are positive and

fl

~-^

if * *

sinwscosny

-2-

Determine the values of the integrals

n

If ,r

,

ax

Jsinx (The former

=

1

,

and

f J

sin

a;

,

ax.

I

x

'37498..., the latter

=

1-8519

)

173. For every x and every n, sin 2

smx-i

^

#

f J

r--

sin

a;

T-"-

o

where the bound on the right hand

side cannot be diminished (cf. the preceding

exercise).

(Further

exercises

on special Fourier series will be given

in

the next

chapter.)

Chapter Series of 52. After

XII.

complex terms.

Complex numbers and sequences.

we have

discussed in detail, as in Chapter

I,

the

modes

of

the concepts essential for building up the system of real numbers, no new difficulties are raised by the introduction of further

formation of

all

types of numbers

algebra are

known

Since the (ordinary) complex numbers and their to the reader, we may accordingly be content

with briefly mentioning one or two main points here. 4 that the system of real numbers 1- I* was sho wn

m

is

in-

any further extension, and is, moreover, the only system capable of symbols satisfying the conditions which we laid down for a number system. Yet the system of complex numbers is a system of bymbols to which the name of number system is applied. This apparent contraof

52.

389

Complex numbers and sequences.

removed. For our definition of the number concept sense an arbitrary one, as we emphasized on p. 12, footnote 16: A series of properties which appealed to us essential in the case of rational numbers was raised to the rank of characteristic properties of numbers in general, and the result justified our doing this, in all essenin so far as we were able actually to construct a system which possessed all these properties. tials, a single one, diction

was

is easily in a certain

If

we

desire to attribute to other systems the character of a system we must therefore of necessity diminish the list of char-

of numbers,

The question arises acteristic properties which we set up in 4, 1 4. which of these properties may be dispensed with first of all; i. e. which of them may be missing from a system of symbols without its becoming impossible to legard the latter as a

number system.

4

of a system of symbols, the first with Among which we may dispense, without fear of the system losing the character of a number system entirely, are the laws of order and monotony.

the properties

2

These are based, by 4, 1, on the fact that of two different numbers of the system, the one can always be called less than the other, and the latter greater than the former. If we drop this distinction and in 4 replace both the symbols < and ;> by 4=> ^ appears that the modified conditions

4

of symbols,

the

no other system

are

satisfied

by another more general system

system of ordinary complex numbers, but thai substantially different from the latter can satisfy them

namely

the system of (ordinary) complex numbers is a which, as is known, may be assumed to be of the where and y are real numbers, and i is a symbol whose form x x yi, 9 is for regulated by the single condition t 1, manipulation which the fundamental laws of arithmetic 2 remain valid without ex3.

Accordingly,

system of symbols

+

=

<

>

and are suitably replaced throughout ception, provided the symbols In short: the last-named for restriction, we may work by =4=. Except formally with complex numbers

exactly as with real numbers.

4. In a known manner (cf. p. 8), complex numbers may be brought into (1,1) correspondence with the points of a plane and may thus be represented by these: with the complex number x --J- yi we associate the point (x, y) of an ay-plane. Every calculation may then

be interpreted geometrically. Instead of representing the number x-\-yi by the point (x, y), it is often more convenient to represent it by a directed line (vector) coincident in magnitude and direction with the line

from

(0, 0) to (x, y).

will be denoted in the sequel by a single and unless the contrary is expressly mentioned or follows without ambiguity from the context, such letters will in5.

letter:

Complex numbers

z, f,

a, b,

.

.

.;

variably denote complex numbers.

390

Chapter XII. Series of complex terms. 6.

x+yi,

the absolute value (or modulus) meant the non-negative real value

By is

(am z, z=^tf), we mean the angle sin cp 1

= -py

we may

for

\

9

I/a;

+y

2 '*

complex numbei

by

* ts

which both cos(p

amplitude

=

and

~.

p

calculate with absolute values, the rules 3,

4 hold unchanged, while Since

the

When we

.


of the

z |

5.

loses

all

II,

meaning.

accordingly operate, broadly speaking, in precisely as with real numbers, by far the greater

same ways with complex

part of our previous investigations may be carried out in an entirely analogous manner in the realm of complex numbers, or transferred to the latter, as the case may be. The only considerations which will have to be omitted or suitably modified are those in which the numbers themselves (not merely their absolute values) are connected by the

symbol

<

In

or

>.

order to

avoid

repetitions,

which

this

parallel

course would

to all definitions and otherwise involve, we have prefixed the sign II valid word for word which remain onwards, theorems, from Chapter

when arbitrary

numbers are replaced by complex numbers,

real

We

the whole

of our preceding developments

what modification complex numbers. the

somewhat

required when we

is

A

few words

will

(this

with a few small alterations need only glance rapidly over

validity extending equally to the proofs, which will be explained immediately).

and

transfer

also

indicate at each place them to the realm of

be said on the subject of

different geometrical representation.

Definition 23 remains unaltered A sequence of numbers will now be represented by a sequence of points (each counted once or more than once) in the plane. If it is bounded (24, 1), none of its points with origin at 0. lie outside a ciicle of (suitably chosen) radius

K

Definition

27, and

28

25,

of a null

that

sequence,

and the theorems 26,

relating to such null sequences remain entirely unaltered.

The sequences

with

(zn)

i

-

(_;)n

are examples of null sequences whose terms are not all real. The student should form an exact idea of the position of the corresponding sets of points and prove that the sequences are actually null sequences.

The

powers in the general sense, and based on the laws of order for real numbers. They cannot, therefore, be transferred to the realm of complex numbers in that form (cf. 55 below). The fundamental notions of the convergence and divergence of a sequence of numbers (39 and 40, l) still remain unaltered, definitions in

of logarithms

were

7 of roots, of

essentially

Complex numbers and sequences.

52.

although the representation of zn -> a circle of arbitrary (positive) radius e

391

now becomes is

the following described about the point

l :

If

as

centre, we can always assign a (positive) number n Q such that all terms of the sequence (z n ) with index n n Q lie within the given circle. The remark 39, 6 (1 st half) therefore holds word for word, provided we in-

>

a complex number

terpret the ^-neighbourhood of

as being the circle mentioned

above.

In

setting

up the

definitions

40,

the symbols

2, 3,

<

and

>

essential part; they cannot, therefore, be retained unaltered. although it would not be difficult to transfer their main content

played an

And to

the

in

the

complex realm, we complex realm we

will

shall

drop them call

entirely,

and accordingly

every non-convergent sequence

'

3

divergent

.

Theorems 41,

1 to 12,

and the important group of theorems 43, 3, remain word for word the same,

with the exception of theorem together with all the proofs.

The most important of these theorems were the Cauchy-Toeplitz limit-theorems 43, 4 and 5, and since we have in the meantime gained complete familiarity with infinite series, we shall formulate them once more

in

this

place,

with

the extension indicated in

44,

10,

and

for

complex numbers.

Theorem

1.

The

of the

221.

matrix

20*

(A)

are

coefficients

assumed (a)

the terms in each

n

fixed

to satisfy the

two conditions:

column form

a null sequence, i.e. for every

0, as

1

<x>.

For complex numbers and sequences, we preferably use in the sequel

the letters

We

*,(,,....

+

-> * OO , that (zn ) is definitely say, in the case the limit CO, or tends or diverges (or even converges) to oo. That would be quite a consistent definition, such as is indeed constantly made in the theory of functions. However, it evidently involves a small inconsist2

might

|

|

divergent with

ency relative of numbers (

to the use of the terms in the real domain, that e. g. the sequence n l) n should be called definitely or indefinitely convergent,

according as it is considered in the complex or in the real domain. though, with a little attention, this may not give us any trouble, to avoid the definition here.

And even we prefer

392

Series of complex terms.

Chapter XII.

K

(b) there exists a constant

values of i. e. 9

any number

sum of row remains

the absolute

such that the

of terms in any one

than K,

less

for every fixed k ^> 0, and any n:

+ KlH

Kol Under these numbers

conditions,

*'

when (*,

= a kO *0 + a

a kn\<

\~\

*i>

-

an y nu ^ sequence,

zs

)

K

the

00

kl

Z\

= 2 a kn Z

H

n=o

9 form a null sequence Theorem 2. The coefficients a kn of the matrix (A), besides satisfying the two conditions (a) and (b), are assumed to satisfy the further

also

.

condition

3 or>

27 a kn

(c)

In

this

--=

n-O case, if z n

+,

A k ->

we have

V = **0*0 +

fl

fcl

k ->

as

1

oo.

also

=

*1+'''

iXn*,i -*f

n=o

(For applications of this theorem, see more especially 233, as well as 60, 62 and 63.) Unfortunately, we lose the first of the two main criteria of 9,

which was the more useful of the two. Moreover, the proof of the second main criterion cannot be transferred to the case of complex numbers, as it makes use of theorems of order throughout. In spite of this, we shall at once see that the second main criterion itself remains valid for complex numbers. The proof in all its forms in two different ways: either we reduce the new be conducted may (complex) theorem to the old (real) one, or we construct fresh foundations for the proof of the new theorem, by extending the developments of 10 to complex numbers. Both ways are equally simple

and may be indicated 1.

easily

The reduction accomplished

briefly: of

by

complex sequences splitting

=

to

real

sequences

up the terms into xn -\- iyn and f f

their

is

real

most and

=

imaginary parts. If we write zn -(- irj, we have the following theorem, which completely reduces the question of the convergence or divergence of complex sequences to the corresponding real

problem:

Theorem

322. if,

and only

yn converge 3

if,

to

The sequence

1.

s=

(xn

+ iyn

xn converge

to

)

converges to

and

the

=

-f- i

v\

imaginary parts

rj.

In consequence of

fore, as the

(z n )

the real parts

(b),

A k = Za n kn

is

zn 's are bounded, by 41, Theorem

absolutely convergent.

absolutely convergent and there2,

the series

zn ^ai cn n

=i!sk

1S

a l 80

Complex numbers and sequences.

52.

393

are null #n -*f and yn +rj, (xn f) and (y n 77) of same is the true of sequences. By 26,1, i(yn rj) and, by 28,1,

Proof,

(

(xn

zn

If

b)

-

a) If

xn

**,

-")

~~

e

l-

y}>

n

f

-

(

zn

)

a null sequence; since 4

is

|2OT

and (yn

f)

+ i(y I

are also null sequences, by 26,

rf)

2,

i.

we have

e.

both

The theorem

established.

is

The theorem Theorem conditions

namely,

sufficient, to

assign n

for every

For the convergence of a complex sequence (zw), the second main criterion 47 are again necessary and

2.

the

of

which we are aiming follows immediately:

at

n

> 0,

every choice of e

that, for

we should

be able

so that

>>

n Q and every

n'

>

nQ

.

Proof, a) If (2 n) converges, so do (xn ) and (yw ) by the preceding As these are real sequences, we may apply 47, and, theorem 0, we may choose n l and n 3 so that given e

>

I

xn'

xn

^

yn

I

<

o

f

r

ever y n

>n

n

>w

i

and every

n'

>n

t

,

and I

|

< TT

for every

9

and every

>

n'

Taking n Q greater than n x and n2 , we have accordingly, and every w' > n

n^

for every

n

> nQ

,

The

conditions of our theorem are therefore necessary. b)

conversely,

If,

given e only that n i.

e.

and

n' (by

> 0,

fulfils

n' are both last

>n

since

We

have

in

,

of the

conditions

so that

zn

we have

'

zn

general

and

-

theorem,

\<

e,

also, for the

footnote)

*n'-*< e *

the

|

and our

(z n )

we can determine n

<'

provided

same n

394

Chapter XII. Series of complex terms.

By 47,

and (yj are convergent, so that (zn ) must the preceding theorem; the conditions of our theorem

this implies that (x ] n

also converge,

by

are therefore also sufficient. 2. Direct treatment of complex sequences. In the treatment of real constituted our most frequent resource. intervals nests sequences, of In the complex domain, nests of squares will render us the same services:

223.

Let

Definition. for simplicity be

Q

,

Qlf @3

assumed

,

to the

parallel

and

contained in the preceding

is entirely

we

form a null sequence,

the sides

denote squares, whose sides will coordinate-axes. If each square

...

a nest. For nests of squares,

Theorem.

we have

if

the lengths

I

0>

l

lt

shall say that the squares

...

of

form

the

There exists one and only one point belonging to all the (Principle of the innermost

squares of a given nest of squares. Point.)

hand bottom corner of Qn be denoted by hand A point right upper corner by b n -}-ib*. 5 if to the and , square Qn if, only y belongs

Proof.

+ =x

n z

ta

the

-f- i

in

Now, a;-

Let the

anc*

left

me

consequence of our hypotheses, the

and

axis,

similarly the intervals

form a nest of intervals. There and exactly one point

the #-axis

is

iv\

intervals of the corresponding nest.

= +

intervals

= /n

Jn

= an

.

.

.

bn

exactly one point f on on the y-axis belonging to all the But this means that there is also therefore

all the squares f exactly one point f 117, belonging to Qn are now in a position to transfer definition 52 and theorem

We

to the

224.

on

n*...&n* on the y-axis,

.

54

complex domain:

is said to be a // (z n ) is an arbitrary sequence, accumulation or the point of limiting point of sequence if, given an

Definition.

arbitrary

6

> 0,

the relation

k-l< is

satisfied

one n

225.

>

for

an infinity

of values

of

n

(in particular,

for at least

any given nQ ).

Theorem. Every bounded sequence possesses at least one limiting (Bolzano- Weierstrass Theorem.) Proof. Suppose \z n K and draw the square QQ whose sides & an d *% AH them's on the parallels to the axes through

point.

\

lie

<

5 This statement at the same time expresses, in pure arithmetical language, the relations of magnitude framed in geometrical form in the theorem

and

definition

228.

52.

Complex numbers and sequences.

395

it, i. e. certainly an infinity of z n 's. (> is divided by One at least of the four the cooi dinate axes into four equal squares if there were only a must contain an infinity of zn 's. fcict, (In

are contained in

each, there would also be only a finite number the case) Let Q denote the first quarter' not @ which has this property. This we again proceed to divide into four equal squares, denoting by @3 the first quarter which contains an infinity of finite

in

number

in

which

is

,

1

The sequence Q , Q , Q2 , ... forms a nest of points z n , and so on. lies within the preceding and the lengths of the since each Q n squares, form a

sides

null

innermost point of For if e is given than

nest

this

>

and

m

7 ;

is

denote

f

the

f is a point of accumulation of (z n ). chosen so that the side of Qm is less

the whole of the square

-|-,

Let

namely (2K-^-J.

sequence,

Qm

lies

within the

6-

neighbourhood

an infinite number of points zn also lie in this it, Therefore f is a point of accumulation of (zn ) 9 and the existence of such a point is established. of

,

and,

with

neighbourhood.

The

second main criterion for the complex domain, theorem 222, 2, formulated above may now be established once more, but without any appeal to the "real" theorems, on the same lines as in 47. i.

e.

validity of the

the

of

Proof, a) If zn determine n Q so that

>,

i.e.

-C<

f)

(zn

and

is

a null

b) In fact,

\.

e.

If,

is

m>

nQ and n

Zn every M with "

Taking

K

*-* We

*

to

n

[see

part a) of

accordingly necessary.

conversely, the e- condition

if

>

For these ns and w"s, we therefore also have

the proof of 47].

condition

we can

*'-f<-

provided only that n and n' are simultaneously

The

sequence,

be

n

">

> m,

m

larger

lies

than

in all

is fulfilled, (z n )is

the

the

circle

m

of

certainly

radius

numbers

e

\z^\ 9

bounded.

round z |*3

|,

.

.

WC

6 regard the four quarters as numbered in the order in which the four quadrants of the xy -plane are habitually taken. 7 The process of obtaining this point corresponds exactly to the method of successive bisection so often applied in the real domain.

396

Chapter XII. Series of complex terms!

By our preceding theorem, point

limiting

+ f,

'

follows

it

there

Supposing

.

exists

tas at least one a second limiting poi&J that (zj

/

choose 6 e

_JL|r_ 3 K

t ;

< | l

which is positive. By 224, the definition of limiting point, we can choose n Q as large as we please and yet have an n n for which ' Thus zn n for which zn e and also an ri f above any number w , however large, there exist a pair of indices n and w' for which 8

>

|

<

|

>

>

|

|

<

Iv -*! > This

only a

finite

and outside

number

the

.

have

The

condition of the theorem

|<e

\z n

a series

2 an

sequence

of

As

our theory of

infinite

226.

Theorem. only

if,

2 $ (flj

of their

two series have s

A

the series

= + s'

is ,

there-

and consequently zn

*.

.

complex terms.

sums, the basis for the extension of been provided by the above.

partial

222,

series

2 9t (an

1,

2 an )

we have of

first

the

complex terms

is

convergent

of the real parts of its terms

sums

and

s'

s" respectively,

the

and

sum

if,

and

the series

Further

imaginary parts converge separately. the

we

chosen,

suitably

series has already

to

Corresponding

n

>n

complex terms must obviously be interpreted

of

its

If

n

therefore sufficient also 9

is

Series of

53.

the

circle

of points z n for every

fore

as

Accordingly f must be the unique of radius e round f there is

our hypothesis.

contradicts

limiting point,

>

of

if

these

2 an

is

; 5 ".

2 the second principal criterion (81) for remains unaltered in all its forms, and, at the same time, the theorems 83 deduced from it, on the algebra of convergent series, also retain their full validity. In accordance with

222,

the convergence of infinite series

85

we

also remains unchanged, Since, in the same way, theorem as before, distinguish between absolute and non-absolute con

shall,

vergence of series of complex terms (Def. 86).

hence

9 Hence we may also say: (zn ) converges if, and only and possesses only one point of accumulation. This is then

the limit of the sequence.

if,

at

it

the

is

bounded

same time

Here again we have Theorem. The vergent if, and only

the

series if,

397

Series of complex terms.

53.

2 an

both

of

complex terms

the series

2^i(an )

is

and

absolutely

2%(a n )

con-

are ab-

solutely convergent.

The proof

z

= x-\-iy

results

simply from the fact that every complex number

satisfies the inequalities (cf. p. 393, footnote 4)

In consequence of this simple theorem, it is at once clear that, with series of complex terms as with real series, the order of the terms is immaterial if the series converges absolutely (Theorem 88,1).

however, 2an is not absolutely convergent, either 2$l(a n ) or must be conditionally convergent. By a suitable rearrangement of the terms, the convergence of the series 2a n may therefore be desIf,

^3(0

troyed in any case, as in the proof of theorem 89, 2, that is: In the of series of complex terms also, the convergence, when it is not

case

depends essentially on the order of succession of the terms. (Regarding the extension to series of complex terms of Riemanns absolute,

rearrangement theorem

The

44,

remarks on the following page.) 4, as also the main rearrangement absolutely convergent series, still remain cf.

the

next theorems, 89, 3 and

theorem 90, which

relate to

valid, without modification or addition, for series of complex terms. Since the determination of the absolute convergence of a series

a question relating to series of positive terms, the whole theory of is again enlisted for the study of series of terms: that was Everything proved for absolutely convergent complex is

series of positive terms

of real terms

may be utilized for absolutely convergent series terms complex If we omit power series from consideration for the present, we 18 observe, on looking over the later sections of Part II ( 27), that series

of

the

developments of Chapter

X

are the

first

for

which there

is

any

question of transference to series of complex terms. Abel's partial summation 182, being of a purely formal nature,

and

its corollary 183, of course hold also for complex numbers, and so does the convergence- test 184 which was based directly on them.

The

may also all be retained, provided we on in 220, 5, in accordance with which all sequences assumed to be monotone are real. In the case of du BoisReymond's and Dedekind's tests, even this precaution becomes unnecessary: they hold word for word and without any restriction for arbitrary series of the form 2 a n b n with complex a n and b n Riemanris rearrangement theorem ( 44) is, on the contrary, essen-

keep

special forms of this test to the convention agreed

,

.

227,

Chapter XII. Series of complex terms.

398

a "real" theorem.

tially

In fact,

if

a series

2an

of complex terms

is

not absolutely convergent, so is one at least of the two series JJjR^iJ and 2%(a n), by 227. By a suitable rearrangement, we can therefore, in

accordance with Riemanns theorem, produce in one of these two

series a prescribed type of convergence or divergence. But the other one of the two series will be rearranged in precisely the same manner, and there is no immediate means of foreseeing what the effect of the It has recently rearrangement on this series or on 2an itself will be. been shown, however, that if 2a n is not absolutely convergent, it may be transformed by a suitable rearrangement into a series, again convergent, whose sum may be prescribed to have either any value in the whole complex plane or any value on a particular straight line in

this plane,

according to the circumstances of the case

The theorems 188 and 189

of

10 .

Mertens and Abel on

plication of series ( 45) again remain valid word for word, with the proofs. For the second of these theorems we must,

multi-

together it

is true,

rely on the second proof (Cesaro's) alone, as we have provisionally skipped the consideration of power series (cf. later 232). At this point we are in possession of the whole machinery required for the mastery of series of complex terms and we can at once proceed to the most important of its applications. Before doing so, however, we shall first deduce the following

extremely far-reaching

criterion.

Weierstrass* criterion u

228.

A n bounded,

with

where

00

.

<x

2a

A

series

is

12 complex and arbitrary, and

n of

complex terms, for which

A>1,

We thus have the following very elegant theorem, which in a certain sense completes the solution of the rearrangement problem: The "range of summation" i. e. the set of values which may be obtained of a series Z a n of complex terms is either a definite point, or a as sums of convergent rearrangements of Ea n definite straight line, or the entire plane. Other cases cannot occur. A proof is given by P. L&vy (Nouv. Annales (4), Vol. 5, p. 506, 1905), but an unexceptionable statement of the proof is not found earlier than in E. Steinits (Bedmgt kon10

vergente Reihen und konvexe Systeme, J. f. d. reine u. angew. Math., Vol. 143, 1913; Vol. 144, 1914; Vol. 146, 1915). For the (more restricted) result that every conditionally convergent series Sa n ** s can be rearranged to give another convergent series Sa n f =* s' with s' =t= s 9 W. Threlfall has given a fairly short proof (Bedingt konvergente Reihen, Math. Zschr., Vol. 24, p. 212, 1926). 11 J. f. d. reine u. angew. Math., Vol. 51, p. 29, 1866; Werke I, p. 185. 12 An equality of this kind may of course always be assumed ; we need only

An

=

"

as a definition. What is essential in the condition a n /) footnote to 166), that when a and A are suitably chosen as is here, previously (cf. It is substantially the same thing to assume that the An* should be bounded. + B n /n* wjth A > 1 and Bn bounded. ! + //!

write

H*

(

\

1

n

'

Series of complex terms.

53.

is

and only if, SR (a) > 1 If 0<8fl(a)<^l, invariably divergent.

absolutely convergent is

series

if,

399 .

For

JR (a)

<

the

both the series

n=o are convergent.

Proof.

1.

In that case,

and

it

if

Let |

An

cc

\

= (t-\-iy < K,

and

we

say,

follows at once that,

if

is

/?'

Now

suppose SH()

= /?^1-

for sufficiently large values of n, is

2\a n

\

3

a.

JL

divergent. If, on the other hand,

9ft

it

(a)

first

assume /?==

1

<

test,

the series -^|an

is |

In that case, since

follows from Gauss's test

=

> 1.

$

n

\

By Raabes

for every sufficiendy large n. therefore convergent. 2.

us

any number such that

^^.

an

let

write, as is permissible,

ft

172

that

< 0, our last inequality shows that

then

2

a n must Therefore 3b. If $K(a)

now

= = 0,

diverge. i. e .

>

f

it

is

we

easy to verify that

where

H>

1

and

is

the

^'s are again bounded.

then have

smaller

of

the

Accordingly,

if

two numbers 2 and c

Jl,

and

denotes a suitable constant,

2

13 As regards the series an itself, it was shown by Weierstrass, I.e., that this is The proof is somewhat troublesome. divergent whenever Ot (a) fS 1. 5^ 0? (a) fg 1 further more exact investigation of the series 27 a n itself in the case is given by A. Pringsheim (Archiv d. Math, und Phys. (3), Vol. 4, pp. 1 19, in 17. particular pp. 13 1902), J. A. Gmeiner, Monatshefte f. Math. u. Phys., Vol.

A

also

19, pp.

149103.

1908.

400

Chapter XII. Series of complex terms.

n

for every

^>

w,

It

say.

follows by multiplication that

n-1

>n

"n

Hence

an

|

so that 4.

>

\

2a n

Cm

am

-\

n>m,

for every

,

\

i---

again diverges

(cf.

17O,

finally,

If,

we

,

and

w

cannot tend

to 0,

1).

have to show that both

the

series

are convergent. I

Now

as in

a* + 1,

<1

.

an

|

so that |

an

1.

we

have, for every sufficiently large n,

8'

n

diminishes monotonely

|

fore tends to a definite limit ^> 0. a)

the series J"(|an all

moreover,

its


from some stage on, and there Accordingly,

|# n + i|)

|

f

with

,

is

convergent, by 131, and has,

terms positive for sufficiently large

n's.

Now

1-

= since the fraction

on the

when n

that

*-f-c

right

on the

than a suitable constant A.

converges with2(|

n

hand side tends

left is,

By 70,

~~

to the positive limit

for every sufficiently large 2, this means that 2\a n

We can

|0 w +i|)-

|

V

show more

n, less w hl .

precisely,

|

how-

ever, that

b)

an

+ 0.

For

again follows, by multiplication, from

it

(n

^

that

The (cf.

hand

right

17O,

1)

side

(by

we must have

126, 2) tends fl >0. Now n

to

as

n

hence

the series

*=o

n+1 ) and therefore converges absolutely, since a *0 with a n we may omit the also, by a); n +1 n This proves the conbrackets, by 83, supplement to theorem 2. n of a vergence ( n l) This theorem enables us to deduce easily the following further theorem, which will be of use to us shortly: is

a sub series of

2(an

\

|

2

.

+

|

,

1

Power

54.

Theorem.

i

_

|

|

>1

2a

*3i

b) converge conditionally, 1 single point z

^

diverge, if 9R (a)

arbitrarv > ^

I

n*>

I

(4) bounded,

< 1,

>1 0< 3t(a)<^l,

()

if

=+

divergent for every

=1

z

,

the series will

\

\

,

for the

except possibly

.

Since

Proof.

statements

the

a

*.

for the points of the circumference

a) converge absolutely, if

c)

_

n n z is absolutely convergent for \z\

and

,

_!i

~n

~~a"7

z

229.

as in the preceding theorem,

//,

_?i. the series

401

Analytic functions.

series.

relative

to

are

\z\^\

=1

verified.

immediately

For

the statement a) is an immediate consequence of the conz , of vergence -2|0 n ensured by the preceding theorem. Similarly c) is an immediate consequence ,of the fact established above, that in this |

|

|

case |

an

remains greater than a certain positive number for

\

sufficiently large n. if

Finally,

< 5R(a) ^ 1

follows from Dedekind's test

theorem

sums

that n

2z

of

ference

2\a n

=

z |

|

a n ^. 1

\

and

z 4*

-f-

1, the

convergence of

3. For we proved converges and a n >0;

184,

in

every

2a n z n

the preceding the partial

that

are bounded, for every (fixed) 24>-|-l on the circum1 , follows simply from the fact that for every n

II-*!

54.

Power

The term "power of

form

the

2a n zn

,

where now both the be complex.

series.

Analytic functions.

series" is again

used here

to

denote

2a

more

generally, of the form coefficients a n and the quantities z

or,

a

n (z

series n

z^

9

and ZQ may

The theory of these series developed in 18 to 21 remains vab'd without any essential modification. In transferring the considerations of those sections, we may therefore be quite brief. Since the theorems 98, 1 and 2 remain entirely unaltered in the

new domain,

the

on the behaviour

same of

metrical interpretation 14

true of the

fundamental theorem 93 itself, domain. Only the geo-

series in the real

power is somewhat

different:

The power

scries

we take into account Pnngsheim's result mentioned in we may state here, more definitely except for * = -fl.

If

footnote,

is

2a n z*

the preceding*

Chapter XII. Series of complex terms.

40 2

for every z interior to the circle of

indeed absolutely

converges

radius r round

the origin 0, while it diverges for all points outside that circle. This circle is called the circle of convergence of the power

and the name radius applied

series

for the

first

number

to the Its

time, completely intelligible.

magnitude

r thus is

becomes,

given as before

by the Cauchy-Hadamard theorem 94. Regarding convergence on the circumference of the circle of convergence, we can no more give a general verdict than we could regarding the behaviour in the case of real

show

tely will

at the

power

endpoints of the interval of convergence (The examples which follow immedia-

series.

may be

behaviour

that this

The remaining theorems

230.

of the

most diverse

nature.)

18 also retain their validity unaltered.

of

Examples. 1.

2zn

r=l.

]

sum

with the

zn

vergent, as

does not -*

5-

f

;

=

the boundary points zn 8.

5]

e.

=

z

for

the series 1

\

|

,

it

is

is

convergent,

everywhere di-

1

series l5

remains (absolutely) convergent at

all

.

\

r=l.

;

=

z |

i.

circle,

there.

This

1.

The

series

is

not

certainly

convergent for

all

the

is

also

ft

= l gives

points, for*

boundary

the boundary,

Z

zn Jf?

On

.

L

2.

In the interior of the unit

the divergent series

.

However,

it

1 gives a convergent series. In all these points, since z = theorem 229 of the preceding section shows, more precisely, that the series must converge conditionally at all points of the circumference |jr| = l for we have here different from + 1

not divergent for

fact,

;

result may also be deduced directly from Dinchlefs test 184, 2, since has bounded partial sums for z =f= -f 1 and s = 1 (cf. the last formula of

The same

Z zn

|

the preceding section)

and

n

tends monotonely

|

to 0.

the convergence can, however, only be conditional 4.

and

5?

t,

-.

4n

;

r

=

1

.

2an zn

zn

16 .

This series diverges at the four boundary points

and converges conditionally

16 If

As

at

every other point of the boundary.

most of the subsequent examples) the real power series 2an x n 16 These facts regarding convergence may also be deduced from 185, 5, by splitting up the series into its real and imaginary parts. Conversely, however, the above mode of reasoning provides a new proof of the convergence of these two real series.

this

power

has real

coefficients (as in

series of course has the

same radius as

.

Power

54.

zn

For

5.

nowhere but

at

The

6.

r

,

series.

= -f-OO.

403

Analytic functions.

For 2'n!* n ,

thus this series converges

r=0;

z=0.

series

J

(-!)-.

and

^(_l)*-^__

are everywhere

convergent.

A

7.

power

series of the general

2an (z

form

z ) n converges absolutely and diverges outside

at all interior points of the circle of radius r round zot n this circle, where r denotes the radius of nz .

2a

more

Before proceeding to examine the properties of power series in detail, we may insert one or two remarks on

Functions of a complex variable. to

If

domain 17

we

every point z within a circle $ (or more generally, a a value w is made to correspond in any particular manner, )

say that a junction

w

= f(z)

of the

complex variable z

is

given in

The correspondence may be brought about

this circle (or domain).

in

a great number of ways (cf. the corresponding remark on the concept of a real function, 19, Def. l) in all that follows, however, the functional value will almost always be capable of expression by an explicit formula in terms of z, or else will be the sum of a convergent series ;

whose terms are for

shortly;

the

Numerous examples

explicitly given.

moment we may

each point z within the

which

at

power

series represents the

The concepts

sum

will

think of the value w, circle

occur very

for instance,

convergence of a given

of

of the series at that point.

of the limit, the continuity,

and the

differentiability of

a

function are those which chiefly interest us in this connection, and their definitions, in substance, follow precisely the same lines as in the real

domain 1.

:

Definition of limit.

If the function

every z in a neighbourhood of the fixed point

_

iim f(z]

=

w=f(z) ,

we

is

defined

18

for

say that

co

or

17

sequel,

by a

A

we

finite

strict

shall

f(z)-+a>

for

*-*,

of the word "domain" is not needed here. In the always be concerned with the interior of plane areas bounded

definition

number

of straight lines or arcs of circles, in particular with circles

and half-planes 18 f(z) need not be defined at the point satisfy the condition

of course be assumed

0< |*

|


The d

but only for all z's which above definition must then

itself,

of the

231.

Chapter XII. Series of complex terms.

404 if,

given an arbitrary e

>

we can

,

assign d

d

>

(e)

so that

\f(z)-a>\<e

<

for every 2 satisfying the condition 19

to exactly the same thing whose terms lie in the to ,

coincide with to

verge

\

< 6;

which comes

or

converging

and do not

wn =

corresponding functional values

the

,

z |

for every sequence (zn ) given neighbourhood of if

f(zn ) con-

co.

we

consider the values of f (z) , not at all the points of a neighbut only at those which lie, for instance, on a parti, cular arc of a curve ending at , or in an angle with its vertex at , or, more generally, which belong to a set of points M, for which If

bourhood of

=

we say that limf(z) co or f(z)*-co a point of accumulation, in that set M, if the as z+> along that arc, or within that angle, or

is

above conditions are

come

M which

at least for all points z of the set

Definition of continuity.

2.

in

fulfilled,

into consideration in the process.

a neighbourhood of

at the point

,

and

If

at

the function

we

itself,

w

= f(z)

say that f(z)

is

is

defined

continuous

if

lim f(z) exists

and

equal to the value of the function at

is

i. e. if , f(z) */"() when z is restricted to an define the continuity of f(z) at arc of a curve containing the point , or an angle with its vertex at , or any other set of points that contains and of which is a limiting

We may also

M

point; 3.

the definitions are obvious from 1.

Definition of differentiability.

fined in a

entiate

neighbourhood

at

,

if

of

and

at

If

the function

itself,

f(z)

is

w

= f(z)

said to

be

is

de-

differ-

the limit

lim '

exists in

accordance with

1.

Its

value

is

called the differential coeffi-

and is denoted by /"(). (Here again the cient of f(z) at variation of z may be subjected to restrictions.)

We

must be content with these few

definitions

mode

concerning

of

the

general functions of a complex variable. The study of these functions in detail constitutes the object of the so-called theory of functions, one of the most extensive domains of modern mathematics, into which we 30 of course cannot enter further in this place 19

Same

80

A

.

proof as in the real domain. rapid view of the most important fundamental facts of the theory of functions may be obtained from two short tracts by the author Funktionen:

Power

54.

The above

series.

405

Analytic functions.

explanations are abundantly sufficient to enable us

to

most important of the developments of 20 and 21 to power series with complex terms. In fact, those developments remain valid without exception for our present case, if we suitably change the words "interval of convergence' to "circle of convergence" throughout Theorem 5 (99) is the only one to which we can form no analogue, since the concept of integral has not been introduced for functions of a complex argument. All this is so simple that the reader will have no trouble, on looking through these two sections again, to interpret them as if they had been transfer the

intended from the first to relate to power series with complex terms. At the most, a few remarks may be necessary in connection with Abel's limit theorem 100 and theorem 107 on the reversion of

a power

y

+ As

In the case of the latter, the convergence of the series 1 ---^ hence of the series an( > H y -f- b^ y -\---- which satis-

series. 2

y'

,

theorem, were only proved for real values of y. however, as we have thereby proved that this power

fied the conditions of the

This

is

clearly sufficient,

a positive radius of convergence, which is all that is required. regards Abel's limit theorem, we may even corresponding

series has

As

degree of freedom of the variable point z prove more this reason we will go into the matter once more: n a n z to be a given power series, not everywhere convergent, but with a positive radius of convergence. We first observe to the greater

than before, and for Let us suppose

2

exactly as before, we may ducing any substantial restriction that,

assume

On

this

the

radius

=1

=

z of convergence, 1, we assume that at least one which the series continues to converge. Here again |

\

+

1.

In fact,

"n*0*

2a n

the series

'

z

n

if

z

4

s

+

exists

point z

we may assume we need only put

at

that Z Q is the special point

without intro

circumference of the circle

1>

=*,!>

also has the radius 1

and converges

at the point -j- 1.

proof on^mally given, where everything may now be interpreted as "complex", then establishes the n Theorem. // the power series 2' a n z has the radius 1 and remains

The

convergent at the point we also have

if

z approaches 21

the

-f-

point

1 of the unit circle,

+

1

along

the

and

positive

if

real

2 an = s

axis

t

from

then

the

0.

origin

th Grundlagen der allgemeinen Theorie, 4 ed., Leipzig 1930; II. th und der ed., Leipzig Teil, Anwendungen allgemeinen Theone, 4 Weiterfiihrung 1931 (Sammlung Goschen, Nos. 668 and 703). 21 We are therefore dealing with a limit of the kind mentioned above in

theorie,

231,

I.

Teil,

1.

14

(051)

406

Chapter XII. Series of complex terms.

We

233.

can now

easily

prove more than

Extension of AbeVs theorem.

this:

With the conditions of the preceding

theorem, the relation

remains true

by

mode

if the

the condition

+1

is restricted only approach of z to remain within the unit circle and in the angle between two arbi-

of

z should

that

trary (fixed) rays which penetrate into the interior of the

unit circle

+

point

from

starting

,

1

the

(see Fig. 10).

The proof

will

be con-

ducted quite independently of previous considerations, so that

we

thus

shall

a third

obtain

proof of Abel's theorem.

Let Z Q ,

any

sequence

limit

-\-

Fig. 10.

portion

We

have

show

to

k

of

the

of

be

.

points

the

in

1

,

of

described unit

circle

that

ftoif,

as

we

before,

2an z

write

n

= f(z).

choose for a ftn

and apply the theorem

to the

sn

= "o +

- **)<* =

i

(b)

and

sum

of (c)

that the

of the & th

fulfilled.

it

with

its

=z

follows immediately that

]

n=0

This proves the statement, provided

(a)

is

now A k

satisfy

clearly fulfilled,

=

the

conditions

as * fc

1,

(a),

and the

CO

^z =

1, so that (c) is k n=o such that requires the existence of a constant is

(l

z k]

K

Finally (b)

for all points z

of

row

It

chosen numbers a kn

Now

221.

sums

!->

H s.

partial

(

tends to s as k increases.

we can show

theorem

Toeplitz

sequence of

which, by hypothesis, converges to

also

In

the value

k

vertex at

1 in the angle (or

+1).

It

any sector-shaped portion only remains, therefore, to establish

Power

54.

This reduces

the existence of such a constant.

=l

the following statement: If z

< Q
and

only on

and Q O



,

407

Analytic functions.

series.

+ sn a constant A = A Q (cos


*

i

Fig. 10) to proving

(v. 9?) ,

(<^

w#A |

^


|

) exists,

^


<^

depending

such that

,

^^

A

for every z of the type described. In the proof of this statement, it is sufficient to assume QQ COS an d in that case we may at once o In fact, the is a constant of the desired kind. show that cos
=

A

=

statement then runs:

- yi - 2 Q cos + ea

1

cos



or 2 Q cos

<

for

cos
Q
left

tainly suffices to

+

9?

2

cos


and \
show

By

9?

+

2 Q* cos

replacing

latter is


by

99

,


and

increased; therefore

2 it

by cer-

that

q cos

9

^

q cos


+ ^

2

9

,

This extension of Abel's theorem to "comwhich is obviously true. of modes or plex approach" "approach within an angle" is due to

-

O. Stolz 22 This completes the extension to the case of complex numbers of all the theorems of 20 and 21 with the single exception of the theorem on intenot which we have defined in the present connection. In particular, gration, .

thereby established that a power series in the interior of its circle of convergence defines a function of a complex variable, which is continuous it is

and

the latter "term by term" and as often as we please and domain, accordingly possesses the two properties which

different iable

in that

above all others are required, in the case of a function, for all purposes of practical application. For this reason, and on account of their great in further developments of the theory, a special name has importance been reserved for functions representable in the neighbourhood of a point 28 In recent years the Zeitschrift f. Math. u. Phys., Vol. 20, p. 369, 1875. question of the converse of Abel's theorem has been the object of numerous investii. e. the question, under what (minimum of) assumptions relating to gations, the coefficients a n the existence of the limit of J (z) as z > 1 (within the angle) an An exhaustive survey of the present state of research entails the convergence of in this respect is given in papers by G. Hardy and J. E. Ltttlewood, Abel's theorem and its converse, Proc. Lond. Math. Soc. (2), I. Vol. 18, pp. 205 235, 1920; II. Vol. 22, pp. 254269, 1923; III. Vol. 26, pp. 219 23G, 1926. Cf. also theorems ,

.

H

.

278 and 287.

Chapter XII. Series of complex terms.

408

zQ) n They are said to be analytic or regular z by a power series E a n (z at ZQ By 99, such a function is then analytic at every other interior point .

.

of the circle of convergence; it is therefore said simply to be analytic or 23 In particular, a series everywhere convergent reregular in this circle .

which

presents a function regular in the whole plane,

therefore shortly

is

called an integral function.

which we have proved about functions expressed about analytic functions. Only the two foltheorems by power of are which special importance in the sequel, need be expressly lowing, formulated again. All the theorems series are

234.

1-

If two functions are analytic in one and the same

21) their

(by

For the

and

their difference,

sum,

quotient the corresponding statement

the function in the denominator

105, 4) only

if

of the

and provided,

circle,

circle ,

is

is primarily true (by not zero at the centre

necessary, that this circle

if

then so are

their product.

is

replaced by a

smaller one.

If two functions, analytic in one and the same circle, coincide in a neighbourhood, however small, of its centre (or indeed at all points of a set having this centre as point of accumulation), the two functions are completely 2.

theorem for power

identical in the circle (Identity

series 97).

Besides stating these two theorems, which are new only in form, we shall prove the following important theorem, which gives us some information on the connection between the moduli of the coefficients of

a power series and the modulus of the function

it

represents

:

00

Theorem.

235.

= Z an (z

If f(z)

=

zQ) n

o

\^\^

< < r and M ~ M (Q) if Z = the circumference z Q

\

Proof 24 for

We

.

which however

G

= 0,

(P

P

a number which

is

ZQ

\

f(z)

\

\

<

for

3= 1

then

r,

1, 2,

.

.

.),

never exceeds along

Q.

consider the function

*(*) 28

M

z \

(Cauchy's inequality.) choose a complex number 77, of modulus

\

first

1 -rf

converges for

any integral

=

(*-

25

exponent q

^

0.

=

1,

Now we

k

*o)

A

function is accordingly said to be "analytic" or "regular" in a circle ,ft can be represented by a power series which converges in this circle. 24 The following very elegant proof is due to Weierstrass (Werke II, p. 224) and dates as far back as 1841. Cauchy (Me"moire lithogr., Turin 1831) proved the formula indirectly by means of his expression for / (z) in the form of an integral. that f(z) never exceeds on z z The existence of a constant 2 is practically

when

it

M

M

|

2

an

\

|

\

n

clearly has this property. This also such that a n Q n M. But the above theorem states that every never exceeds has the property that a n Q n is always 5^ M.

obvious, of course, since

\

Q

\

^

\

|

=

|

25

if*

Such numbers

cos (q a

TT)

+

i

17

TT)

;

this is

M

|

\

\

of course exist, for

sin (q a

Mis obviously that / (z)

never

1

if if

cos (a

t\

a

is

chosen

TT)

+

i

sin (a

irrational.

TT),

then

Power

54.

409

Analytic functions.

series.

^

for a specific integral value of the exponent k constant coefficient a. If we denote by gQ , g l9

function for z

this

= Z + QQ

v

v

,

rj

= 0,

1

,

2, fc

.

.

.

and an

g

>2

,

...

the

we have

,

arbitrary

values of for

n

^1

kn

1

*i

hence I

The

expression on the right hand side contains only constants, besides it therefore follows that the arithmetic mean

the denominator n;

~

\-gn-l

as

n

increases.

In the case k

0,

we

should be concerned with the

identically constant function g(z) s= a, for

which

since the ratio is equal to a for every n, in this case. more general function

If

we

consider

the rather

^^^

^)-t? + where metic

I

and

m

are

fixed

integers

and now form the

^> 0,

arith-

mean -----hgn-l

=

g (z (where, as before, gv by the two cases just treated. for every z of the

certain constant

-fIf,

v

Q

rj

),

further,

circumference

z |

K, we have gp-f

ffi

= 0, it is

ZQ

\

1,

.

.

known

= Q,

is

+ b , this clearly that the function g(z)>

.),

never greater than a

also

+ " + gn-l W

v

^ n A" ~~

^

7J

and therefore also

With these preliminary remarks, the proof of the theorem is now As 2j\ a n \Q* con quite simple: Let p be a specific integer ^0. we can determine so that e > 0, verges, given q p

>

Chapter XII. Series of complex terms.

410

A

we

fortiori,

then have for

values of z such that

all

z

ZQ

|

=Q

\

,

B

l< + nq!(*-*o) I

l

and

same

therefore, for the

values of z 9

n=0 if

M has

ference

the

ZQ

The The

|

=Q

Accordingly, on the circum-

in the text.

meaning given

Z |

,

modulus signs is of the kind just considered. there obtained now becomes

function between the inequality

b \

|

^K

,

I

and, as e

was

arbitrary

and

**p

> 0,

K^tf p

*

===

1

we

I

I

have, in

fact,

footnote to 41,

(cf.

l)

<

q. e. d.

The elementary analytic functions.

55.

I.

1.

The

++

1

1

l-z

I-ZQ -(Z-ZO

this

1

)

:

=

is

-

11 1~

S

1

power

/

series

..xi.

<

i. e. for z z z 1 converges for every z than -f- 1; in other words, the circle of convergence of the circle with centre ZQ passing through the point +1. [

the series is

expressible as a

I~

series

nearer to z

The

w

rational function

for every centre ZQ

and

Rational functions.

-

function

is

1

With reference

to

|

1

\

thus analytic at every point different from this

example,

we may

+1.

draw

attention to the of fundamental importance in the theory n whose circle of convergence is the

following phenomenon, which becomes of functions: If the geometric series 2z

briefly

,

unit circle, is expanded by Taylor's theorem about a new centre z within the unit circle, we could assert with certainty, by that theorem, that the new series converges at least in the circle of centre zl which touches the unit circle on now see that the circle of convergence of the new series may the inside.

We

very possibly extend beyond the boundary of the old. This will always, be the case, in fact, when zt is not real and positive. If zt is real and negative, the new circle will indeed include the old one entirely. (Cf. footnote to 99, p 176.")

55.

The elementary analytic

functions.

I.

Kational functions.

411

Since a rational integral function

2.

<*o

may be regarded

+a z+a

as

i

*

z*-\-----1" am z m

a power series, convergent everywhere, such

Hence

functions are analytic in the whole plane.

the rational functions

of general type

are analytic at all points of the plane at which the denominator is i. e. not 0, everywhere, with the exception of a finite number of Their expansion in power series at a point z , at which the points.

4s 0> s obtained as follows: If z is replaced by in the numerator and denominator of such a function, both zo *o) * ), the function takes these being then rearranged in powers of (z denominator

+

the

is

*

(z

form

We

'

where, on account ot our assumption, & 4. 0. may now carry out the division in accordance with 105, 4 and expand the quotient n in the required power series 26 of the form Scn (s #o) *

II.

The

is

The exponential

function.

series

a power series converging everywhere, and therefore defines a func-

tion regular in the whole plane, i. e. an integral function. point z of the complex plane there corresponds a definite

To

every

number w,

sum

of the above series. This function, which for real values of z has the value e z as defined in 33, may be used to define powers of the base e (and then

the

further those of 80

An

any positive base) for

all

complex exponents:

method consists in first splitting up the function into Leaving out of account any part which represents a rational integral function, we are then concerned with the sum of a finite number of fractions of the form alternative

1

partial fractions.

A

A

i

1

\tf

each of which we may, by 1, expand separately in a power series of the form This method enables us to see, moreover, that 2c n (g z )*, provided z 4= a. the radius of the resulting* expansion will be equal to the distance of z from the nearest point at which the denominator of the given function vanishes.

Chapter XII. Series

412

236.

For

Definition. attributed

the

to

all real or

power

e* is

complex terms.

ol

complex exponents,

the

meaning

defined,

be

to

without ambiguity, by

the

relation

And

p is any positive number, p without ambiguity, by the formula

z

if

shall denote the value determined,

where log/> is the (real) natural logarithm of p as defined 21 in 36. z (For a non-positive base b, the power b can no longer be uniquely defined; cf., however, 244.) As there was no meaning attached per se to the idea of powers with complex exponents, we may interpret ihom in any manner we please. Reasons of suitability and convenience can alone determine the choice That the definition just given is a th )rof a particular interpretation. from formula 91, example 3 (leaving suitable results one, oughly out of account the obvious requirement that the new definition must coincide with the old one for real values of the exponent 28); this formula was proved by means of a multiplication of series, the validity of which

holds equally for real and complex variables and the formula must accordingly also hold for any complex exponent; it is

237.

ei e z whence

*

= e i+*

also

This important fundamental law for the algebra of powers therefore certainly remains true. At the same time it provides us with the key to the further study of the function e z

238.

1.

Calculation of

= cos y 27 It

definition

may be lt

xk

is

-f- i

noted

ez

sin

how

For

.

y

real y's,

we have

.

far

removed

the product of k factors

all

l value belongs e. g. to 2 the definition. determined above by quely

no knowing" what 28

.

this definition is

equal to x". ;

from the elementary

At

yet this value

is

first sight,

in

there

any case

is

uni-

there can exist no other function than the function a2 just regular in the neighbourhood of the origin and coincides on

By 234, 2,

defined which the real axis z

is

=x

with

the function e x defined

may indeed say that every necessarily be unsuitable,

definition

of e

z

by 33. For this reason we differing from the above would

The elementary analytic

55.

Hence

functions.

follows that, for z

it

e* = e* + iv

-==

By means of this lormula complex z's.

~x+

ex

20

i

e iv

The exponential

11.

function.

413

y>

e

r

(cos

the value of e

j/

z

may

easily

be determined

for all

This formula enables us, besides, to obtain

complete manner an idea

points of the complex note the following facts.

at the various

We

values}.

We

2.

have \e z

= **<*> =

plane

(in short, of

2

\

s

y

|

x

iy

-

\

\

assumes stock of

e

In fact

e*.

= (cosy -f isiny Vcos y -j-sin = e x e = e because e x > and hence e = Similarly, = y, am = 3 z

z

its

\

\e**\

|

a convenient and

in

which the function

of the values

\

,

\

= 1,

the second factor

1.

ez

also from the formula 3. e z

238,

For

we

if

just

2kni,

has the periods e*

1

(z)

used. that

= e *+**\ = e

increase z by 2

71 i

its

is z

for

to say, 2 *w

*-

all

(k

<,

values of z,

^0,

integral).

imaginary part y increases by 2ji, and by 1. and 24, 2, this leaves Every value which e z is able

real part remains unaltered, the value of the function unchanged. \\

hile its

assume accordingly occurs in the n < 3 (z) y
to

=

strip

by a strip

Every such parallel translation. called a period-strip; Pig. 11

is

represents the first- named of these strips. 4. e z

has no other period,

O

in-

between two deed, more precisely: and numbers z special z^ we have if

the relation Fig. 11.

this necessarily implies

For we

first

= then = e x + iv = ^(cos y

infer that e z*~~ z *

ez ae

that

Euler: Intr. in Analysin 14*

1,

inf.

Vol.

T,

we -f-

note that

isiny)

if

= 1,

138. 1748.

(G51)

Chapter XII. Series ot complex terms.

414

we must by

have

2.

cos y i.

e.

cos y

hence y

5.

= 2kn

=

1

=w

= R^ (cos ^ +

e zi

By

3.,

the

*

sin

=w = 6 \wRi e i'^ = R^

t

,

(

# >

with

&J

Now

k

number

0, the

t

as

cos

numbers

= 0,

1,

2,...)

equation, and by 4. no other solutions be chosen, in one and only one way, always

same

are also solutions of the exist.

has one and only

^=^0,

(ft

can

also have

owc0 awd only once in the period

4=

for given lt

3 certainly a solution of e

is

,

w

e* assumes every value

w^

we

sin

-f- i

Thus, as asserted,

.

z strip; or: the equation e one solution in that strip.

If

= 0. Further, y= 1 sin y = 0,

hence x

*=!,

may

so that

<

n 6.

The value

is

3 (^

-f 2 k

n i}

<^

never assumed by e z \ e z.e- z

+ n, for,

q. e. d.

by 237,

= \,

so that e z can never be 0. 7.

The

derivative (e z )' of e z

is

entiating term-by-term the power 8.

From 238,

we

1,

also

The

III.

e z y as follows at

again

once by

differ-

z series that defines e .

deduce the special values

functions cos z and sin z.

In the case of the trigonometrical functions, we can again use the

239*

expansions in power series convergent everywhere to define the functions for complex values of the variable.

Definition. 1 ""

The sum of z2 z* 2

is

!

+ il

+

the

power

by sin z,

^ O

'

I

!

FT J !I

convergent everywhere,

z2k

+

(-

*)*

+

'

'

'

'

(2 k)\

denoted by cos z, that of the power 1~! 1 !

series,

r

for every complex z.

+

series, also

(

1,

convergent everywhere^

55.

The elementary analytic

For

and

real z

= x,

We

functions.

III.

The

functions cos z and sin

certainly gives us the

this

have only

z.

415

former functions cos x

as before, whether these definitions are suitable ones, in the sense that the functions defined, which sin x.

to verify,

are analytic in the whole

possess the plane, i.e. integral functions, 30 cos x and sin x. properties as the real functions again the case, to the fullest extent, is shown by the

same fundamental Thai

this

is

following statement of their main properties:

For every complex

1.

cos

we have

z,

the

240.

formulae

#+ /sin # = 0*%

-+ -

whence further

e

**

-~e

-**

.

81112

,

(Eider's formulae).

The proof

follows immediately by replacing the functions power series which define them.

sides by the

on both

The addition theorems remain valid for complex values of

2.

cos sin

(z l

(^

This follows from

and the

+ 2 = cos z 2 = cos 2 -f-

3)

t

2)

i

since by

1.,

cos

z:

sin z 1 sin z^,

z.}

+ sm

sm ^3

%i

cos -?3 f

^

sin z -f sin 2

237

latter involves

cosfo

+* + isin(* +* 9)

==

9)

1

(cos 2j

= (cos Z

A

+

i

sin

zj

cos z 2

(cos z a

sin

-f- i

sin za )

^ sin ^) -f-

i

(cos

2:,

cos *,)

.

and z^ for ^j and 2 a and taking into account the an even, sinz an odd function, we obtain a similar formula, which differs from the last only in that i appears to be changed Addition and subtraction of the two relations i on either side. to Substituting

z

fact that cos z

is

,

give us the required addition formulae.

The

3.

fact that the addition

tions are formally the

of the

same

real variable x,

these functions by cos,?

theorems for our two integral funca; and sin a;

as those for the functions cos

not only sufficiently justifies our designating and sins, but shows, at the same time, that

the entire formal machinery of the so-called goniometryt since it is In particular, evolved from the addition theorems, remains unaltered.

90

Here again a remark analogous

be made.

to that

on

p. 412,

footnote 28,

may

Chapter XII. Series ot complex terms.

416

we have

the formulae

=

cos 3 z

-f-

sin 2 z

= 2 sin z cos

valid without

sin 2 z

cos 2 z

1,

= cos

9

sin

z

z9

etc.

z,

z.

change for every complex

The period-properties of the functions are also retained in complex domain. For it follows from the addition theorems that 4.

cos

(z -f-

sin (2

cos 2 sin 2

n JT

+

sin z sin 2

rc

sin 2 cos 2

JT

= cos 2, = sin 2 .

cos z aw<2 sin z possess no other zeros in the comknown in the real domain* 1 In fact, iz e~ iz or necessarily involves, by 1., e

plex domain

i.

JT)

= cos z = cos 2

77*0 functions

5.

cos z

-f-

2 n) 2

the

=

besides those already

.

=

e.

By 238,

Similarly, sinz

or z

= kn, 6.

=

z^

-j-

=

iz implies e

=n

~ e" iz

,

or e* iz

=

i.

e.

=

=

cos 22

z,

that either

sin zt

5.,

=

t

+

- JL

fl

-Q

2

sm -~^

2

r

S>~ &

i

by

= 2 k jit,

=

cos z

-

2

sin - 1 -,,

that either

must

=

3-

u

>

5.,

2 iz

e.

cos z2 is satisfied if, and only if, under the same condition as in the real sin z^ if, and only if z -f- 2 k n or Similarly sm z^ z^ It follows in fact from 2 k n. z

cos

by

i.

1,

q. e. d.

The relation z ^ -. 2 kn,

domain. zg

can only occur when

this

4,

ft

JT;

= it

similarly

= = 2 cos g sin -^^ = ^ or ^-^ = (2 A +

follows from

g

L

sin z%

,

-^-Q---

,

-*-

ft

1)

.

7. 77z functions cos,? aw^ sin^r assume every complex value w n $1 (z)
= w^ 81

Or

and only

<

=

but only one,

l,

in other

if,

z

if

ze>

=

1.

words: The sum of the power series

has one of the values (2 k

.similarly for the sine series.

-f 1)

A

,

k

=

0,

-

1

-|

1

,

=

if,

2, ...;

and

...

;

the elementary analytic

g 55.

iV. lhe functions cot z and tan

functions.

Proof. In order to have cos z ~- w, we must have e iz*

or

=w

Vww* V 2

-f-

1.

V Yr (cos

(Here

r

r/;

+

two numbers, for instance 72(0)8-?*

of the

the quantity under the radical

Since in

any case

sin

g?)

is

e~ iz

2

10

defined as one

+isin-~V whose

square

is

c

ign.)

w + Vw 2

32

i

e iz -\-

z.

1

=}=

0,

complex num- n< < +n, 3(Y) w -\-V w* 1,

there certainly exists a

ber

/

foi

which e z

such that '

=

=

'

by 238,5. have n

=w+ By

6.,

we 12

w. This at

in the

penod-stnp. however, a second solution,

from

it,

z),

if,

and only

if,

Fig. 12.

+

1n, i. e. w reason in precisely the

and

We

exists

(viz.

the period -strip

z =H

=

certainly has

therefore

one solution

z,

and

ji

<^

or cos z

different in

9R (2)

'

equation least

<

z

i

Writing

=f=

equation sin z -- w.

In

this

same manner with regard

we

case,

to

can also easily convince

the our-

always one and only one solution of the equation in the portion of the period-strip left unshaded in Fig 12, if we include the parts of the rim indicated in black, but omit the parts represented by the dotted lines (see VI below). selves that there

8.

For the

is

we have

derivatives,

(cos z)'

The

IV. 1.

will also TT

cos z.

(sin z)'

functions cot# and

tan^gr.

Since cos z and sin z are analytic in the whole plane, the functions cot

k

as in the real case,

sin 3,

z

= ^? sin z

and

tan

z

=

-cos

z

be regular in the whole plane, with the exception of the points

for the former

and

(2

k

+

1)

for the latter,

which are the zeros of

z and cos z respectively. Their expansions in power series may be obtained by carrying out the division of the cosine and sine series. Since this operation is of a purely formal nature, the result must be the same as it was in the real domain. 24, 4, where the result Accordingly, by sin

of this division was obtained by a special

k

-

__ -Z

t n ~ tan

32

In

fact, since

w*

1

artifice,

=+=

/

(-

1 \fc-l

1)

w8 Vw2 ,

1 4=

i

?.

we have

418

Chapter XII. Series

complex terms.

oi

On account of 94 and 136, we are now also in a position to de termine the exact radius of convergence of these series. The absolute value of the coefficient of z 2k in the first series, by 136, is

Its

if

(2A)

th

root

is

denotes the

So&K t

every k

=

1, 2, ...

sum

5? *^

>

every other i, but

The

^r. VK

is

it

(for

ft

-*'

tan-series is

12*)

=

cot-series

found to be

and

1,

for

less than this for

is

therefore

1);

and the radius of the

=

when k

-^

between 1 and 2

latter lies

1 "^ IT'

i

n, by 94.

Similarly that of the

.

-^

For cos 3 and sin^r ftott 2. cot z and tan* Aatte tf/te period n. change in sign alone when z is increased by n. Here again we may show, more precisely, that cot *a

= cot

a

*,

In fact,

it

and

jgr

involve

tan

a

(*-0,

*,

COt &.2

=

cos

cos z9

z.

:

:

sin

2r

sin 22

t

In the "period-strip",

wi=

equation cot 2

For each II,

5)

for

e.

By

in

the

w

there

which e*

z 2.

To

are never assumed. 10

1,...).

i,

*%*

.

a

is

accordingly

=f

sin fo,

zj ==

^ 0,

sin z^ i.

w

*

=f=

this,

z

= kn.

SR (0)


+~

/ws^

once;

za

e.

^<

strip

see

*.)X .

:

sin

/Ae

*==. The

2

write

,

then becomes

definite

exists

For z

~< i.

i. e.

=

and tan 2 asswme every complex value

2r

values

a

= + **

that in the case of the first equation sin (za Similarly in the case of the second.

cot

jgr

follows from COt Z,1

3.

= tan

jgr

=

SR (*)

a

/

*'-^, u

<;

y

complex number such

we and

n

that

4

s

<.

%

an(* (by (/) <^ n>

then have cot

jar

= w,

is a solution of the latter equation in the there can be no other solution in this strip.

prescribed

The

strip.

impossibility

g 55.

The elementary

V.

analytic functions.

of a solution for cot z

=

results

*

Ihe logarithmic

from the

series.

419

fact that these equations

both involve

+

=

sin a which cannot be satisfied by any value of z, as cos a z 1. For tans the procedure is quite similar. 4. The expansion in partial fractions deduced in 24, 5 for the the real domain remains in the same valid in form for every cotangent 1* it 2,... (and similarly for the excomplex z different from 0,

pansions of tans, there

may be

single

word 33

.

Indeed the complete reasoning given

etc.).

interpreted in the "complex" sense, without altering a In particular, for every z satisfying the above con-

dition,

Now

it

follows,

if

we

substitute z for

^_

2

_

2inz,

that

,

hence we obtain the expansion i

valid for every

tension to the

i

1

(&0,

complex z=$=2kni

complex on

fractions

obtained

between

this

integer).

This

is

the ex-

variable z of the remarkable expansion in partial connection p. 378, and it exhibits the true

expansion and that of cots, which previously seemed

rather fortuitous.

The logarithmic

V. In

25,

we saw

series.

that the series

<

x 1 the inverse function of the exponential represents for every v i. e. substituting for y in function e 1; |

\

3! 33 It was precisely for this purpose that at the time we framed some of our estimates in a form somewhat different from that required for the real domain 207 to which footnote 26 refers). (e. g. those on pp. 200

Chapter XII. Series of complex terms.

420

the above series and rearranging (as is certainly allowed) in powers of because it is purely x, we reduce the new series simply to x. This fact formal in character remains when necessarily complex quantities are considered.

Hence, for every e"

if

w

denotes the

sum

1

\

=z

ew

AT (l)

W

{L.)

= + z, 1

71

"1

vn Z

.

adopt for the complex domain the

A

Definition.

242.

1,

or

of the series

if\

We now

<

z |

number a

said to be

is

a

natural logarithm of

c,

in

symbols,

a

=

if e

cf

c.

In accordance with

number

c

lies

part

=- log

II,

we may then

5,

assert that every

complex

possesses one, and only one, logarithm whose imaginary between TT exclusive and ^ inclusive (to the number 0, 4=

+

however, by

no logarithm can be assigned

II, 6,

more

defined value will be

at all).

This uniquely

especially referred to as the principal value

of the natural logarithm of c. Besides this value, there is an infinity of c we have also ea + 2k other logarithms of c, since with e a c\ thus

=

=

if

a

is

the principal value of the logarithm of

+2k

a

must k

=*=

also

be called logarithms of

0) are called

logarithms of

c.

numbers

TT i

(k

^ 0,

integer)

These values of the logarithm (for no further

c.

.

We

(log*)

= log

c |

logarithm of the positive number that, taken as a whole, all

3

,

|

(log c)

= amc,

denotes the (single-valued) real \c\, and the second is interpreted as the values of the one side are equal to

in the first of these relations log

meaning all

the

M By 238, 4 there can be subsidiary values have, for each of its values,

its

ffl

if

c,

c

|

\

the values of the other.

With these

definitions,

we may

(L) provides a logarithm of (1

any case that the above series But we mav at once prove more,

assert in

+ #)

namely the

43.

Theorem. The

logarithmic series (L) gives, at each point of the unit with the exception of the point 1), the principal

circle (including its rim,

value of log (1

+ #).

34 If c is real and positive, the principal value of log c coincides with the (real) natural logarithm as formerly defined (36, Def.).

The

55.

VI.

elementary analytic functions

The

421

inverse sine series.

Proof. z |

|

^

For

That the series converges for each z =t= - 1 for which was shown in 230, 3. (We have only to put % for z there.) has that value for which -|z, am(l precisely #)

1

this

iff

7T

/

< *

2

Hence we have,

<+ -.

I

TT

2-

for the imaginary part of the

(3)

3(w)

sum w

of the series (L),

=

with integral k. Now w is a continuous function of z in z <. 1, and assumes the value 1 for xr 0. Hence 3 (w) too is a continuous function # in in 1. the Therefore, equation (^)> ^ must have the same value \\e have clearly to take k for all these z. But for 0; hence this from the % \ve learn 1. is its value in the whole of application Finally of Abel's limit theorem that the sum of our series is still equal to the prinz 1 for which 1. cipal value of log (1 z) at the points 2 =|= |

|

|

\

<

JST

j

<

\

=

+

|

VI.

We ~

^

saw

1,

the strip

The

inverse sine series.

in III, 7 that the equation sin

has TT

exactly

<

j)f

(77)

two solutions,

^+

for

The two

TT.

metrical, either with respect to

\

+

\ or

=

w xr

#,

-

for a given

-[ : 1

exactly

complex

solutions (by III, 6) arc

accordingly,

^;

we may

^- z, for an arbitrary given precisely that the equation sin w has one and one in the strip solution clusive of only 1),

more

-I^

SB

(w)

^+f

in

one,

symassert

z

(in-

,

the lower portions of its rim, from the real axis downwards, arc omitted of the rim not counted with the strip are (cf. Fig. 12, where the parts if

drawn line).

in dotted lines, and the others are marked by a continuous black This value of the solution of the equation sin w z, which is thus

=

uniquely defined for every complex function

^r,

is

sin" 1 z.

tv

All the remaining values arc contained,

sin" TT

called the principal value of the

1

z

sin"

-\-

1

z

by

III, 6,

2k TT,

+

2

k

TT,

and may be called subsidiary values of the function.

in the

two formulae

422

Chapter XII. Series of complex terms.

For

x such that

real values of

? ==a;

|as|


the series 123,

+ -2--3- + 274Tr + 1-8 * B

x9

1

.

,

,

represents the inverse series of the sine power series

Exactly the same considerations as in V. for the case of the logarithmic series now show that, for complex values of z such that z <J 1

,

\

|

the series

"' + T-T+2-4-5- + "is

the inverse

sine

.

1-3 * B

,

w

series

power

= -J,

The inverse tangent

VII.

The equation

i

This

i

It

gives at any rate one of the values of sin" z. That this the principal value, may be seen from the fact that, for

a condition which the principal value alone

=|=

.

-|

is

== sin" 1 <: sin"" 1 1 |z|

z

--w* -^7 1

therefore actually

of the

series

z9

1

.

tant0

=

z, as

series.

we know from

one and only one solution

fulfils.

IV, 3, has for every given

in the strip

-- < -

91

(w) <^

-f" -^-

.

called the principal value of the function

is

the other values of which (by IV, 2) are then obtained from the formula The equations tan z i have no solutions whatever. k 7t

tan" 1 z

+

=

.

Almost word

show

that,

z

for |

word

for
\

,

the

same

considerations as above again

the series

= 2 _.+._ +...

(A)

z. To show that this is actually gives one of the solutions of tznw the principal value of tan"" 1 ,?, we have to show that the real part of

the

sum

of the series lies

between

This remains true for every z

and

is

4

s

--5i

(exclusive) * =*

on |

|

1> as

and

-f- -5-

we^

(inclusive).

as for

ar |

|

< 1,

proved as follows:

The sum w

of the series (A), as

may be seen by

log-series, is

w

= -^j-log + iz) (1

-^-log

(1

iz)

substituting the

The elementary

55.

for every \z\ <[ 1, z

analytic functions.

4

s

i>

VIII.

The binomial

423

series.

where principal values are taken

for both

Accordingly,

logarithms.

SRW = y3log(l + ^)~|3lo g (l-^); by 243, both terms hence

being excluded

between

difference lie

~

between

(w) lies

fR

of the

in either case.

and

Thus

-f- ~rr

>

me

,

extreme values

two

the series (A) certainly represents i> q- e. d. |z|<^l and z

+

the principal value of tan" 1 ,?, provided

VIII.

+~

and

-

The binomial

series.

To

complete our present treatment of the special power series investigated in the real domain, we have only to consider the binomial series

where the

in the case

quantities occurring there assume complex values.

i.

The name

Definition.

of

a where 244. principal value of the power b ,

a and b denote any complex numbers, given to the number

tion, is

when log log b 9

we

the exponent a start with the

e.

We

as well as the variable x

uniquely

with b

4

as the only condi-

s

defined by the formula

b is given its principal value. By choosing other values of obtain further \alues of the power, which may be called its

subsidiary values.

All these values are contained in the formula

ta

u

6^a[\ogb+2kai],

each value being represented exactly once, if log b cipal value and k takes all integral values ^0.

is

given

its

prin-

Remarks and Examples. 1.

A

power

6

fl

accordingly has an infinite number of values in general,

but possesses one and only one principal value. 2.

The symbol

**,

for instance, denotes the infinity of

numbers

(all

real

numbers, moreover) ,

(

ft=

,

1.

2, .. )

a of

which 3.

e

2

is

the principal value of the

The only case

of values

is

that in

in

which a power

power

**.

b a will not

have an

infinite

number

which *"

(ft-0,

1,2.

...)

424

Chapter XII. Series

number

complex terms.

of

ka

values; this will occur if, and only if, only a finite number of essentially different Here two numbers arc described (just for the moment) ,is essentially

gives only a assumes, for values.

finite

=

0,

of

2, ...,

1,

and only if, they do not differ merely by a (real) integer. i\ow and only if, a is a real rational number, as may be seen if, at once; and the number of "essentially different" values which may in this case be assumed by k-a is given by the smallest positive denominator with which a may be written in fractional form.

different this

is

if,

case

the

J.

4.

follows that b m

Tt

m

a

if,

where

m

a positive integer, has exactly

is

quite definitely distinguished as the prin-

is

of different values of b a will reduce to one, by 3. and 4., number of denominator I, i. e. a real integer. For

Tne number

">.

and only

= yb,

one of which

different values, cipal value.

a rational

is

exponents (but for these alone), the power thus remains

real integral

now

if,

all

as before

a single-valued symbol.

power

b

If

6.

ba

is

positive and a real, the value formerly defined (v. the principal value of this power.

and p z

z

23G

for e Similarly, the values defined in precisely, the principal values of these powers bols would represent, for complex values of z, an 7.

more

cordance with our convention that defined

z ,

last

and

Nevertheless,

z

p

for

any

we

=

sym-

infinity of vakus, in acshall keep in future to the

p

positive

are now,

t

shall

represent

value

the

the principal value only

e

i

definition.

generally

(>0),

,

In themselves, these

The following theorems will show that it is consistent when fll(a);>0. The value attributed to the po\\er

8.

for b

e

236,

by

as the

33)

now

is

to define b a also in

th.it

case

is

(uniquely).

making these preliminary preparations, we proceed

After

to

prove

the following far-reaching

Theorem 35 For any complex exponent a and any complex

z

.

z |

|

<

1

,

converges

in

binomial series

the

and has

sum

for

the

principal

value

of

the

as

in

power

(1+1)-. The convergence

Proof of real zs

and

statement as

and

's

(v

follows

pp 200 -210), so

word that

sum of the series. Now we may substitute

to the

real a's,

T.

f

d

remr

n

anjrrw

Math, V

for

word

we haxr

for real x's

1,

p.

311

the case

only to prove the

such

1826.

that \x

\

<

1,

The elementary analytic

55.

for

in the

y

after

for

log u

proceed

+ *)

= (l

= ! + + --]

in this

manner, purely formally

complex and writing

z for x;

and rearrange ence as yet

]\ n

= a .2 -^n 'x*

w

( {

1

z

nl

if

series

assuming

n

iti

e^^Z^-r n=l nl

without powers of z. We necessarily obtain the series any question of convergence

to

be gi

(*+*)

= (l

refer-

a

(where

-f- z)

taken for the logarithm and hence for the power could show that the rearrangement carried out was per-

the principal value

we

Now

missible.

Let us

.

in

to

series

substitute in

whose sum would therefore be proved also),

("\x

^

n

power

in the first instance,

we

e.

i.

obtain,

n

binomial series

the

e.

i.

the

425

series.

and so

)/

of x fallowed by 1O4),

powers

-f ar),

The binomial

VJII.

V"

exponential series

learranging in s

functions.

is

1O4

by

this

is

in

certainly so;

everywhere and the series

converges

fact

cc

when a and

for

z <. 1 convergent replaced by their absolute values. |

|

the

exponential

-- z n

-

remains

senes are

all the terms of This proves the theorem in

the

full

its

extent.

+ z) a

and imaginary parts, we obtain complicated in appearance, but which for that very reason shows how far-reac hing a result is contained in the preceding theorem, and from which we also obtain a means for If

we

split

up

(1

into its real

a formula due to Abel, which

evaluating

a

the

= + iy, /3

is

a

power

(1 -f- z)


,

r/>,

/?,

Writing z

.

/

all

real,

+ = R (cos + z

= r (cos

cp -f- i

sin

and

cp)

and writing i sin

0)

,

we have

R = Vl

+ 2ycos//? +

With these values of

= Rfi

.

e -y

R

= principal

2

y'

,

value

3G

of tan- 1

-

and 0, we thus obtain

* [cos

(00

+ y log R) +

i

sin (ji&

+ y log R)]

.

For the case |^|<1, theorem 245 and the remark just made completely answer the question as to the sum of the binomial series. 1 We have now only to consider the points of the circumference z

=

|

.

\

From Abel's theorem, together with the continuity of the principal value 1 in z <[ 1 and the continuity of the of log (1 -f- z) for every 2 =}= deduce the we at once exponential function, |

has accordingly

to

\

be chosen between

+ -5-

and

-H~-

Chapter XII. Series of complex terms.

426

246.

At every

Theorem. at

2 (!

point of the rim

which the binomial series continues

=

+

1,

=1

of the unit circle,

converge, except possibly for as previously the principal value of

sum remains now

its

|2|

to

*)-.

The binomial

whether, and for what values of a and continues to converge on ike rim of the unit

determination series

made

presents no difficulties after the preparations

00

Theorem.

The binomial

series

is

the

circle

in this respect

53. The theorem we have chiefly for this purpose) in which sums up the entire question once more:

247.

z,

(and

the following,

i

n

J^( }z n=o n '

reduces, for real integ-

>

ral values of

tf^O,

a finite sum, and has then the (ipso facto

to

=

a

in particular for a it has the value 1 (also # does not have one these when z values, the series conof // 1) 1 z and 1 , while it exhibits diverges for \z\ verges absolutely for

unique) value (\-\-z)

=

\

.

\

\

>

a) if 91 (a)

,

<

>

on the circumference

the following behaviour it

=1

z \

:

\

converges absolutely at all points on the circum-

ference',

b)

^

if 91 (a)

ditionally

of the series a

-\- z)

Proof.


it

diverges at z

=

1

and converges con-

at every other point of the circumference.

The sum value of (I

< 91 (a)

1

c) if

1, it diverges at all these points;

;

when

it

in particular, w

Writing

l)

(

(")

converges

its

=

value is

n

+1,

f

invariably the principal

in the case z

=

1.

we have

*-(+!) a

is

.

__

\

U-i/ 229 may

be applied, and the validity of a), b) and c) follows immediately. Only the case of the point z 1, i. e. the convergence of the series

hence theorem

requires special investigation.

=

Now

a (a

- 1) (a - 2)

The elementary

55.

and

in general, as

the

partial

sums

may

at

of our series

same index n,

are

equal to the paitial products,

of the product

/

cc

//fl

\ )

The behaviour

immediately evident. In fact /?>0, choose ft* such that
with

of this

is

product 1.

427

series.

once be verified by induction:

00

the

The binomial

IV.

analytic functions.

=

If

sufficiently large n, say


for

every

n^tm,

hence

By 12t>, 2, it follows at once that the partial products, and hence the sums of our series, tend to 0. The series therefore converges 37

partial to

the 2.

sum If,

0.

however,

R (a) =

< 0,

ft

we have

a n

whence

it

and hence

again follows by multiplication that

that the left

diverges in this case. 3.

If,

finally,

$ (a)

hand

~ 0, a =

sum

of our scries

The

fact that this value tends to

most speedily

The

side tends to oo. i y,

with y

say,

^

series

therefore

the w th partial

0,

is

no

limit as

solute convergence of the series

J?(

J

,

we

+ On

ma y De proved account of the ab-

have, by

29, theorem 10.

n

in the present connection as follows:

+

w> +

oo, the right hand side evidently tends to no limit; on Letting the contrary, the points which it represents for successive values of n circulate incessantly round the circumference of the unit circle in a constant sense, the interval between successive points becoming smaller 37

we

The mere

convergence of

(!)*(

J

follows already from

see that the convergence is absolute when SR(a)>0. It which requires the artifice employed above for sum being

228

and

the fact of the its detection.

is

428

and smaller at each the same is therefore

J(

Series of complex terms.

Chapter XII.

w l)

also (

true

diverges

J

view

In

turn.

of

the

when

of

s

Ji(a)

the

asymptotic

hand

left

= 0.

relationship, series

Hence our

side.

Thus theorem

247

is

parts, the behaviour of the binomial series is determined for every value of z and of a, and its sum for all points of convergence is given by means of a "closed expression".

established in

all

its

Uniform convergence. theorem on double series.

Series of variable terms.

56.

The fundamental remarks on

series of variable terms

n=0 are substantially the same for the complex as for the real domain 46); but instead of the common interval of definition we must (v.

now assume this is also

be a

a

A

region

p.

circle

403, footnote 17). z

\z

\


which for simplicity we shall suppose accordingly assume that

of definition,

most purposes

quite sufficient for

circle (cf. 1.

common

exists,

We

in which the

functions fn

(z)

to

are

all defined. 2.

For every individual z in

z

the circle \

ZQ

\

< r,

the series

n=0 is

convergent. The scries

2

fn (z) then has, for every z in the sum, whose value therefore defines a function of z the definition

on

p.

We

403).

2fn(*)

The same problems

= F(z).

as those discussed in

anse

a definite

the sense of

accordingly write

00

=0

circle,

(in

46 and 47

for the

connection with the functions represented variable terms. In the real domain, however, series of by complex is of the greatest importance, both for the it theory and its applithe of use of in its most general make function to cations, concept case of real variables

in

form, while in the complex domain this has not been fou:id profitable. The usual restriction, which is sufficiently wide for all ordinary purtherefore assume poses, is to consider analytic functions only.

We

further that

The functions fn (z) are all analytic in the circle z 2 with series z as centre and radius not expressible by power than a fixed number r. 3.

\

i.

e.

|

< r, less

We

then speak

429

Series of variable terms.

$ 56.

of series of analytic functions**; a series is the following: Is the such concerning which it ?> function F(z) represents analytic in the circle \z or not? Precisely as in the real domain, it may be shown by examples that without further assumptions this need not be the case. On the

for

brevity

the chief problem

|

<

other hand, the desired behaviour of F(z) may be ensured by stipul47, first paragraph) that the series converges uniformly. (cf.

ating

The

definition for this

almost word for word a repetition of 191:

is

Definition (2 nd form defined in the circle z \

which converges in

this

circle

e

for

if,

N>

every

).

A

series

za

<

r

39

\

circle,

> 0,

is

is

it

(independent, therefore, of

>N

n

for every

and every

2

fn (z), all of whose terms are Z Q <^ r, and in the circle z said to converge uniformly in this or

\

choose a single

to

possible

\

number

such that

z)

z in the circle considered.

Remarks. 1. Uniformity of convergence is here considered relative to all the points of Of course other types of region or indeed arcs an open or closed circle* of curves or any other set $)t of points, not merely finite in number, may be taken as a basis for the definition. The definition remains the same in subTn applications, we shall usually be concerned with the case in stance. which the terms fn (z) are defined, and the series 2fn (z) converges, at every z |<; r (or a domain 0)), but the convergence point interior to a circle |* z ZQ is uniform only in a smaller circle < r, (or in a smaller subg, uhcre with, its boundary, belongs to the interior of (i)) domain j, which, together 2 If the power series ~a n (z z ) n has the radius r, and 0<0<>, the series the (closed) circle \Z is uniformly convergent in ZQ\
\

\

<

,

|

\

<

.

equivalent to the following: 88

Here again we may remark

(cf.

190,

4)

that there is

no substantial

difference between the treatment of series of variable terms and that of sequences A series of functions n (z) is equivalent to the sequence of its partial sums and a sequence of functions s n (z) is equivalent to the series s (z), ., Sj (z),

2f

.

s fl

(*)+(,

.

-* (*))H For simplicity, we shall hereafter formulate all and theorems for series alone; the student will easily be able to

(*)

definitions

enunciate them for sequences. 89 This definition corresponds to the former 2 nd form. The 1 st form 191 be omitted, as it did not appear essential for the application of here may the concept of uniform convergence, but only for its introduction. 43 The set of points of a circle (or, for short, the citcle itself) is said to be closed or open according as the points of the circumference are regarded as included in the set or not.

248.

Chapter XII. Series of complex terms.

430

S fn (z)

3 rd form.

is said to be

uniformly

convergent in

*

*

\

|


(or in the

for every choice of points zn belonging to this circle (or set), corresponding remainders rn (zn ) always form a null sequence. The 4 th and 5 th forms of the definition (p. 335) also remain entirely altered and we may dispense with a special statement of them here. the

set

9ft),

if,

un

On the other hand, it is impossible to give as impressive a geometrical representation of uniform and non-uniform convergence of a series as in the real domain.

We

now

are

a position to formulate and prove the theorem

in

announced.

Weierstrass 9 theorem on double series

249.

41 .

We suppose

given a

series

each of whose terms fk the

analytic at least for \z

(z)

is

at

least for

z \

<

r,

so that

42

expansions

all exist

and converge

that the series

2f^(z) converges

zQ

\z

\
uniformly

Further, in the circle z

we assume < z

\

,

\

< r,

so that the series converges, in particular, everywhere the z Q \
for

every Q It

there. 1.

then be shown that.

may

The

coefficients in a vertical

column form a convergent ,

2.

3.

^j A n n=0

For

z |

is

(z

n

z

ZQ

)

|

converges for

< r,

z \

z \


= 0,

series:

1,2,...)-

.

the function

again analytic, with

n

The proof

dates from the year 1841. an M, indicates the place occupied in the given series by the corresponding function, while the lower index relatec to the position, in the expansion of this function, of the term to which th ?o 41

42

Werke, Vol. 1, p. The upper index,

70.

in the coefficient

Series of variable terms.

56.

z

For

4.

z

< r and for every (fixed) v

|

|

431

1, 2,

.

.

.

,

k-o

F

the successive derived functions of (z) may be obtained by term-by-term the series and each , given of the new series converges uniformly differentiation of i.

e.

in every circle

#

% \

|

5^

with g

,

<

r.

Remarks. we

our attention primarily to expansions in power series, the theorem simply states that with the assumptions detailed above, an infinite number of power series "may" be added term by term. If on the other hand we look rather at the analytic character of the various functions, we have the following If

1.

direct

Theorem.

<

r and the s If each of the functions fk (z) is regular for z z g, for every g 27/fc (z) converges uniformly in z r, then this series z ZQ r. The succes(z), regular in the circle represents an analytic function sive derived functions JFX") (z) of 1, are represented^ in that circle\ (z) for every v by the serie*
series

F F

Each of

in succession.

with Q

<

2. is

|

< \

\

<

^

t

these series converges uniformly in every circle

\

z

ar |

5^ g,

r.

The assumption

satisfied, for instance,

vergence

^

\

\

that 27/7c (z) converges in

by every power

It is also satisfied e. g.

r.

The

5C g for every g < r # z Q ) k with radius of con-

z

|

|

series 27 c k (z

by the

J

series *^ _ 1

-

1

~~~

-,

s

for r

=

1

;

cf.

58, C.

of our four statements shows that the present theorem cannot be proved simply as an application of Markoff's transformation of series; for the here this is deduced from the latter assumes the convergence of the columns, other hypotheses. 3.

first

<

>

be chosen Proof. 1 Let an index m, a positive g r and an e be kept fixed throughout. By hypothesis, we can determine a kQ such ZQ <^ g, that, throughout z .

to

|

for every

\

k such that

k'

**

Now

the function

coeiBcient

(a)

we

write

= ** (*) =/o (*) + sk (z) is

s k > (z)

inequality 235,

a

...+/* (*)

definite

power

series,

whose

th

i7t

we

therefore have

series

*W

+<> + A m be

convergent, by 81. Let the first of our statements is

if

,

is

By Cauchy's

Hence the

>k>A

is

+ its

+

sum. As

=

A-0

m

thus established.

could be chosen arbitrarily,

Chapter XII. Series of complex terms.

432

Now

2.

let

M'

be the

ZQ

=

We

z cumference ference

|

** (*)

I

I

|

^

y.

**.+ 1 (*)

I

of

s fco ^

|

(z)

i

+

I

** (*)

I

we

- %+

i

(*)

\

>k

have then for every k

Again, using Cauchy's inequality,

whatever the value of

43

maximum

along the circumon the same cir-

\M' + = M. t'

obtain, for every n

-

0, 1, 2,

.

.

.

,

Hence

k.

M 00

and 27 A n (z n^O restriction on

z

for

z |

|

zQ ) n therefore converges g

was that

<

r.

(In

if

< < Q < r.)

z

is

\

|

<

should be

it

fact,

z

z

for r,

<

Since the only

&.

the series must even converge

any determinate point satisfying the

always possible to assume Q to be chosen Let us for the moment denote by F l (z) the A n (z #o) n ft s thus, by its definifunction represented by the series ^ z < r. tion, an analytic function in

ZQ

z

inequality so that z

|

ZQ

|

|

r,

\

is

it

"

^

|

3.

We

now

have

to

|

show

F

that

l

(z)

= F (z),

F (z)

so that

itself

is

<

ZQ r. For this purpose, we choose, an analytic function regular in z r a positive Q in Q' as in the first part of our proof, a positive (/ # r, xr and an e 0, fixed. We can determine k so that, for all z in z fj \

|

<

< <

y

>

> k > & By Cauchy's > > k and for every n ^ 0,

for every k such that k' k before that, for k'

&'

Making

->

+

,

I

Now

|

|

An

we

-

.

infer that, for every

+

(

the expression between the

<*>

k

inequality,

>k

it

and every n

,

follows as

S 0,

+ an*) ^

+

I

modulus signs

is

the w th coefficient in

k

the expansion of

F

l

(z)

Zf

v

(z) in

powers of (z

z

).

Hence we have,

i>=o

for

< g: - If/, (*) \*' F, (z) ZQ

z |

|

|

v=-0

The

right

hand

side

is,

z

for |

z

\

<^

Q',

43 is a continuous function of am z Sk +i ( z ) 9 along the circumference in question and (9 being real) attains a definite maximum on this circumference. I

I

56. Series of variable terms.

>

and Thus, when e can determine k so that

>

for every k


Q'

k Q and every \z ^

ZQ

\

433

have been chosen

<^

(/.

we

arbitrarily,

This implies, however, that for

these values of z

r=0

The numbers

< Q' <

<

Q

were subjected

and hence

@' v\

for every z interior to the circle

We

4.

=

V +2 1

^ ()

sum

where the

z

\

"

-

0) ./

i

+

A!

+ 2 AS

(1)

(z

(1)

2

s

z

+3a

)

|

z

ZQ

Hence

\

equation holds

(z-

z

)

+ iA

s

(z

-z

9 )

+

(*

- *o) +

(z

-2

9

2 )

+

' ' '

.

.,

of the coefficients in any one column converges to the

begin our evaluations

^e
a

- *o) + 3 V (*

value written immediately below them. to

the

< r.

z

|

other than

restriction

that

write

/o' (*)

fi'

no

to

follows

it

above)

(as

with

and every

z F'

for those values of

= k >

e'

y

(z)

( 7e

Just as in 3. Q

Q

Y

e)

(we have only

we deduce

for

that

,

= 2fk A-O*

'

(z).

Indeed, by the same

<

ZQ r, for reasoning as before, this series converges uniformly in z for the of series If we r. write down the <. g every corresponding system v th derived functions, we obtain, in the same manner: |

F<"> (z)

= 27/fcW (z) k

(v

=

\

1, 2,

.

.

.

,

fixed)

o

z # |<:r; i.e. the scries Zf^(z) obtained by differterm by term, v times in succession, converges in the whole circle entiating z 5^ Q z ZQ th derived function of F (z) there.

for

every

|

<

\

|

\

|

Remarks.

A

few examples of particular importance

will be discussed in detail in the next section but one. 2. The fact of assuming the convergence uniform in a circular domain is immaterial for the most essential part of the theorem: If is a domain of arbitrary 44 and if every point Z Q of the domain is the centre of a circle z ar shape g (for some Q) which belongs entirely to the domain, is such that each term of the series Zfj. (z) is analytic there, and is a circle of uniform convergence of the given series, then this series also represents a function (sr) analytic in the domain in question, whose derived functions may be obtained by differentiation term by term. Examples of this will also be given in 58. 1.

G

|

F

"

Cf. p. 403, footnote 17.

|

g

Chapter XI 1. Series of complex terms.

434

Products with complex terms.

57.

The developments

rems 1 remain

,

in

such a way

products with "arbitrary"

to

relating

we admit complex

terms hold without alteration when factors.

were conducted

of Chapter VII

and theorems

that all definitions

values for the

In particular the definition of convergence 125 and the theo2 and 5 connected with it, as well as the proofs of the latter,

entirely

unchanged. There

is

also nothing to

modify in 127, the

definition of absolute convergence, and the related theorems 6 and 7. On the other hand, some doubt might arise as to the literal transference of theorem 8 to the complex domain. Here again, however, everything may be interpreted as "complex", provided we agree to

+ aJ

to mean the principal value of the logarithm, for every The reasoning requires care, and we shall therefore n. sufficiently large the out carry proof in full:

take log (1

250.

+

Theorem. series,

The product 77(1 0J converges a suitable index m, with starting

whose terms are the principal values of log

sum of

the

we

this series,

77(1

-|-

an )

n-i

Proof,

a)

O

n-m+i vergent,

its

*

partial

the

If

converges.

are

)

.

.

.

+ am

(1

)

Lm

is

*'-.

For

sufficient.

if

the

tne principal values of the logarithms,

sums

since

consequently,

conditions

wm

),

the

if,

have, moreover,

= (1 + a,) (1 + * 2

The

+ an

(1

and only

if,

s n , (n

> m),

exponential

series is

con-

tend to a definite limit L, and is continous at every

function

point,

certainly tends to a vergent in accordance with

i.

e.

it

value the

+ 0.

Hence

the product is conhas the value

125 and

definition

stated.

The conditions are necessary. For, a given positive e, which we may assume b)

if

the product converges,

< 1,

we can

determine n

so that (a)

for I

an

|

every |

(1

n ^> nQ and every fcj>l. We then have, for every n > n and the inequality an -g-

<~<

,

|

certainly fulfilled

now show

in particular,

<

--

is

We

thus

greater than a certain index m. may that for the same values of n and k hisine' the

for

further

every n

\

435

Products with complex terms.

67.

45 principal values of the logarithms)

n

I

E

(b)

and therefore the

27

series

k

<e

\

+ an

log (1

) is

convergent. In fact, as

|

av

< ^*

\

Ji-mi-l

for every v

>

we

0>

have

also

(c)

by

likewise,

for these values of v,

,

+

log (!

I

and

46

,)

<e,

|

(a),

log [(1

I

+

re+1)

.

.

.

+

(1

+*)]

I

<*

and every k ^ 1. Accordingly, for some suitable integer 47 q we certainly have an+k ) a n+ J a n ^) . . log (1 log(l log(l 2qni\<s, and it only remains to show that q may in every case be taken 0. Now if we take 1, by (c). any particular n ^ # this is certainly true for k It follows that it is true for k For in the expression 2. for every

w

^w

y

+

+

|

+

+

+

+

.

+

= =

,

= a + log (1 n+1 + log (1 + a n+2 + 2q*i the modulus of either of the two terms < by modulus of the whole expression has to be < e; as e < )

)

first

e,

(c), 1,

and by

(d) the

q cannot, there-

be an integer different from 0. For corresponding reasons, it also 3 the integer q must be 0, and this is then easily seen follows that for k by induction to be true for every k. This establishes the theorem. fore,

=

The

part of theorem 127, 8 relating to absolute convergence may viz. be immediately transferred to the complex domain,

also

00

no

the series n

2 =

m+ 1

+ an

log (1

)

and

the product

//

n

-m

\

(1

+ an

)

\

simultaneously absolutely or non-absolutely convergent, in every case. In fact, it 11 of 29 and 30 remain valid. Similarly the theorems 9

are

remains true for complex a n

45

The

y

<-

modulus

s of

that in

logarithms are always taken to have their principal values in what

follows. 46

In

log (i

I

47

the this

sum

fact, for

+

*)

|

^

|

|

*

a |

|

+

<

~,

L*

|a

+

.

*

!

+

i

*p

+

.

.

.

=

-jJ* Lj is

of the principal values of the logarithms of the factors, but

sum by

we

|

For the principal value of the logarithm of a product a multiple of 2

TT i.

Thus log

if

^

. .

(i

e. g.

*""

take principal values throughout.

log

=

i

=

k>

log 1

,

but

= 0,

<

2 1

z

|

.

not necessarily

may

differ

from

436

Chapter Xll.

the quantities

Series ot complex terms.

are bounded,

?^

n

when

since

z |

\

<

while the expression in square brackets clearly has for those

4

.

its

<

modulus

1

z's.

Finally, the remarks on the general connection between series and products also hold without alteration, since they were purely formal

in character.

251*

Examples. *

by

IL

+

(1

is

"-)

theorem

29,

For

Divergent.

10, the partial

2

\

2

an

|

==

s

is

convergent, so that

products

the right hand

expression represents, for successive values of points on the circumference of the unit circle, which circulate incessantly round this circumference at shorter and shorter intervals. pn therefore tends to no limiting value.

4278.)

(Cf. pp.

2.

21

n

f

For

8.

,

z |

of this product

|<

=s '" 1 '

n~"'i

7/

1,

(1

-f-

* 2 ")

In fact

=

.

:p

obvious by 127, 7 and

is

>

its

the wth P artial Product

In fact the absolute)

n

th

is

at

once

convergence

partial product multiplied

by

is

(1-*)

which tends

The complex

to

1.

consideration

of

products

whose terms are functions

of a

variable,

n=l like that of series of variable

terms in the preceding section,

be restricted to the simplest, but also the most important which the functions fn (z) are all analytic in one and the same

will

in z |

_ ZQ

<; r |

that

circle) the circle.

the

circle,

case, circle

e possess an expansion in power series com crgent in in which the product also converges everywhere in The product then represents a definite function F(z) in .

(i.

and

which

is

said,

conversely,

to

be expanded in

the

given

product.

We F(z) |2

next enquire under what convenient conditions the function

by ihe product is also analytic in the circle For the great majority of applications, the following

represented 2

|
theorem

is

sufficient:

Products with complex terms.

57.

Theorem. // the functions fl xr at least in the (fixed) circle z

(xr),

\

/2

|

.

(xr),


if,

;

.

.

fn

,

437 .

(xr),

.

.

are all analytic

252.

further, the series

n-l

^

z z converges uniformly in the smaller circle g, for every positive xr r r\ then the product //(I n (#)) converges everywhere in z (j and represents a function (z) which is itself analytic in that circle. \

\

<

+/

\

<

|

F

The proof

same

the

follows

of

line

as

argument

the

of

that

continuity theorem 218, 1 almost word for word. To establish the convergence and analytic character of the product at a particular point z l z z r and prove the two facts in the circle r, we choose a g for every

<

|

|

first

% of the

<

ZQ
z

circle |

uniformly in the whole of

#

z |

|

/m+l (*)

>m

for every n

|

Pn

(z)\

=

on

converges uniformly in

ZQ

z |

Fm (z)

F(*)

=-

(*)

ZQ

z |

p.

+ (Pm+*

/Wl

a function

/,+ 2

I

and every

It follows precisely as

analytic in

+

Choose

\

Pm+l)

z r,

II (I

+/

^Q

I

fn (*)

then for

;

m |

all

so large that

<1 these w's and #*s,

^ e I/M+1 Wl + - + !/<*) <

3.

I

(ar))

ZQ

\

+

I

+ (Pn

^ Q.

As

the series

#

analytic in

w-1

\

382 that the series

|

<

\

+

+

I

+/whl (*)) ... (1 +/n

(1

|

I

fn (z) converges

\

^ g, so that the product //(I +/n (z))

certainly converges verges there (indeed absolutely).

I

2

series

\

ZQ

|

(*))

all

itself, \

< g.

^n-l)

+

the terms of this series are

by 249, therefore represents

Hence

= (1 +A (*)) ... (1 +/, (*)) Fm (z)

an analytic function, regular in that circle. the above considerations, we may deduce two further theorems, which provide an analogue to Weierstrass theorem on double series: is

also

From

1

Theorem pansion in

power

1.

More

term by term.

With

the assumptions of the preceding theorem, the

ix-253.

F (z)

may be obtained by expanding the product of know that the (finite) product we precisely,

series

P*

(*)

=

//(!+/,(*))

P=l

may z

|

be ZQ

expanded |

15

<

r,

in

a power

series

of centre ZQ

which

since this is the case with each of the functions

converges for

flt /2

,

(051)

.

.

.

.

Series of complex terms.

Chapter XII.

438

Let the expansion be

= A +A?\z-z + A! Z -z + -. + A = 0, 2, the limit for each (fixed] n = Xn lim A >

P]c (

z -)

Then

)

}*

i ''\

1,

.

.

.,

&->+ exists,

and *(*)

= JT(i + 4 0) = 1 ^ - *)"

Proof. I

^

z

z

I

used

in the

same

By

46,

(*

n=

A;=l

theorem

2,

uniform

the

convergence,

in

of the scries

,

preceding proof, implies the uniform convergence

in the

circle of the series 48

PI

W + [P. W - PX ()] +

+ [P W - P*-, k

(*)]

+

theorem on double series to this series, we Applying obtain precisely the theorem stated. Finally we prove a theorem about the derived function of F(z], W^f^ys^rass'

quite similar to

Theorem

218,2: For every z in

2.

-

\z

ZQ


\

for which

F(z)*^Q,

we have

*.

.

of z

//t^

series

and

gives

on the right hand side converges for all these values the ratio on the left hand side, the logarithmic dif-

ferential coefficient of F(z).

Proof.

We

saw

that the

expansion

= PI(Z) + (P F(z)

9 (z)

was uniformly convergent

in

\z

z

- P,

(z))

+

\^e
F'W = P/W + (P,'W-P

'

1 (*))

...

By 249,

+ -...

which implies that

PiW-^F'W at

If at a particular point circle. F(z) each n, and hence by 41, 11,

every point in the

have

PB (z)

=^

for

=J- 0,

we

48 For the remainders of the latter scries only differ from those of the former in that they contain the common factor m (*), which is a con* and hence is bounded ttnuous function for every z in the circle \z SS in this closed circle.

P

I

i

57.

*V(*)

Since, however,

*

~_

f,!(*)_

~il

what our theorem

this is precisely

439

Products with complex terms.

+ M*)'

asserts.

Examples. 1.

If

2 a*

is

any

absolutely

convergent series of constant terms, the product

77(1 represents a function regular in the whole plane, by 252. pansion, in power series, which is convergent everywhere,

By 253,

its

ex-

is

with

Here the indices

A2 ., A/c independently take for their values all the natural Aj <^&- The existence of numbers, subject only to the condition A t
,

.

,

<

,

of

.

.

.

most remarkable formulae. 2. We have

where the product on the right hand side converges in the whole plane The is word for word the same as that given in 219, 1 for a real variable. 3. Taking z = i in the above sine product, we obtain

proof

XI t

or

(Cf.

however the extremely easy evaluation 4.

The sequence

of

J[

\\

-J

of functions

n\n 2 converges for every

by 127, theorem

z in the

whole plane.

In fact

10,

*9

Introductio

60

Fundamenta nova, Kbnigsberg

in

analysin

inf.

Vol.

1,

1829.

Chap.

15.

1748.

in

128,

6).

254.

440

Chapter XII. Series

by 128,

also,

to Euler's

numbers

the

2,

yn

=

(1

--

-|-

complex terms.

ot

--

H

-f-

log n tend, as

j

constant C, so that the right hand expression,

when divided by n z

which

n

>

-f

OO

,

is

+

tends to a definite limit as n * OO. This proves the statement. Further, the limit K(*) say, becomes only for z = Q, 1, 2, .... Excluding these values, we have, for all other values of z, ,

y

=

lim

H

lim

~

This function of a complex variables (restricted only to be ={= 0, ~1 , 2, .) s the so-called a WHHI-function F(z) which we have already defined on p. 385 for real values of the argument. proceed to show that K(z) is analytic in the whole plane (i. e. an For this, it suffices to show that the series integral function). .

.

G

We

K to = ft to + fea W - ft - gn-l

to

^

also a constant

every

|

z

\

exists

and

<J g,

every circle

in

converges uniformly

B1

Let

z |

|

<

. .

=i+

l+i

.

z \

(l)


> w > 2^

^-.

+

.

- gn - 1

[(l

A

. and for every v -= 1, 2, 3, write (see p. 283 and p. 442, footnote 54) t

,

than some constant

i

(<*)

Now

.

g (z)\<

|

we may

less

and n

+ where log

such that

H-----h te

|

W = *l

further,

where |#n (*)| remains 51

<*))

.

B

for

=

every n

.

2, 3, ...

and

Then

.

:


As

(cf. p. 435)

we have

r, v

|

\

<

|,|

<

ff

b = ,4 and the last factor in the preceding expression therefore remains << e 3 for every |^|<^ and every w;> w. Similarly the last factor but one (see p. 295), As the remaining factor is also also remains less than a fixed number A 9 always less than a fixed number A for every \z\ fj #> it follows that On the other * (?) ^i'^a'^8 f r a ^ these values of * and every n >> m also remain bounded ^OT U) hand, the first m functions g.2 (z) g 1 (z) ., ,

.

I

I

^

.

<

|

\

,

\

|

\

ot

which s=^0,

From that |

this

we

,-;-

|

;

1,

infer

< A'

in

2, ... and

in ft,

z |

\

.


,

,

n

=

1

|

|

,

in the text

is

in the interior and on the boundar}' then for every n

>m

same way

exactly the Cor every

.

number A as asserted

the existence of the z for every g> thus established. If z is restricted to lie in a circle |

,

2,

that a constant A' exists such

every

|

Thus

*[<(>

~ In-

fi,

I

for all these

1

/N.^ < A,

W

I

.

|

z's

and

441

A. Dirichlet's series.

58. Special classes ot series of analytic functions.

w's,

#(-) - _ + -^L + *'#nM -V*2

,

.

I

where C

is a suitable constant By 197, it follows that the series for K(z) indeed the series of absolute converges uniformly in the circle |*|<e, does so, values 2 gn (z) and, by 249, K(z) is analytic in the gn -l (*) whole plane |

1

Special classes of series of analytic functions.

58.

A. Dirichlet's

A

Dirichlet series

series. 52

a scries of the form

is

as exponential functions are analytic in the Here the terms chief The whole plane. question will therefore be to determine whether and where the series converges and, in particular, whether and where We have it converges uniformly.

Theorem number

1.

To every Dirichlet series there corresponds a real 255, as the abscissa of conrerf/ence of the series

known

X

such that the series converges when

number

The

I

may

the series converges

also

$R (z)

oo

be

everywhere,

>A

and

<

A diverges when >H z) in the former case (

.

+00;

or

in the latter

nowhere.

Further, if convergent in every circle of the half -plane $ft (z) ^> /' and accordingly the series, by Weierstrass theorem 249, represents a function analytic and regular in every sucn circle and hence in the half-plane 63 W (z) A.

jl

oo and

=|= -|-

X>h,

the

series

is

uniformly

1

>

The proof

follows a line of argument similar to that used in the

case of power series verges at a point Z Q> 9t (z)

it

>

SR (* ).

suffices,

We

93)

(cf.

first

at

converges

it

show

that

if

the series con-

every other point z for winch

As however

by 184, 3 a,

to

show

that the series

-

A

1

1

n=i 5<J

iMore generally, a sories ~- m~

form

or of the form

is

^an

called a Dirichlet series \\hen

e~^ nZ

,

where the p n 's are

it

positive

is

of the

numbers

any real numbers increasing monotonely to -f oo. The existence of the half-plane of convergence was proved by /. L. W. V. Jensen (Tidskrift for Mathematik (5), Vol. 2, p. 63. 1884); the uniformity of the convergence and thereby the analytic character of the function represented were pointed out by E. Cohen (Annales fie. Norm. sup. (3), Vol. 11, p. 75. 1894;

and

the A n 's 63

412 is

Series of complex terms,

Chapter XII.

Writing

convergent.

a fixed exponent

(for

ZD

the numbers

0-n

tainly bounded,

and the

\

-> (* 8-B

#<))>

^

< A, say.

|

'

The

series is accordingly

corollary, divergent at a point z real part is less than

= z^

9

i

the

it

is

M

tne Y are therefore cer-

J

term of the above

convergent

we have

As a

4

th

]

,0,

once seen

s at

Z

(z

"n

when

series is therefore

z

?R(z

)>0.

a Dirichlei series is at divergent every other point whose

that of z 1

statement:

.

If

Supposing that a given Dirichlet

series does not converge everywhere or nowhere, the existence of the limiting abscissa Jl is inferred (as in 93) as follows: Let z' be a

and z" a point of convergence of the series, and For z both real and xo thc y >5R(O> <SR(^) it will converge. Now the method series will diverge, for z apply y of successive bisection, word for word as in 93, to the interval x y on the real axis. The value i so obtained will be the / point of divergence

choose

=

a?

=

-

=

. . .

required abscissa.

Now

=

X>

oo, A' may therefore be any real a domain G in which JR^^Jl' so that in general G will take the shape of a segour series is uniformly convergent in that domain. us choose a point Z Q for which 3l(zQ )
i (for i z is restricted to lie in

suppose if

number); and |2|f^-R, ment of a circle,

A<

To show this, let we write

before,

More generally, we may

54

at

once observe that

if

|*|

<

Ct

and

if

we

the factor &, which depends on z and w, for all the values allowed for z and w.

W (l-f-z)

For every

z |

\

-^ ^^ = ^^^ 10

<

-^-

,

we

a)

therefore have 1

equality

1*1 is

at

<

/?,

once obvious

if

we

replace

remains

17

than a fixed constant

*

iy=

<

|

1

;

u

+/---.fl+.... o 4

hence

in

was denoted by

<* 2jR all

less

Proof:

With

,

the expression in square brackets, which

This

and \w\

write, taking the principal value,

#,

satisfies the in-

-

the quantities in thc brackets

by

theii

A. Dirichlet's series.

58. Special classes of series of analytic functions.

V

a convergent series of constant terms; by 198, 3 a

is

nz

show

fore suffices to

it

443 there-

that 1

1

converges uniformly in the domain in question and that the factors are uniformly bounded in G. Now, writing X d (> 0), 91 (z^)

=

1

1

i*~*

(n

+!)*-*

Using the evaluation given in the preceding footnote

expanding (1 see that a the

-|

=0

J

A

constant

in

certainly exists

modulus signs on the

hand

right

(or else directly,

powers of

(z

-

ZQ))

by

we now

such that the difference within above inequality is

side of the

in absolute value

<4 every z in our domain and expression on the right is thus

for

On

every

other hand, since

the

n

1, 2, 3,

T-,

the factors

The whole

are

uniformly bounded in G. By 198, 3 a, this proves that the Dirichlet series is uniformly convergent in the domain stated, and hence, in particular, that every Dirichlet series represents a function which is analytic in the interior of the region of convergence of the senes (the half- plane

9tf

(z)

> X)

.

From 1

yr <*LJ

follows at once that

a Dirichlet series converges absolutely at a any point z for which 9^(2) >SK(2 ), and if it does not converge absolutely at ZQ) then it cannot do so at any point z for which 9fi (z) SR (Z Q ) Just as before we obtain it

point Z Q ,

it

does so

<

Theorem also

be

+00

2.

or

if

at

.

There exists a definite real number I (which may oo) such that the Dirichlet series converges ab-

solutely for $l(z)>l, but not for ft(z)
=

following

=

Chapter XII. Series of complex terms.

444

Theorem

3.

Proof.

If

We

have in every case is

J

is

$1 (z

>1

ZQ)

.

>

9t (z)

9ft

(z )

+

1

,

then with

for

convergent,

absolutely

and

convergent

an

A<^1.

I

This proves the statement

at once.

Remarks and Examples. If a Dirichlet series

1.

.

not merely everywhere or nowhere convergent the the half-plane *)t (z) < A of divergence of

is

situation will in general be as follows,

<

<

I of conditional convergence of the series; the series is followed by a strip A $ft (z) the breadth of this strip is in any case at most 1, and in the remaining half-plane $R (#) > /, the series converges absolutely.

2. It may be shown by easy examples that the difference / A may assume and 1 (both inclusive), and that the behaviour on the bounding any value between lines 8t (z) = A and 9} (z) = / may vary in different cases.

The two

3.

series

2n

1

series

J?on~~ z anc*

z

provide simple examples of Dirichlet

which converge everywheie and nowhere. 4.

27

has the abscissa of convergence A

-

nz

=

1

thus

;

it

represents an analytic

function, regular in the half-plane fll (#) > 1. It is known as Riemann\ ^-function (v. 197, 2, 3) and is used in the analytical theory of numbers, on account of its connection with the distribution of prune numbers (see below, Rem. 9) 55 5. Just as the radius of a power series can be deduced directly from its co.

efficients

series

(theorem 94), so we

may

infer

what positions the two limiting

Theorem. The given by the

coefficients of a given Dirichlet

We

have the following

abscissa of convergence A of the Dirichlet series

formula A

from the

straight lines occupy.

=

_

lim

j

l

a u+l x log

-f

a^ 2

-f-

.

.

.

+

2

n z

is

invariably

av

where x increases continuously and

[eW] a n for a n in

Substituting

convergence 0.

series

A

this

=w,

0*]

=;.

formula, we obtain

I,

the limiting abscissa of absolute

66 .

concise account of the most important results in the theory of Dinchlet's in G. H. Hardy and M. Riesz, Theory of Dirichlet's series,

may be found

Cambridge 1915. 65

A

detailed investigation of this remarkable function (as well as of arbitrary is given by E. Landau y Handbuch der Lehre von der Verteilung der

Dirichlet series)

Primzahlen, Leipzig 1909, 2 Vols., in E. Landau, Vorlesungen uber Zahlentheorie, Leipzig 1927, 3 Vols., and in E. C. Titchmarsh, The Zeta-Function of Riemann, Cambridge 1930. 56 As regards the proof, we must refer to a note by the author: "Uber die Abszisse der Grenzgeraden emer Dinchletschen Reihe" in the Sitzungsberichte der

Berliner Mathematischen Gesellschaft (Vol. X, p. 2, 1910).

58. Special classes of series of analytic functions.

we

A. Dirichlet's

7. By repeated term-by-term differentiation of a Dinchlet series obtain the Dirichlet series

series.

F (*) ~

-

445

2

***>

n

(fixed,).

As an immediate consequence of

Weierstrass' theorem on double scries, these necescannot have a larger abscissa of convergence than the original series, and, owing to the additiopal factors log" n, they can obviously not have a smaller one sarily

They represent, in the interior of the half-plane of convergence, the derived functions F
either.

8. By 255, the function represented by a Dinchlet series can be expanded a power series about any point interior to the half-plane of convergence as centre. The expansion itself is provided by Weierstrass' theorem on double in

co

series.

If,

about ZQ

=

and

for instance, -j~

2 as centre,

required to expand the function

is

it

we have

continues to hold for k

this

the value

1.

Hence

for

n>0 -

for k

=

1

= 2,

(*)

1

= z *=1 k

3, ...

provided

we

as having

interpret (log lj

which gives the desucd expansion

9.

1'or

(*)>!, CO

the series

VJ

J

n=in 2

and

J

the product '

77 JI

l-/>'

2

values all the prime numbers 2, 3, 5, 7, (where p in succession) have everywhere the same value, and accordingly both represent the Riemann function (Euler, 1737; v. Introd. in analysin, p. 225) (z). takes for

its

.

.

>

Proof. Let z be a definite point such that 5H (z) = 1 -f-<5 1 By our remark 4 and 127, 7, the series and product certainly converge absolutely at this point. We have only to prove that they have the same value. Now

multiplying these expansions together, for denotes an integer kept fixed for the obtained is AT

where the accent on the

all

prime numbers

moment,

.

p< AT, _

whore

the (finite) product so

indicates that only some, and not all, of the terms taken. Here we have made use of the elemen2 can be expressed in one and tary proposition that every natural number only one way as a product of powers of distinct primes (provided only positive 15 * of the series written

2"*

down are

>

(G5l)

Chapter XII. Series ot complex terms.

446

exponents are allowed and the order of succession of the factors Accordingly

integral left

is

out of account).

*

7T

V>

V

On the right hand side \ve have the remainder of a convergent series, which when tends to co. This proves the equality of the values of the infinite product and of the infinite series, as was required.

N

-

+

By 257, we have

10.

where

for

ffi

-

(z)

>

1

-

--

= 1, M (2) = 1, p (3) = 1, p (4) = 0, p (5) = 1, . . . (1) 1, p (6) 1 according as n is divisible by the and generally /x (w) 0, + 1 or square of a prime number, or is a product of an even number of primes, all different, or of an odd number of primes, all different. The product-expansion of the ^-function also shows that for JR (#) > 1, we always have The curious coefficients (z) =t= 0. There is no superficial regularity in the fi (n) are known as Mobius* coefficients. H

+

,

mode

of succession of the values

Since f

11.

-

(z)

^n

z

0,

-f-

converges

among

1

1,

the

numbers

absolutely for 81

/LI

(n).

(?)>!, we may form

the square (f(*)) 2 by multiplying the series by itself term

arranging

in

order of increasing denominators (as

is

by term and reallowed by 91). We thus

obtain

in denotes the number of divisors of n. function explain the importance of the

where to

in

These examples may suffice problems in the theory of

numbers. B. Faculty series.

A /

(

is

faculty series (of the first kind)

n

a scries of the form

V

'

which of course has a meaning only questions of

convergence,

if

elucidated in

2

+ 0,

the

first

1,

2, ....

instance

The

by Jensen,

are completely solved by the following

258.

Theorem

of

/>/.rfu 67

.

The faculty

the exclusion of the points 0,

1,

ciated" Dirichlet series

^

series (F) converges

2, ...

with

wherever the "asso-

and conversely the latter converges wherever the series (F) conThe convergence is uniform in a circle for either series when it so for the other, 'provided the circle contains none of the points

converges, verges. is

0,

,

2, ... either in

1,

J Uber

6

Vol. 36, pp.

die

its

interior or

on

its

boundary.

Grundlagen der Theorie der Fakultatenreihen.

151218.

1906.

MUnch. Ber

58. Special classes of series of analytic functions.

Proof. series

at

We

1.

first

any

particular the faculty series at the

show

that

point

=j=

same

the

0,

gn (z)

by 184,

show

3 a, to

n=l is

t> all

convergent

2,... involves

that

of

As

point.

has the same significance as

447

convergence of the Dirichlet 1,

n*

>...(*+ n) if

B. Faculty series.

in

gn (z)'

1354, example 4,

it

is sufficient,

that the series

&(*)

8*

Now

+ i(*)

n =l

tends to a Sn

I

&W'&

finite limit

+i

as

(*)

w

I

increases,

namely

(2)

the value F(z); hence, in particular, this factor remains bounded for values of w (z being fixed). Hence it suffices to establish the con*

verge nee of the series

But

has been done already in

this

The

2.

fact

that

254, example 4. convergence of the faculty

the

series

at

any

point invoK es that of the Dirichlet series follows in precisely the same manner, as again, by 184, 3 a, everything turns on the convergence of

-!&,(*) -ft,+ila circle in which the Dirichlet series converges be 3. which none of the points 0, and contains 1, 2, ., absolutely either as interior or boundary points. We have to show that the faculty scries also converges uniformly in that circle. By 198, 3 a, this again reduces to proving that

Now

let

.

a fg\.a z Sn Bn \ ) *

+1

.

(z

\*.

uniformly convergent in $ and that the functions 1 The uniform convergence of uniformly bounded in

is

/

gn

(z)

remain

.

n=l

was already established

254,

in

4.

Also

it

was shown on

p.

440,

footnote 51, that there exists a constant A' such that 1

for every z in

theorem

Jf

and every

w.

This

is

all

that is required.

(Cf.

-H>,

3.)

The

converse, that the Dirichlet series converges uniformly in which the faculty scries does so, follows at once by uniform convergence of the series the a from 3 198, g n (2) g n + ,() and the uniform boundedness of the functions gn (z) in the circle, both 4.

every circle in

of which

were established

2

in

254,

4.

\

|

448

Chapter XII. Series of complex terms.

Examples. 1.

The

faculty series

S converges

1

'

at every point of the plane =(=0,

1, ...

For the

.

Dirichlet series

I

00

1

z

n=l is

evidently convergent everywhere.

As

.111 x+l

_

1

A/I* T =

/..

x(x+l)'

2! " 7~iT~/

_

?i\

*(*+l)(ar + 2)

x

__

1

x

x

.

> f

the given faculty series results simply, the series

_x

A* 1-

""' *>

/3

'

x

kl

(x -f 1)

Euler's

by

-

-

(x

+ *)

'

transformation 144, from

~~

_ __ """""

2. It is also easily

01

1

To show cessively

this,

left

(cf.

pp.

2656)

11

.

we have

from the

seen

(Stirling

only to subtract the terms of the right hand side sue side. After the w th subtraction we have

we

n\n z

1

..(*+)

z-n* *

when w-*oo, provided by 254, example 4, tends to Methodus differentialis, London 1730, p. 6 seqq.) C.

A

>

hand

). this,

$R (z)

(*-!)!

.

,

n\

and

that for

Lambert

Lambert's

series is a series of the

series.

form

58

again inquire what

is the precise region of convergence of the 1 can that for every z for which z n noted be series, it must of number the terms of an infinite the series bebe equal to zero, of the circumference unit circle For this the come meaningless. reason,

If

first

will

be entirely excluded

from consideration

59

while

we

discuss

the

A

68 more extensive treatment of this type of series is to be found in a paper author: Cber Lambertsche Reihen. Journ. f. d. reine u. angew. Mathem., the by Vol. 142, pp. 283315. 1913. 59 This does not imply that this series may not converge at some points ar t

of this circumference, for which zf =t= -f 1 for every n *Z will not consider the case here.

happen; but we

1.

This may

actually

58

C. Lambert's series.

Special classes of series of analytic functions.

question of convergence of these series, and the outside the circle will be examined separately.

We

which

theorem,

the

solves

completely

points inside and have the following

of

question

449

convergence

in

this respect:

Theorem.

//

whose modulus an z

4

s

converges, the Lambert series converges for every z ! a n * s n t convergent, the Lambert series

W^

precisely the same points as

at

converges

2an

is

n

+

"associated"

the

power

as before. provided Further, the convergence is uniform in every circle & which lies completely (circumference included} within one of the regions of convergence of the series and contains no point of modulus 1.

series

z

\

\

Proof. in that case

2a n

Suppose

1.

necessarily <^ 1

1

The

divergent.

and we have

to

radius

show

of

r

2 a n zn

that the

first

is

Lambert

and the assoaated power series converge and diverge together 1. 1, and that the Lambert series diverges for every \z\ \z\

series

<

for

>

Now

w

y

and

**

vi

it

Accordingly,

suffices,

z"

= y

n\

.(\

by 184, 3 a,

1

n

v-.

establish the convergence of

to

the two series

and -

for

The

|s|
first

M _

of these facts

7* I*

V

L

I

I I

obvious, however,

is

second follows from the remark that for

z |

\

< 1,

we have

1 1

while the z

n \

>

-x-

for all sufficiently large w's.

On where |

the other hand, if the Lambert series converged at a point zv 1 , the power series

ZQ

|

>

would converge to

=2 =+

for z

converge for z

1.

,

and by 93, theorem Hence the series

1,

would have also

would also have Finally, \z\ <*

Q <. r

to converge, which is contrary to hypothesis. the fact that the Lambert series converges uniformly in

inequality

once be inferred from the corresponding fact in n in virtue of the 46,2, power series \a n z \, by

may

the case of the

at

259.

450

Chapter XII.

The

2a n

is

diverges

thus completely dealt with.

2

n a n convergent, so that a n z has a radius suppose The Lambert series is certainly convergent for every z -< 1 and

Now

2.

?^>

case where

Series of complex terms.

1.

\

|

indeed uniformly so for

For

I

z

>

f

^> Q

I

1

all

values of z such that

z |

\

<^

>


we have

,

.-6T-, "!_(!)'

<

'

and as

I

z

this

1,

reduces the

assertions

later

the pre-

to

ceding ones, and the theorem is therefore established in all its parts. By the above, a very simple connection exists, in the case where _T a n is com ergent, between the sum of the series at a point z outside the unit

and the same sum

circle will

suffice if Accordingly it convergence of the series which

either the circle

<

z |

\

we

it.

thdt region of only the unit circle. This is

inside z |

2 a n zn

inside

point

consider

lies

? or the unit circle

the radius r of the series

the

at

<

is

1

\

<

or ^>

1

1.

according as Let r 1 denote the

itself,

radius of this perfectly definite region of convergence. The terms of a Lambert series are analytic functions

l^l^fj, and

for

the series

<: r lf

is

regular in uniformly con-

e\ery positive Q hence we may apply Weierstrass* theorem on double series to obtain the expansion in power series of the function rehave z r presented by a Lambert series vergent in

z

|

\


m

|

<

\

+a

.

We

+ a,2

a **

+

and we may add all these series together term by term. In the n row, a given power z will occur if, and only if, n is a multiple of or k a divisor of n. ing series, suffix

r

bolically

is

will

An

Therefore

be equal

to

the

,

the coefficient of z

sum

of those

a divisor of n (including 1 or w).

n

in the result-

coefficients

This

we

a v whose write sym-

60

An and we then have,

In words: the

for

z |

sum

\


=

ad

,

d/n l

,

of all a d 's for

which d

is

th

k,

a divisor of n.

58. Special classes of series of analytic functions

C. Lambert's series. 451

26O.

Examples. an

1.

example

=

1.

we

11)

An

Here

equal to the number of divisors of n t which (as in 257, denote by rn then is

\

= z

+

s 4 + 2 # 5 + 4 z* -f 2 3 7 -f 4 z* -f . In this curious power series, the terms #n whose exponents are prime numbers are distinguished by the coefficient 2. It was due to the misleadmgly close connection between this special Lambert series and the problem of primes that this series (as a rule called simply the Lambert series) 61 played a considerable part in the earlier attempts to deal with this problem. But nothing of importance was obtained in this manner for some time. Only quite recently AT. Wiener 62 succeeded by this means in proving the famous prime number theorem.

an =

2.

will

Here

n.

E

n

1

is

for |

2

as

3

-f 3

.

equal to the sum of

z

<

\

all

An

Zad

which we

the divisors of n,

8

relation

.

.

1

*---.= J7T n 's = sr+3s + 4* 8 + 7* + 6* + T L ~~ z n=\

The

3.

An

Thus

denote by rn '.

n

2 z*

-}-

1S

uniquely reversible,

e.

i.

12*'

+

----

An

for given

's,

the

din

a n can be determined in one and only one then have in fact

coefficients

We

way

so as to satisfy the relation.

denotes the Mobtui coefficients defined in 257, example 10, whose In consequence of this fact, not only can a Lambert 1. -|- 1 and series always be expanded in a power series, but conversely every power series - 0. may be expressed as a Lambert series, provided it vanishes for z = 0, i. e. A But it should be observed that a relation of the form

where

/i

(k)

values are 0,

need not remain true for 3 4. For instance, if A |

and we have the curious

> \

=

1

1,

even when both series converge there.

and every other an

-

J7

/iW

71=1

Similarly,

we

number

Z n

by diagonals allowed),

we

an

1

\n ~

.-

X

^~~ n = f(z)

pp.

61

Lambert,

Wiener, N., a

7,

pp.

|

1,

,

a

number

Z n

a n zn

g

(z),

and grouping the terms

1

in the double expansion of the Lambert series on p. 450 (which obtain

62

1100,

|

<

on

and

/(*)*(*) + *<*) + ...-

Vol.


2

of integers less than n and prime to

^n

oo

Writing

6.

S

r

* ~~

find the representation, valid for

(n) denotes the introduced by Euler.

where 9

0,

identity =.

6.

An =

(),

/*

27

is

*(").

JH. Anlage zur Architektonik, Vol. 2, p. 507. Riga 1771. new method in Taubenan theorems, J. Math. Massachusetts, H>1184, 1928, and Taubenan theorems, Ann. of Math. (2), Vol. 33, 1932.

452

XIL

Chapter bor a n

7.

=

1

"1

I)* /

( \

=

,

complex terms.

Series of

=

n,,

I)"" /

( v

(_i)n-i ^

1

1

=

v

=--,== w

, '

,

n

an

obtain in this way, successively, the following remarkable identities, 1 to oo : # 1, in which the summations are taken from n | zn zn n~ L --( l) a) 7 n .-__ 1

.

.

,

.

valid

,

we for

<

|

2

b>

2

^

^

^"i^h

^

l)

-^(1

'

W

---

Z*log(l

1 ~

Qt

-^i*

"

-

27

e)

>

===

(I OC

n

/^/ i

1

^ n),

4-

I


etc. 8. In the two identities d) and e) we have on the right hand side a series thus simple conof logarithms (for which of course we take the principal values) nections can be established between certain Lambert series and infinite products. ;

from the two

E. g.

identities in question:

zn

^.1

II (1 MO

--

9.

As an

0,

HI

sequence

Z

=

y

- Z -' 1

with

",

-

/

(cf. 6, 7) 1,

2,

1,

3,

21,

13,

8,

5,

34,

....

55,

then have l

,-*

* i.+

1

3

.!*... + + 8

1

+

1

- V'5\ A= f r /3 -V + - - V5 [L (J

where a and

ft

55

'

series

3

JC ,

are the roots of the quadratic equation x 2

174. Suppose z n ->

and b n -> b

_ es

- __ 3 A /7._ ^

.

1

The

proof

=

(Cf. Ex. 114.)

0.

is

based

64 .

conditions

may W3

infer

-* tfl

175. Suppose zn -> X)

we then

xn

x

Under what

4= 0.

,

n

_

Exercises on Chapter XII bj*

r

.

.

21

where L (je) denotes the sum of the Lambert on the fact, which is easily established, that

that

.

, I

71

interesting numerical example we may mention the following: Taking w n _i + w n-2 w ^ obtain Fibonacci's for every n > 1, */ n I, and

0,

We

h *")

(i.

e.

|

zn

-> |

-f-

oo).

Under what conditions may

infer that a)

(l \

b)

zn

+ -

z-)* n/

(z l l sn

-

-> e*, 1)

-> log *?

Landau, E.: Bull, de la Soc. math, de France, Vol. 27, p. 298. 1899. In these exercises, wherever the contrary does not follow clearly from the context, all numbers are to be regarded as complex. 64

Exercises on Chapter XII. 176. value than

The

principal value of z* remains, for fixed bound.

some

=

zn

177. If

all

453

values of z

t

less in absolute

j?(- If (*), \v/

v

either

of

Csy

z n ->

or

->

sn

n ) when 9R (z) 178. Let 0, A,

-=

arbitrary.

0,

according as

9R (z)

>

<

or

What

0.

the behaviour

is

0?

c,


b c ^ be four constants for which a d and let # be numbers (z z lt z 2t ) given by the re-

Investigate the sequence of

,

currence formula

zn

What

are the necessary

and

~ ~-

a n

LI hi

_ _ C5r n

i

v

(n V

a

-t-

sufficient conditions that (z n ) or ( ) \xr n /

1 J

2 ^

>

> /

should converge?

And if neither of the two converges, under what conditions can z p become again for some index />? When are all the n 's identically equal? 179. Let a be given 4= and Z Q chosen arbitrarily, and write for each n

z

-3r

^

1

(zn ) converges

and only

if,

Z Q does not

if,

two values of

on the perpendicular

lie

Va

through its middle point. a nearest to sr What fulfilled, (zn ) converges to the value of (xn ) when s lies on the perpendicular in question? line joining the

V

180.

The scries 27- {+~*~

.

does not converge for anv

on the other hand, does converge for every

real

y

real

y

;

to the straight

If this condition is is

the behaviour of

the series 27

n

~

TV---"

--

,

log n

,

0.

=4=

The

refinement of Weierstrass's theorem 228 that was mentioned in footnote 13, p. 399, may be proved as follows in connection with the foregoing example: From the assumptions, it follows, firstly, that we may write

180

a.

(n

where the

Bn

's

are

bounded;

^^r

--

+

l

&

hence, secondly, that

(y

we may

1 -H -~x

also

test

184,

3.

2 an

If

were to converge, then

(A> 2)

>

X) '

write

(C sumptions of the

- Min

~ N"" )

1

satisfy the as-

2 an bn =

E

- would

have to converge, contrary to the preceding example and theorem 255. 181. For a fixed value of z and a suitable determination of the logarithm,

does

tend to a limit as n -> -|-QO? 182. For every fixed x with lim

1

+

tt

,

< -h

-,

SR (z)

<

1,

+ ...+

exists (cf. Ex. 135).

The

may be expanded

in a

power

a n z n for z < 1 if we take the principal value for the logarithm. z 1. Jhat this senes stjjl converges absolutely for

Show

183. series 27

function (1 |

|

z)

-

sin

Hog

=

1

,

J

J

454

Chapter XII. Series

184. angle",

x tends to

If

we have

+1

l_, + .,_,,<> + ,t_4.

b)

(l-

.

e)

complex terms.

from within the unit

a)

d)

ot

circle,

and "within the

_!.. .

..-

_

(1-,

2 a *n z n--*lim ,.

n y ^&*

an 5 bn

provided the right hand limit

bn

exists,

is

positive for each

w,

and

Sb n

is

divergent.

185. Investigate the behaviour of the following power series on the circumference of the unit circle:

V

1

(

^)

e)

2

2i

186*

f" If

S

**

v

n '

n

tt

*">

wnere

n

has the same meaning as

a n z n converges for

for all such values of *, then

187. The power

+

^|an

f

in

Ex. 47.

-< 1 and its sum is numerically 1 converges and its sum is

z |

a |

\

<

.

series

h)

J-__

have the unit circle as circle of convergence. On the circumference, they also converge in general, i. e. with the possible exception of isoLited points. Try to express their sums by means of closed expressions involving elementary functions; separate the real and imaginary parts by writing 2 = 7 (cos x -\-i sin x), and write down the trigonometrical expansions so obtained for r 1 and for r = 1 separately. For which values of x do they converge? What are their sums? Are they the Fourier series of their sums? 188. What are the sums of the following series: coswccsinwy Y7 cos nx cos n y H ft -_. sin n x sin ny X' ^, all

<

.

f\ /

-*-/

M rl

and of the three further series obtained by giving the terms of the above series the sign (- 1) B ?

455

tixercisee on Chapter XII.

z* as in Ex. 187, but leaving

189. Proceeding with 1

we

,

the geometric series obtain the expressions

a)

V

b)

>7 ?" sin

rn

cos

nx =

- --r

1

-

-,

1

cos x

2 r cos x-}-r* ;

rsma;

n a;

=

1

Deduce from them

the further expansions

costta;

f

cos x) n w^i (2

and indicate the exact intervals of validity. 187 a the following- expansion will have been obtained,

19O. In Exercise among others.

rn

y. ^Tj n

Deduce from

it

sin

nx

tan

(

f

rsin x

\ I

\ 1

r

cos x J

-f-

cot x)

.

the expansions

00

y,

~ .x

1)"

"*

rn

sm n

x-

sinn

a;

=

tan

-x

(r

( f

&

\

-5-

x\

,

n=L

and determine the exact intervals of

validity.

191. Determine the exact regions of convergence of the following series

[log log n]

where

(#>) is real

and increases monotonely to

1!>2. Establish the relations

*"

-'

l

+*

where the summation begins with n

= l.

+OO.

45G

Chapter XII. Series of complex terms. 193. Corresponding to Landau's theorem (258)

Dirichlet series 27 (~ I)""

are convergent

"

1

we have

the following:

and the so-called binomial coefficient series 2a n

=

and divergent together, the points z

1, 2, 3,

.

. .

The

(

being disregarded.

194. For which values of z does the equation

hold good?

195. Determine the exact regions finite

of

convergence

of the following in

products:

77(1

196. Determine, by means a)

The second

a;.

2~

Does

2

g

of these has the value

cos

[cosh (jtx^ 2)

this continue to hold for

complex values

197. The values form

of the products 195, i) of a closed expression by means of the

198. For

1 1

1< 1

199. By means

0)^(1 + 5).

*>//(!+)

//(l+J*),

for real values of

of the sine product, the values of the products

(jr

x

\/

2)

]

.

of xl

and k), can be determined F- function.

in ihe

,

and the expansion of the cotangent and product may be evaluated in the + form of closed expressions; x and y are real, and the symbol f( n ) indicates of the sine product

in partial fractions, the following series

<

2 n=

sum

of

the

two

series

2

n=0

f( n )

2

and

k=l

f(-~ k )> & nd similarly

product:

+ 00 a)

<0

2

n=s-

J

*'

oo

+00

-f CO

the

+00 b)

-

for

the

g 59.

General remarks on divergent sequences.

Chapter

Divergent

457

XIII.

series.

General remarks on divergent sequences and the

59.

processes of limitation. of the nature of infinite sequences which we have 8 11, is of preceding pages, and especially in a strict for and recent construction date; irreproachable compai ativdy of the theory could not be attempted until the concept of the real number had been made clear. But even if this concept and any one general convergence test for sequences of numbers, say our second main

The conception

set forth in all the

criterion, were recognized without proof as practically axiomatic, it nevertheless remains true that the theory of the convergence of infinite sequences, and of infinite series in particular, is far more recent than

the extensive use of these sequences and series, and the discovery of the most elegant results of the subject, e. g. by Euler and his con-

temporaries, or even earlier, by Leibniz, Newton and their contem To these mathematician?, infinite series appeared in a very poraries.

way as the result of calculation, and forced themselves into e. g. the geometric series 1 -\- x -\- x* -\ocso to speak curred as the non-terminating result of the division l/(l x); Taylor's series, and with it almost all the series of Chapter VI, resulted from the principle of equating coefficients or from geometrical considerations. natural notice,

It

was

and the

:

in a similar

all

manner

that

infinite

other approximation processes

symbol

for infinite sequences

products, continued fractions occurred. In our exposition,

was created and then worked with;

originally, these sequences were there, and the question be done with them. what could was, On this account, problems of convergence in the modern sense Thus were at first remote from the minds of these mathematicians 1

it

was not so

it

is

.

not to be wondered at that Euler, for instance, uses the geometric

series

i-y-^x-f-*/

even lor

x =

1 or

x =

-,

2, so that

\

X

he unhesitatingly writes 2

41. Cf. the remarks at the beginning of This relation is used by James Bernoulli (Posit, arithm., Part 8, Basle 1696) and is referred to by him as a "paradoxon non inelegans". For details of the violent dispute which arose in this connection, see the work of R. Reiff mentioned in 69,8. 1

a

458

Chapter XIII. Divergent

or

1

from

similarly

-2+

22

-

2J

+

series.

...

= ^

= 1 + 2x+ 3x + 2

f^_

-)

.

.

.

;

he deduces the relation

i-a + 3-*+-... = i; and a great deal more. It is true that most mathematicians of those times held themselves aloof from such results in instinctive mistrust, and recog3 But they had nized only those which are true in the present-day sense no clear insight into the reasons why one type of result should be admitted, and not the other. Here we have no space to enter into the very instructive discussions on this point among the mathematicians of the 17 th and 18 th centuries 4 We must be content with stating, e. g. as regards infinite series, that Euler .

.

always

let

when they occurred

these stand

naturally

by expanding an 5

analytical expression which itself possessed a definite value was then in every case regarded as the sum of the series. It is clear that this

convention has no precise basis. Even though, 1 H 1 ... results in a very simple

1 for instance, the series 1 manner from the division 1/(1

fore should be equated to

This value

.

^

+

x) for

there

is

x

and there-

1 (see above),

no reason why the same

should

series

not result from quite different analytical expressions and why, in view of these other methods of deducing it, it should not be given a different The above series may actually be obtained, for x value. 0, from the

=

function f(x) represented for every f(*\ J{)

or from

t

J? ir-J)-" "* -l

1

>

by the Dirichlet series

= i_L4_!_!-L 4* -*-' 2*t-3-

+

= putting x to take 1

=

x

1.

1

In view of this

+

.

.

.

=

2 g,

latter

method of deduction, we should have

and in the case of the former there

mediate evidence what value /(O)

may have;

it

no im-

is

need not at any rate be

+ -2

.

3

Thus d'Alembert says (Opusc. Mathem., Vol. 5, 1768, 35; M^moire, p. 183): "Pour moi, j'avoue que tous les raisonnements et les calculs fond^s sur des series qui ne sont pas convergentes ou qu'on peut supposer ne pas 1'fitrc, me paraitront toujours tr&s suspects". 4 For details, see R. Reiff, loc. cit. 5 In a letter to Goldbach (7. VIII. 1745) he definitely says: ". . so habe ich diese neue Definition der Summe einer jeglichen seriei gegeben: Summa cujusque seriei est valor expressions illius finitae, ex cujus evolutione ilia series oritur". .

59.

General remarks on divergent sequences.

459

Eulers principle is therefore insecure in any case, and it was only Enter* unusual instinct for what is mathematically correct which in general saved him from false conclusions in spite of the copious use \vhich he made of divergent series of ihis type 6 Cauchy and Abel were the first to make the concept of convergence clear, and to renounce the use of any non-convergent series; Cauchy in his Analyse algebrique (1821), and Abel in his paper on the binomial series (1826), which is expressly based on Cauchy s treatise. At first both hesitated to take this decisive step 7 , but finally resolved to do so, as it seemed unavoidable if their reasoning were to be made strict and free from gaps. .

We

are now in a position to survey the problem from above, as it were; and the matter at once becomes clear when we remember that in whatever form it the symbol for an infinite sequence of numbers has, and can have, given, sequence, series, product or otherwise no meaning whatever in itself) but that a meaning was only assigned This convention consisted to it by us, by an arbitrary convention. is

in allowing only convergent sequences, i. e. sequences whose terms approached a definite and unique number in an absolutely de-

firstly

consisted in associating this number with the or in regarding the sequence as no its value, more than another symbol (cf 41, 1) for the number. However obvious and natural this definition may be, and however closely it may finite

sense; secondly, infinite sequence, as

it

be connected with the way in which sequences cessive approximations to a result which cannot a definition of this kind must ne\ ertheless in all sidered as an arbitrary one, and it might even

occur (e. g. as sucbe obtained directly), circumstances be conbe replaced by quite different definitions. Suitability and success are the only factors which can determine whether one or the other definition is to be preferred; the nature of the thing itself, that 8 sequence , there is nothing

is to say, in the symbol of (s w ) which necessitates any preference. We are therefore quite justified in asking whether the complication which our theory exhibits (in parts at least) may not be due

in

an

infinite

6

Cf.

on the other hand

7

So

far as

p. 133, footnote 6.

concerned, cf. the preface to his Analyse algibrique, Cauchy other things, he says: "Je me suis vu force d'admettre plusieurs propositions qui paraitront peut-ctre un peu dures, par exemple qu'une serie divergente n'a pas de somme". As regards Abel, cf. his letter to Holmboe (16. I. 1826) f in which he says: "Les series divergentes sont, en general, quelque chose de bien As already fatal, et c'est une honte qu'on ose y fonder aucune demonstration". mentioned (p. 458, footnote 3), J. d'Alembert had expressed himself in a similar sense as early as 1768. in

which,

is

among

8 (s n ) may be assumed to be any given sequence of numbers, in particular, therefore, the partial sums of an infinite series 27 a n or the partial products of an

infinite

product.

infinite series are

We by

s, with its reminder of the word "sum", because most important means of defining sequences.

use the letter far the

460

Chapter XIIT.

Divergent

series.

to our interpretation of the symbol (s n ), as the limit of the sequence, however obvious assumed convergent, being an unfavourable one, and ready- to-hand it may appear. Other conventions might be drawn up in all sorts of ways, among which more suitable ones might perhaps be found. From this point of view, the general problem which

presents

itself is

some way,

either

A

as follows:

particular sequence (s w ) is defined in the terms, or by a series or

by direct indication of Is

product, or otherwise. in a reasonable way?

it

possible to associate a "value" s with

it,

"In a reasonable way" might perhaps be taken to mean that the s is obtained by a process closely connected with the previous s. concept of convergence, that is to say, with the formation of lims w This has been found so extraordinarily efficacious in all the preceding that we will not depart from it to any considerable extent without

number

reasons.

good

"In a reasonable way" might also, on the other hand, be interpreted as meaning that the sequence (s n ) is to have such a value s associated with

that

it

wherever this sequence

occur as the final

may

result of a calculation, this final result shall always, or at least usually, be put equal to s.

Let us

The

first

2:(-l)"

5862. i.

e.

these general statements by an

illustrate

example.

series

the geometric series

= l-l+l-l+-..., or the sequence 2xn for x = 1,

0, 1, 0, 1, 0, ...,

(sjel,

has so far been rejected as divergent, because its terms s n do not approach a single definite number. On the contrary, they oscillate

unceasingly between 1 and 0.

This very

fact,

however, suggests the

means

idea of forming the arithmetic 9

Sc n

Since

S||

=~ + [1

n (

l) ],

we i

~"~

2 (n

so that s n

f

(in

find that

+ C- p.]

+ 1)

2

'

4 (n

+ 1)

the former sense) approaches the value

'

:

-^

By this very obvious process of taking the arithmetic mean, we have accordingly managed, in a perfectly accurate way, to give a meaning

to Euler's

paradoxical equation

11 +

1

--[-... =

--.,

to

General remarks on divergent sequences.

59.

associate with the series on the

hand

left

side

461

number

the

^

as

its

LI

number from

or to obtain this

"value",

always equate the

of a calculation

result

final

whenever

to

l)

(-

,

expansion

so; in the case of

_ j\n /

-~

--^i ~~

x

1

for

= 2xn x = 0,

=

x

for

is

it

described above

We

c s n

__

'

tend to a limit will

>

The

+ --

s

be said

and a great association of

.

+

... ----*~

*i -f

make

this

strated in connection with

new the

Two

reasonable.

2(

new

this

.

9

'

"

series

,

sum

which seems

-=-, j

remarks

further

de-

has already been demonn which now becomes l)

definition

series

convergent "in the new sense", with the thoroughly vantages of

,

__ ~~

,

the following

in the previous sense, the sequence (S M ), or to "converge" to the "limit", or "sum", s.

suitability of

may

Lt

"reasonable"

SQ

as

9

might therefore, as an experiment, If, and only if, the numbers

finition.

2 an

is

certainly

obtained in the manner

with the value

1, ...

is

equally true,

fairly bimple means (cf. Exercise 200); more evidence can be adduced to show that the

1,0,

it

1,

be shown by

the sequence 1, 0,

ap-

cannot of course be determined off-hand.

In the case of the

deal

it

Ct

n

foim

pears in the

Whether we can

the series.

will

the

illustrate

ad-

definition:

in the former sense and of (s n ), convergent so constituted, in virtue of Cauchy's theorem 43, 2, that it would also have to be called convergent "in the new sense", with the same limit s. The new definition would therefore enable us to accomplish at least all that we could do with the former, while the

Every sequence

1.

limit s,

is

example of the

series

n l)

-Z*(

shows

new

that the

definition is

far-reaching than the old one. 2.

two

If

series,

convergent in the

2bn = B, are multiplied together by 2cn E 2(a Q bn + !&-.! H-----t-0n

old

Cauchys

sense,

=A

and

rule, giving the series

we k now

fy))>

-2*0 n

more

tli at

mis

series

is

not necessarily convergent (in the old sense). And the question when c n does converge presents very considerable difficulties and has not been satisfactorily cleared up so far. The second proof of theorem 189, 9

From

--

the series (see above) for -

duce the value

~2

somewhat more therefore l

+O

for

o

x

=

1

carefully, l

+ l+O

We

.

is

have only

1 4- 0-a;

l+H-----

also

^

we can

accordingly de-

to observe that the series, written

x-

-\-

for

a;

X9 +

=

J

f

0#

l

a;

5

-f--l

--

,

and

is

Chapter XIII.

4:62

Divergent

series,

however, shows that in every case

C

2c

partial sum of n . The meaning of this is n denotes the n that <Scn always converges in the new sense, with the sum AB. Here situation which, the advantage of the new convention is obvious:

if

th

A

the insuperable difficulties involved, it was impossible to owing clear up as long as we kept to the old concept of convergence, may be dealt with exhaustively in a very simple way, by introducing a to

slightly

We

more general concept of convergence. shall very soon become acquainted with other

investigations

however, we shall (see make some definitions relating to several fundamental matters: Besides the formation of the arithmetic mean, we shall become acquainted with quite a number of other processes, which may with success be substituted for the former concept of convergence, for the purpose of associating a number s with a sequence of numbers (s n ). These processes have to be distinguished from one another by suitable of this kind

61 in particular);

first

of

all,

In so doing it is advisable to proceed as follows: The former concept of convergence was so natural, and has stood the test so well, that it ought to have a special name reserved for it. Accordingly, the expression: "convergence of an infinite sequence (scries, If product, .)" shall continue to mean exactly what it did before.

designations.

.

.

by means of new rules, as, for instance, by the formation of the arithmetic mean described above, a number s is associated with a sequence (s n ), we shall say that the sequence (s n ) is limitable* by that process, and that the corresponding series 2a^ is summable by the process, and

we shall call s the value sum also). When, however, as

of either

will

case of the series,

(or in the

we

occur directly,

are

making use

its

of

several processes of this kind, we distinguish these by attached initials 10 . shall say A, B, . ., F, ., and speak for instance of a F- process .

.

that the

We

.

sequence

(s n )

is

limitable

F, and that the series 2a n is summ be referred to as the Flimit of the

F; and the number 5 will sequence or Fsum of the series; symbolically able

F-lim s n ==

When

there

is

no

s,

V-2a n

fear of misunderstanding,

=s

we may

* German: hmitierbav. In the case of the concept of integrability similar and it was prob.ibly in this connection that was first introduced. 'Ihus we say a function is according as we are referring* to integrability in 10

sense.

.

also express the

the situation is somewhat the above type of notation integrable /? or integrable L Riemann's or in Lebesgtte's

General remarks on divergent sequences,

50.

463

former of the two statements by the symbolism

which more precisely implies that the new sequence deduced from the F-process converges to

(sn )

by

s.

When, as will usually be the case in what follows, the process admits of a &-fold iteration, or can be graded into different orders, we attach a suffix and speak of a V^-limitation process, a V^-summation process, etc. In the construction and choice of such processes we shall of course not proceed quite arbitrarily, but we shall rather let ourselves be guided by questions of suitability. We must give the first place to the fundamental stipulation to be

made

in this connection,

We

must not contradict the old one. proccss which

may be

namely that the new

definition

accordingly stipulate that any

F-

introduced must satisfy the following permanence

condition : I. Every sequence (s n ) convergent in the former sense, with the must be limitable V with the value s. Or in other words, lim sn

limit

=s

in every case imply

u F-lim s n

s,

must

s.

In order that the introduction of a process of this kind may not be superfluous, we further stipulate that the following extension condition

At

II.

must

to hold:

is

least

one sequence new

be limitable by the

Let us

call

the

particular process the that

implies

wider range

totality

(sj, which diverges in the former sense, process.

of sequences which are of this process.

range of action

limitable

The

by a

condition

II

only those processes will be allowed which possess a of action than the ordinary process of convergence. It

precisely the limitation of formerly divergent sequences and the of formerly divergent series which will naturally claim the greater part of our attention now.

is

summation

employed together, say a V- process and a HP- process simultaneously, we should be in danger of hopeless Finally,

confusion

if

if

several processes are

we

did not also stipulate that the following compatibility

condition should be

fulfilled:

one and the same sequence (s n) is limitable by two different simultaneously processes, applied, then it must have the same value by both processes. In other words, we must in every case have III.

//

= W'\ims n

11

We

,

if

both these values exist.

if some convergent sequences at least are by the process considered. This is the case e. g with the E - process discussed further on, provided the sutfix p is complex f

might also be

satisfied

limitable with unaltered value

263.

464

Chapter X11I. Divergent series.

We

shall only consider processes which satisfy these three con Besides these, however, we require some indication whether the association of a value 5 with the sequence (sj effected by a parti-

ditions.

is a reasonable one in the sense explained above Here widely -varying conditions may be laid down, and the

cular V- process

460). processes which are in current use are of very varied degrees of efficiency in this respect. In the first instance we should no doubt require

(p.

that the

elementary rules of the algebra of convergent sequences (v. 8) should as far as possible be maintained, i. e. the rules for term-by-term

and subtraction of two sequences, term-by-term addition of a and term-by-term multiplication by a constant, and the effect of a finite number of alterations (27, 4), etc. Next we might perhaps require that if, say, a divergent series 2a n has associated with it the value s, and if this series is deduced, e. g. from a power series 2cn xn by substituting a special value X L for x, then the number 5 f(x) should bear an appropriate relation to f(x^) or to Mmf(x) for x^x^\ and similarly for other types of series (Dirichlet series, Fourier series etc.). In short, we should require that wherever this series appears as the final addition

constant,

=

result

a

of

calculation,

the

The

should be s.

result

the

greater

number similar to the above which are satisfied by a us call them the conditions F, without taking let 264. particular process to formulate them with absolute precision and at the same pains the the of the of action time, greater range process, the greater will be its usefulness and value from our point of view. We proceed to indicate a few of these processes of limitation of conditions

which have proved

205.

v

The Cr

their

H^

worth in some way or another.

or Af-process 12 As described above, 262, we form the arithmetic means of the terms of a sequence (sn ): 1.

,

.

9

0.1.2,...)

which we

will denote

mn

by cn\ h n ', or

.

If these tend to a limit s in

when n -> oo, we say that (sn ) is limitable or limit able Af with the value s and we write

the older sense,

limitable

H

l

Af-lim s n or use the letters

sums

sn

will

summable

Cx

or

H^

be called Af, and

The sequence simplest convergent

=s

M

or

summable C

s will

of units

be called 1,

1,

sequence we

1,

its

l

series

H

l

or

or M-sum.

may be

can conceive.

Z an with the partial

summable

or

C^-, //!-,

...

or

(sn )

M. The

instead of

C

considered to be the

The

process described

above consists in comparing, on the average, the terms sn of the sequence 18

The

choice of the letters

C and

H

is

explained in the two next sub-sections.

465

General remarks on divergent sequences.

59

under consideration with those of the sequence of units: c-n

= -

'

1. n n

=

'

w. n

__

o

+ Si + sn + j+_ + r -f- .

j

.

.

^

This "averaged" comparison of (sj with the unit sequence will be met with again in the case of ihe following processes. The usefulness of this process has already been illustrated above have also seen that it satisfies the two conby several examples. ditions 263, I and II, and 111 does not come under consideration at 60 and 61 it will further be seen that the conthe moment. In

We

F

ditions

irolder's

2.

sequence to their

and

we

also in

(264) are

Hp

fulfilled.

13 If with a . given process f means formed arithmetic the h from just proceed n

process,

we

(s n ),

wide measure or

the

-

mean

"

=

the sequence (h n ") has a limit in the ordinary sense, lim h n $, 14 the sequence sn is limitable Jf2 with the value s. say that By 43, 2, every sequence which is limitable H^ (and therefore if

also every convergent sequence), is also limitable H^, with the value. The new process therefore satisfies the conditions 263, I, III;

moreover,

its

range

is

wider ihan that of the

same II

and

^-process,

for

the series

=o for

instance,

is

summable

HI nor convergent.

In fact,

// 2

sum

with the

we have

.-,

but not

summable

here

and (h n ') == 1, 0,

~,

0,

These sequences arc not convergent. hn

"

*~T

as

i

s

easily calculated.

j!

On

This

0, ....

,

the other hand, the

is

numbers

precisely the value which

one would expect from 1

for

x

=

\9

n

n=0

'

1.

13

Holder, O.i Grenzwerte von Reihen an der Konvergenzgrenze. Math. Ann., Vol. 20, pp. 535549. 1882. Here arithmetic means of the kind described are for the first time introduced for a special purpose. 14

The

H% -2an = s,

rest

//3

of the notation

(s n )-+.s,

etc.

is

formed

but hereafter

in

we

the

same way,

shall

//d -lim $ n

not mention

it

=

s,

specially.

466

Chapter XIII. Divergent

numbers h n

If the take their

"

do not tend to a unique

mean h "n

"

/,

'"

"

J,

I

"*"

1

~*~

*

w

^ 2,

15 or, in general, for />

series.

+

'

*

'

we proceed

limit,

"Z, n //

Cfi

1

*

1

'

'

2'

"

to

*

* *'

mean

the

,,.... between the numbers /* ""^ obtained numbers A^ -> $, for some definite

litnitable

H

at the previous stage; if these new we say that the sequence (s n ) is

/>,

v with the value s. to form sequences which are limitable 9 for any particular easy but for no smaller value of p than this 16 . This, together with given p, that the /^-processes not only satisfy the conditions 263, shows 43, 2,

H

It is

I

but that their range of action

III,

3.

is

conditions F,

Cesaro's process, or the C^-process Q

n ='S^ \ and

^

also, for each k

p ^ 2 than we must again

wider for each fixed

As regards the

for all smaller values of p. 60 and 61. cfer to

17

We

.

first

write

1,

and we now examine the sequence of numbers

18

,<*-

for each fixed k. (s n ) is

some value of

for

If,

limitable

Ck

with the value

In the case of the //-process,

h^ directly in terms of sn this is easily done, for (*)

_ -

n

+

k

,

k,

c^ -> 5, we

say that the sequence

s.

we cannot

obtain simple formulae giving

for larger values of p. In the case of the C-process,

we have

-

1\

+ ,

>

fn \

-

2\

k-i

y

+

k

/*

*i

-

1\

U - 1/ Jm

'

H

= sn and take the Q provided we agree to put h process to be ordinary convergence, as we shall do here and in all analogous cases 15

Or indeed

for

p

^

0)

1,

in future. 16

Write, for instance,

1>

(^

~ 1) )

=

1, 0,

1,0,

1,

... and work backwards to the

values of s n . Other examples will be found in the following sections. 17 Cesdro, E.i Sur la multiplication des series. Bull, des sciences math. 1890. Vol. 14, pp. 114120. 18 The denominators of the right hand side are exactly the values of

obtained by starting with the sequence (s n ) == many of the partial sums s v are comprised in

1, 1, 1,

S.

.

.

.

Thus

,

i.

the

e.

C

volves an "averaged" comparison between a given sequence

sequence.

they indicate fc

(2),

S how

-process again in-

(s n)

and the unit

59.

or

we wish

if

General remarks on divergent sequences.

go back

to

may be proved

This

467

to the scries -i'a n , with the partial

easily

quite

sums

by induction, or by noticing

sn

,

that,

by 102, n=o

n=o so that for every integral k

(i-xy~-

whence, by 108,

we

In the following sections

4.

'

is

^> 1,

lim

and

if

n

we say

sequence (sn )

series

process

= cn

for

2an

with

')

2a n x

real values of x) the limit n x s lim (1 x) n

(for

=

that the series 2Ja n

limit able

is

A

=

2s

->l-0

a;->l-0 exists,

(h n

,

ladius

its

9

is

2Q

summable A,

with the value

A-2a n = the

shall enter in detail into this

AbeVs process, or the A -process. Given a sums sn we consider the power series

the partial

If

.

which becomes identical with the preceding one

also,

^

n =o

the truth of the statement follows 19

s,

A-\ims n

s\

and that

= s.

In consequence of Abel's theorem 100, this process also permanence condition I, and simple examples show that it

the "extension condition" II; for instance, in the n 2( l) already used, the limit for x *1

exists.

Thus

Euler's

paiadoxical

equation

tlis

in symbols:

(p.

case

457)

is

of

the

fulfils fulfils

series

again justified

19

In view of these last formulae, it is fairly natural to allow non-integral values k also. Such limitation processes of non-integral order were first consistently introduced and investigated by the author (Grenzwerte von Reihen bei der Annaherung an die Konvergenzgrenze, Inaug.-Diss., Berlin 1907). We shall however not enter into this question, either here in the case of the C-process, or later itfi that of the other processes considered. 20 n If the product (1 x) 2sn x is written in the form

>

we

1

for the suffix

see that it unit sequence

is

again an "averaged" comparison of the given sequence with the is involved, though in a somewhat different manner.

which

468 by

Chapter XIII.

this

we now

If

process.

use the

-

more

precise form

c^c-iy-A.

or

x-^(-i)---J we

series.

Divergent

thus indicate two perfectly definite processes by which the value

may be

w

obtained from the series J?(

l)

.

We

saw

converges, then so does the second, and to the examples show, however, that the second series verge without the first one doing so:

may

5.

process, or the K- process.

Hitler's

the first of the

two

oo

1.

If

c

a n 2= 1, then aQ

=1

&--

and A k a

=

and

-L

H-----

+1

1

the second of which converges to the 2.

for

If,

M

= 0,

then

Simple

quite well con-

&I>1.

for

Accordingly,

for k

^

Aa n = 2

=

A*an

1_ 2 + 3-4

+ O-fO + OH----

sum

1,

2,

3,

- -.

1,

1,

1,

0,

0,

0,

-

4, ..., -

-----

...,

-~+ +

and

-\

1,

0, ----

Accordingly, the t\\o series are

sum

the second of which converges to the

-^

-|

---- .

.

we find <40 = a =12, 7, Similarly for a n = (n + 1) = The two series are thus a =0. for a &>3, 6, and, _ 8 + 27 - 64 + ---- and \ - + ?| - ^ + + + 3

3.

1

same sum.

1, 2, ...,

a n ==

-d

if

two series are 1

and

that

and

^(-l)-. rt=0

the

144

in

series

s

/I

a

fe

zl

-

-J-

the second of

which converges

For a n =2 A aQ = _ ----8 H 2 +4 ! n

4.

to the

k

,

(

1)*.

the second of which converges to the

expect for x 5.

=

2 from

For a n =(

the second of

n l)

z

=Z

j-

n ,

dka

which converges

.

the two series are:

- A + 1 - -I H-----

sum y

i.

-,

o

Thus -L

and

--5-

sum

-

e.

the

,

sum which we should

xn .

= (l +

to the

k

z)

sum

.

-The two series are therefore

1

_

,

provided |j?+ l(

< 2.

59.

we

If

General remarks on divergent sequences.

2a n

with any scries

start

,

without alternately

469 and

~f-

signs, the series

be an Eiders transformation of the given

will

also obtain as follows: for

for

y

y

=

=

.

we

,

x

= \,

The

series

2'a n

results

hence from

Expanding the

latter in

powers of

obtain Eulers transformation.

In order to adapt this process for use with

deviating somewhat from

o+ aiH-----Hn-i = s n It

now

is

We

accordingly

From

In fact

any sequence (sj we

write,

21

'

for

w

^!>

and

So^

for

w^l,

and

V^

for cvvry n

'

-

.2.

the following definition: A sequence (s n ) is said with the value s, if the sequence (s n') just deIf, without testing the convergence of (s n '), we write

make

be limitable E\ fined tends 22 to s. 21

= sn

-----Mn-i

easy to verify that

to

y, before substituting

the usual notation,

and also *o'-!-i'H

which we ma> from the power series

series,

2an x n+l = 2 an f

L-o

/

(2y)

n+1

it

follows,

by

multiplication

by

n-o

Hence

n=0

whence the relation may at once be inferred. 88 Here also the denominator 2" is obtained from

the numerator

by replacing: each of the s n 's by 1. Thus we are again concerned with an "averaged" comparison, of a definite kind, between the sequence (sn ) and the unit sequence.

470

Chapter XIII. Divergent

and

series.

in general, for r ^> 1 ,

^-TrKD^^ + ffl-^+'-' + C)^" we

shall

say

similarly

as

s

regard

Er

its

-

that

the

if,

for a

limit,

Our former theorem 144

sequence

1

(0,1,2,...). *]; is

(s n )

limitdble

>s. particular r, s^ also then shows 44, 8) (see

Er

and

in

any

case that this E- process satisfies the permanence condition I, and the examples given there show that the condition II is also satisfied. This

process will be examined further in

or

JRfesz's

6.

the

Jf^- process

process, of averaged comparison

principle

63.

of the

23 .

sequence

For

making

the

with the unit

(s n )

a principle which, as we saw, lies at the sequence more powerful, a fairly obvious pro of all the former limitation projesscs, cedure consists in attributing arbitrary weights to the various terms s n basis

.

If

/z

/z 2 ,

/x 1 ,

,

.

.

.

denote any sequence of positive numbers, then

_ Mo is

+

Ml

a generalized mean of this kind. of a logarithmic mean.

+

+

-

J"n

In the special case of

/^ n

-,

we speak

As with the ing the

or ^-processes, this generalized method of formof course be repeated, writing, for instance, as in the

//-, C-,

mean may

C-process,

>-, and then,

^

k

for

1

^=1,

and

,

n

and

and then proceeding to

investigate, for fixed

k

^

1,

the ratio

<*)

p

<*>

= "" A

for n

->

Hmitable

+

oo.

24

R

tf>

If these tend to a limit

/Jk

with the value

s.

5,

This

we might

say that

however,

definition,

(s n )

was

is

not

The

process in question has reached its great importance only by being transformed into a form more readily amenable to analysis, as in use.

23

M. Sur les series de Dirichlet et les 909912. J909. Here we add a suffix /* to R k the notation Riesz,

:

series entieres.

Comptes rendus

Vol. 149, pp.

24 of the process, as a reference to , the sequence (/in ) used in the formation of the mean. For U = 1, this process reduces exactly to the C^-process. \JL

69.

A

follows:

471

General remarks on divergent sequences.

(complex) function

of the real variable

s (t)

/

^

defined by

is

A^

= 0)

with s(0)

= 0;

and

natural to substitute repeated integration for the repeated

sum-

s(t)

it is

=s

v

A^ < t^ A^

= 0,

(1)

in

(v

1, 2,

.

.

tegration

;

then

mation used in the formation of the numbers cr^ and A*\ a5

.

A

A-ple in-

gives

000 (ft) instead of an (fc) Similarly, instead of the numbers An , we have to 1 in the integrals take the values which we obtain by putting sn i. e. written down, just .

=

We

should then have to deal with the limit (for fixed k)

A

lim

If

this limit

-K**

exists

with the value

and

=

s,

the sequence (s w ) will be called

limitdble

s.

Here we cannot enter question whether the two

into

a more detailed examination of the

given for the R^- process are the or into elegant and far-reaching applireally exactly equivalent, cations of the process in the theory of Dirichlets series. (For referdefinitions

ences to the literature, see 266.) 7.

Riesz'

.Borel's process,

process

tends to

We

/J- process. have just seen how increase the efficiency of the H- or C- pro-

or the

by substituting for the method of averaged comparison between the sequence (s n ) and the unit sequence a more general form of this procedure. The range of Abel's process may be enlarged in a similar way by making use of other series instead of the geometric series there used for purposes of comparison. Taking the exponential series as a particular case, and accordingly considering the quotient of the two series cesses,

>

oo

4* X

2s n -, n n=0

and

-

25

The equality

gration by parts.

of the

two sides

is

~n

27

ni n-0 J.

easily

proved by induction, using

inte-

Chapter XIII.

472 that

Divergent series,

to say, the product

is

n=o for

n wl

x *4-oo> we obtain the process introduced by

accordance with such

the

that

it

we make

power

series

A

the following definition: xn

^

sn

converges

Borel 29

ZT.

s=

n

once more; then Accordingly

2(

or odd.

sn

l)

y and we have

=1

sum

is

evidently

.

-^

Thus

2

n

is

even

,

n l)

(

an

generally, taking

=

is

summable

n

we

z

>

B

with

the

have, provided only

that * 4. -f 1,

and

-

when x

which

+-

series

2 zn

is

summable

5ft (-s)

<

1.

plane

27

This process also

If

-j-oo, provided $l(z)

B

with

satisfies the

* 5 in the ordinary sense,

5 "n

the

sum

=

< --

^

77w/s

1.

geometric

throughout the

half-

permanence condition; for we have

we can

for

any given

e

choose

m so

28 Sur la sommation des series divergentes, Comptes rendus, Vol 121, p. 1125. and in many Notes in connection with it. connected account is given 1895, in his Lecons sur les series divergentes, 2 nd ed., Paris 1928. 27 By the C-processes, as shewn in 268, 8, the geometric series is summable,

A

beyond z < 1, only for the boundary points of the unit by Enters process it is summable throughout the circle z |

\

|

circle, -f-

1 |

-f-

<

1

2,

excepted;

which en-

closes the unit circle, with a wide margin; by Borel's process it is summable in the whole half-plane 9ft (z) the value in this and the preceding cases being every1,

<

where

.

__

.

>

extent, let us first take

or 0, according as

to deal with the limit

More

.

-jr

some

e e ~* -4-.=^ *+

+

i-L.

lim e~*--

which

* -f"

B

In order to illustrate the process to

2an

(s w )

everywhere and the

function F(x) just defined tends to a unique limit s as # with the value s.

will be called Hinitable

In

.

sequence

General remarks on divergent sequences.

59.

large that hand side

<

> m.

s \z for every n then in absolute value

sn

|

is

<:

\

r-

in

.

J7J

-t\.*g e~*

The

*.

.

473

expression on the right

*"

|

J7J

+*

the product of e~ x and a polynomial of the w th so large oo we can therefore choose when x ~> For these #'s the whole exs for every x that this product is e in absolute value, and our statement is established. pression is then 8. The J5r -process. The range of the process just described is, in

Now

for positive #'s. degree tends to

+

;

<

>

.

<

a certain sense, extended

instance 27

>--y

say,

,

(

by substituting other series for 1. where r is some fixed integer

a sequence (sn ) of the two functions say that

00

and

n-O

>

(

!

is

27

%-:, n-o( rw > ,

i.

s

when # ->

fi-process, for instance,

x sn

^

=

27

r

with the value

the product

e.

oo .

Le

r,

(

accordingly

r e~x

is

rn

x 2 sn 7rw -^ ^i

n-0

>

(

1

(We must,

=

x n does not converge

n (

the quotient

s if

is

l)

x rn

the series 27 s n

We

of course, assume again everywhere convergent.) Thus the n for the sequence sn useless ( quite l) n !, -j-

here that the first-named series

since here

B

limit able

!

tends to the limit

in the first

>

rn

xrn

27 sn 7^-. rn

27*-,,

already converges everywhere

28

for every x\

when we

whereas

take r

2.

We

have usually interpreted the limitation that of them we carry out an "averaged" means saying by processes by between the given sequence (s n ) and the unit sequence 1, 1, comparison look the matter in a slightly different way. If the numbers at 1, ... may 9.

jRoy's process.

We

sn

are the partial

in the

sums of the

C x -process,

series 27

a n> we have to examine, for instance

the limit of

+ *i

*

Here the terms of the

4-

.

.

.

+ sn

appear multiplied by variable factors which a reduce the given series to finite sum, or at any rate to a series convergent in the old sense. By means of these factors, the influence of distant terms is

series

destroyed or diminished;

and thus ultimately involve is

yet as n increases all the factors tend to 1 the terms to their full extent. The situation

all

similar in the case of Abel's process, where we were concerned with n for x -> 1 0; here the effect described above is n x

the limit of

2a

28 This does not mean that the the B-process for every sequence (sn ). are hmitable but not limitable a.

B

B

#r -process On

(r > 1) is more favourable than the contrary, there are sequences that

474

Chapter XIII. Divergent

series.

n brought about by the factors x which, however, increase to 1 as x -> 1 This principle appears most clearly as the basis of the following process ,

The

0. 29

:

series

n=0 is

assumed convergent

^x<

for

R

be called summable

the function which

If

1.

in that interval tends to a limit 5 as

>1

#

0, the series

it

defines

Sa n may

to the value s.

This method is not so easily dealt with analytically, and for this reason it is of smaller importance. It will 10. The most general form of the limitation processes. far all so described that the been noticed have processes belong es-

two types: In the case of the

sentially to 1.

help of a matrix

type, from a sequence theorem Toeplitz 221)

(cf.

first

**o*o

+

with the

r=(
a new sequence of numbers *'

(s n),

*ii H-----

M

5n

ft

+ -">

(A

= 0,

1,

2,...)

formed by combination of the sequence s s^j..., s n ... with the the assumption being, of .. successive rows a k0 a kl ..., a fcw hand side the on the series that right course, represents a definite

is

,

,

,

.

,

,

,

(sn )

30 The sequence SQ ', s x', . . . , convergent (in the old sense) will be called for short the T- transformation 31 of the sequence . and its n th term, when there is no fear of ambiguity, will be denoted

by

T (sn

value, s h ',

.

e. is

i.

.

.

limit

).

If

the

accented

the given sequence

s,

symbols

said to be

:

TMim 29

is

Le Roy: Sur

f

sequence

sn

=s

(sk )

is

limitable

or

T(s w)

convergent

T 'with +s

with

the value

s.

the

In

.

divergentes, Annalcs de la Fac. des sciences 1900. * If each row of the matrix T contains only a finite number of terms, this condition is automatically fulfilled. This is the case with the processes 1, 2, 3 and 5. ft 31 The series aj/9 of which the sk s are the partial sums, may similarly a n with the sn 's as its partial be called the T- transformation of the series sums. Thus e. g. the series

de Toulouse

(2),

Vol.

les

series

2, p.

317.

2

2

In this sense, all T-processes is the Cj- transformation of the series 2 an give more or less remarkable transformations of scries, which may very often he of use in numerical calculations. (This is particularly the case with the E -process). The transformation of the series may equally, of course, be regarded as the primary process and the transformation of the sequence of partial sums may be deduced from it. Indeed it was in this way that we were led .

to the

E- process.

General remarks on divergent sequences.

69.

475

It is at once clear that the processes 1, 2, 3, 5, and the first one described in 6 belong to this type. They differ only in the choice of the matrix T. Theorem 221, 2 also immediately tells us with what matrices

we

are certain to obtain limitation processes satisfying the

condition

permanence

32 .

In the case of the second type, we deduce from a sequence by combining it with a sequence of functions > 9 (9w) = 9o (*)> 9i (*)> 9n (*)> 2.

(s n ) 9

the function pi / M\

fn

f*A\ O

\

/

I

/

I

|

\ |

where we assume, say, that each of the functions

>

>

,

=

t

x->+v>

the sequence (sn ) will be called 33

By analogy with 221,

2,

limitable cp with the value s. we shall at once be able to assign

conditions

under which a process of this type will satisfy the permanence condition. This will certainly be the case if a) for every fixed n, -

lim 9 n (x) if

0,

b) a constant K. exists such that I

for every

x

>X

Q


and

I

+


I

all rc's,

and

I

+

if c)

.

for

+

I

x ->


+

(*)

I

< K.

oo

KmIt will

tions

34

be noticed that these conditions correspond exactly to the assumpa), b) and c) of theorem 221, 2. The proof, which is quite analogous

to that of this theorem,

may

therefore be left to the reader.

Borers process evidently belongs to

The same may be

said

this type,

of Abel's process,

if

with

ep n

(x)

the interval

= e"x ^. + oo .

.

.

The importance of theorem 221, 2 lies chiefly in the fact that the conditions a), b) and c) of the theorem are not merely sufficient, but actually necessary cannot enter into the question (v. p. 74, footnote 19), for its general validity. but we may observe that in consequence of this fact, the T-processes whose matrix 32

We

satisfies

the conditions mentioned are the only ones which

fulfil

the permanence

condition. 33 In all essentials this is the scheme by means of which O. Perron (Beitrage zur Theorie der divergenten Reihen, Math. Zschr. Vol. 6, pp. 286 310. 1920) classifies all the summation processes. 34 Like these they are not only sufficient, but also necessary for the general validity of the theorem. Further details in H. Raff, Lineare Transformationen beschrankter integrierbarer Funktionen, Math. Zeitschr, Vol. 41, pp. 605 629. 1930.

476 is is,

Chapter XIII. Divergent

projected into the interval n if the series sn x (1 x)

...

2

is

1 which

series.

is

used

in

the latter, that

replaced by the series

In an equally simple examined for x+-{-oo. that be seen Le manner, may Roy's process belongs to this type. The second type of limitation process contains the first as a parobtained when x assumes integral values ticular case, only e mere ly use a continuous parameter in the one case, a kn) dpn (k) and a discontinuous one in the other. Conversely, in view of 19, def. 4 a, the continuous passage to the limit may be replaced by a discontinuous one, and hence the ^-processes may be exhibited as a sub-class of the T- processes. These remarks, however, are of little use: in further methods of investigation the two types of process nevertheless remain essentially different. It is not our intention to investigate all the processes which come under these two headings from the general points of view indicated above. Let us make only the following remarks. We have already pointed out what conditions the matiixTor sequence of functions (cpn ) must fulfil, in order that the limitation process based on it may satisfy

and the

latter

is

it

~

the

and

u

^

^

permanence condition 263, I. Whether the conditions 263, II III are alo fulfi led, will depend on fuither hypotheses regarding

matrix T or sequence (9^,); this question is accordingly be t left a separate investigation in each case. The question as to the extent to which the conditions F (264) are fulfilled, cannot be attacked

the to

in

a general way either, One important

process.

but

must be

property

examined for each con.mon to all the T-

specially

alone

is

and (^-processes, namely their linear character: If two sequences (s n ) and (tn) are limitable in accordance with one and the same process, the first with the value s, and the second with the value t, then the sequence (asn -{- btn ), whatever the constants a and b maybe, is also limitable by the same process, with the value as-\-bt. The proof follows immediately from the way in which the process is constructed. Owing to this theorem, all the simplest rules of the algebra of con-

(term-by-term addition of a constant, term-by-term a constant, term-by term addition or subtraction of multiplication by two sequences) remain formally unaltered. On the oth^r hand, we must expressly emphasize the fact that the theorem on the influence of a finite number of alterations (42, 7) doe> not necessarily remain valid 35

vergent sequences

.

35

For this, the following simple example relating to the B-process was given by G. H. Hardy: Let sn be defined by the expansion 00 xn sin(e*)

= H

n-Q x $ince e~

sin (tF) ->

as

x ->

+

oo ?

sn

n

. '

the sequences s0t

slt j

?>

.

.

f

is

first

59.

we wished

General remarks on divergent sequences.

a general and

477

complete survey of the we should now be theory present a the processes which enter into more of to detailed investigation obliged we have described. To begin with, we should have to deal with the If

to give

the

of

state

of

fairly

divergent

series,

do and 264; we should have to obtain necessary and sufficient conditions for a series to be summable by a particular process; we should have to find the relations between the ways in which the various processes act, and go further into the whether,

questions

and

to

what

actually satisfy the stipulations

the individual processes

extent,

2G3,

II, III

questions indicated in No. 10, etc. Owing to lack of space it is of must be course out of the question to investigate all this in detail. content with examining a few of the processes more particulary;

We

we choose will

the H-, C-, A-, arrange the choice

so

questions and

At the same time we

and E- processes. of

subjects

that

as

as

far

possible all the com-

methods of proof which play a part at least be indicated. theory may

plete

For the

in

all

rest

we must

refer to the original papers, of which we may mentioned in the footnotes of

men-

tion the following, in addition to those section and of the following sections: 1.

The

following- give a general survey of the

Borel, E.:

Lecons sur

Bromwich,

T. J. PA.ed. 1926.

this

group of problems: Pans 1928.

ld les series divergentes, 2 ed.,

An

introduction to the

theory

of

infinite

series.

London 1908: 2 nd

Hardy. G. H., and S. Chapman A general view of the theory of suramable Quarterly Journal Vol. 42, p. 181. 1911. Chapman, S.: On the general theory of summability, with applications to 1911. Fourier's and other series. Ibid., Vol. 43, p. 1

series.

Carmichael, R. D.:

General aspects of the theory of summable series.

American Math. Soc. Vol.

Bull, of the

25, pp.

97131.

1919.

K.: Neuere Untersuchungcn in dcr Theorie dor divergenten Reihen. Jahresber. d. Deutschen Math.-Ver. Vol. 32. pp. 4367. 1923.

Knopp 2.

A

considered

t

more in the

detailed account of the l?^*- process, following sections, is given by

Hardy, G. H., and M. Riesz.

Cambridge 1915. The B- process mentioned under

1.,

is

with

dealt

and also

in

more

Hardy G. H.: The application method of summation. Proceedings ,

to 320.

The general theory the

in

detail

i

books by Borel by

Lond. Math. Soc.

not specially

Dirichlet's

and

to Dinchlet's series of Borel's

of the

By

differentiation of the relation above,

n=0 s

of

is

series.

Bromwich exponential

(2) Vol. 8, pp.

301

1909.

w.th the value 0.

shows, since cos (e*) tends to no limit 5i. *a> is wo/ limitable B at all!

this

which

-

when

we

obtain

nt as

*

+ OO,

that the sequence

478

Chapter XIII.

Divergent

series.

Hardy. G. //., and /. E. Littlewood: The relations between Borel's and Cesaro's methods of summation. Ibid., (2) Vol. 11, pp. 116. 1913.

Hardy, G.

and

//.,

E. Littlewood: Contributions to the arithmetic theory 411478. 1913.

/.

Ibid., (2) Vol. 11, pp.

of series.

Hardy, G. H., and /. E. Littlewood: Theorems concerning the summabilitj by Borel's exponential method. Rend, del Circolo Mat. di Palermo r

of series

3653.

Vol. 41, pp.

1916.

neue Verallgemeinerung der Borelschen Summabilitats-

Doetsch, G.: Kine

Inaug.-Diss., Gottingen 1920.

theorie.

Apart from the books mentioned under is to be found in

3.

1.,

a

full

account of the theory

of divergent series

Neuere Untersuchungen liber Funktionen von komplexen d. math. Wissensch. Vol. 11, PartC, No. 4. 1921.

Bieberbach, L.:

Variablen.

is

Enzyklop.

4. Finally, the general question of the classification of limitation processes dealt with in the following papers:

Vol.

Math. Zeitschr.

Perron, O.: Beitrag zur Theorie der divergenten Reihen. pp. 286310. 1920.

6,

Hatisdorff, F.

:

Summationsmethoden und Momentenfolgen and p. 280 seqq. 1920.

I

und

II.

Math.

Zeitschr. Vol. 9, p. 74 seqq-

1st

Knopp, K.: Zur Theorie der Limitierungsverfahrcn. Math. Zeitschr. Vol. 31; communication pp. 97 127, 2nd communication pp. 270 305. 1929.

60 The Of

all

section, the

C- and /^-processes.

the summation processes briefly sketched in the preceding C- and /^-processes and especially the process of limitation

arc by arithmetic means of the first order, which is the same in both their distinguished by great simplicity; they have, moreover, proved of in most diverse applications. We shall accordingly the great importance first examine these processes in somewhat greater detail.

In the case of the //-process, Cauchy's theorem 43, 2 shows

267. for

p

^

1^

1,

h^~

->

s

3e

implies

h^ -> s,

contains that of the //p. ^process. case of the C-process:

Theorem it is

it

1.

also limitable

follows that c

36

(

If a sequence

Ck ->

s.

is

that,

so that the range of the //^-process

The

corresponding fact holds in the

limitable

with the same value.

Ck ^ l

with the value

In symbols:

From

s t (k *~

^

1),

(Permanence theorem for the C-process.)

Cf. p. 466, footnote 15.

degrees of which are introduced,

By the Oth degree of a transformation, we mean the original sequence.

higher

60.

Proof.

The C- and H-processes.

265,

definition (v.

By

3)

s

s<*

whence by 44, 2

479

the statement immediately follows.

to every sequence which is limitable C , for some there corresponds a definite integer k such that the p, the sequence sequence is limitable C but is not limitable C fc-1 (If of course take k is convergent from the first, we then say 0.)

Accordingly, suffix

suitable

.

fc

the sequence

that

is

1.

2.

2

(

l)

2

(

l)

of the C^-limitation Process 87 .

summable C4 with the value --.

is

n

is

,

exactly

)

(

268.

summable Q+i,

Proof above, 262.

to the value $

/

\

In fact, for a n

We

. ft

1

n

n=o

C

exactly limitable

Examples 00

=

^(- l)

n

n

( \

K *), /

"j"

=

^k

,

"*"

we have by 265,3

Accordingly

"-M\ )

"

Hence both

for

= 2v

n

or

^

=0, according

as

n = 2y or

/

and for n

=2v+1

>

whence the statement follows immediately. 3.

The

the value

series

,

for ^ -g-

=

2(- 1) (n+ 1)*== 1 - 2*+ 3*-4*+ ---- summable C^ = 0, by Example 1., is for each k> 1 exactly summable C

fc

^t+ii if Bv denotes the yth o f Bernoulli's ^4- 1 The fact of the summability indeed follows directly from Example 2. moment denoting the series there summed by 2^, we at once see, linear character of our process (v. p. 476), that the series, obtained to the

sum

s

r

:

to

+1

numbers.

For the from the from 2^

As a result of the equivalence theorem established immediately below On account A limitation processes. examples he'd unaltered for the of the explicit foimulae for and in 265,3, to which there is given S^ GJf\ no analogue in the H- process, the C- process is usuallv Dref erred. 37

these

H

480

Chapter XIII. Divergent

series,

by term-by-term addition, of the form is exactly summable Cfc c k denote any constants, with ck =f= 0. , +l if c0t c^ n the c v may obviously be chosen so that we obtain precisely the series S ( l) (n The value s is most easily obtained by ^-summation see 288, 1. .

.

Now

.

+

l)

fc .

;

1

2

the

sum

^

provided x

0,

Proof.

2 k n.

By 201, sin

x

o 4- cos

sn

x

-f cos 2

+

.

.

.

nx

4- cos

= 2 sin

for each w

=

0, 1, 2,

.

.

.

hence

;

x ~

(

Oi.l

sm 3^xo

+

sin

+

#\

.

.

.

.

-f-

sin (2n

1)

-f-

sin* ~

_

("4\ 1)* '

TT

J

'

9

elr|2

4

and consequently .

.

_

+

__

__

i-+~

n+l

2smS

*_

as n increases, which For a fixed x 4= 2 & TT, the expression on the right tends to This is our first example of a summable series with proves what was stated. in every interval not variable terms. The function represented by its "sum** containing any of the points 2 k IT. At the excluded points, the series is definitely

divergent to -f oo 5.

The

!

the

sum

0, for

d,

and

it

x

then

k

38

"sum"

has the

== sin

fn

.

ir.

From

Proof.

x -f- sm 2 # 4- sin 3 x -f is obviously convergent with For x 4= k n it is no longer convergent, but it is summable

sin

series

x

cos x

4

cos 3

7.

sin

#

+

sin 3

8.

4- ...

, *

4

1

4-

z

+

x x

+

zl

z

by separating

4

+

* 1)

1

2

4.

cos 5 x sin

-f-

. . .

4- I real

*-~ -J_1 1 - *

+

is

6x4-...

,

is

is

summable also

C

t

to the

summable

The graph

points 2 k n.

summable C^ on

and the sum

and imaginary so S

that mat

whence the statement can be 38

cos (2 n

--------^

j _ cot

sin n #

C

l

sum

0, for

x

sum

to the

ATT.

cepting only for this

.

o 2sm

6.

**

.

the relation

the statement follows as in

for

cot -*

-*

.

'

+

is

.

-__

+

.

-

+

|

s

= \

-

rt

.

k

TT.

-

,

2 sin * 1,

ex-

(Examples 4 and 5 result from

Here, in

parts.)

*i

the circumference

=N

fact,

*

/i+l inferred at a glance.

of this function thus exhibits "infinitely great

jumps"

at

the

$ 60.

The C- and *

1

9.

The

series

/i v

sum

>i

_

IT^AA~;

^ (\ n (

n the circumference

v\ k

_L

1\

|

z

= |

k)

corresponding quantities S^

are,

_J _

X )k+i

(1

by 265,

L_ xZ

(l-

)

i A

L,

w-0

3,

~ n remains

summable

/ 1,

provided only z

4=

+

1.

C&

to the

For the

the coefficients of xn in the expansion of

= (i

)k

481

^/-processes.

_

X)k+i

4. -T

i

(the right hand side being the expansion in partial fractions of the left hand side). All the partial fractions after the one written down contain in the denominator k+l x z) at most. Hence, multiplying by (1 the & th power of (1 x) or (1 x)

and

letting

where

x

-*- I,

we

at

sufficient to

it is

once obtain a

know

r:

^

.

Accordingly

that the supplementary terms within the square bracket ~l with respect to n at most. Therefore,

involve binomial coefficients of the order n k as

n -*

00,

-f-

*

Since the //-process outwardly seems to bear a certain relationship to the C-process,

able or not.

We

it is

natural to ask whether their effects are distinguish-

shall see that the

two ranges of action coincide completely. 39 and to W.

Indeed we have the following theorem, due to the author Schnee* :

Theorem to the value

symbols

2.

s, it is

If a sequence also

summable

Ck

:

h^ -> s and

H

41 k for some particular k, limitable to the same value s and conversely. In

(s n ) is,

always involves

c^ -> s

,

(Equivalence theorem for the C- and It-processes.) 42 proofs have been given for this theorem , among which that is probably the clearest and best adapted to the nature of the

conversely.

Many of Schur

43

39

Cf. the paper cited on p. 467, footnote 19. Die Identitat des CV^iroschen Schnee, W. Math. Ann. Vol. 67, pp. 110125. 1909. 40

:

41

Since for k

42

A

be found

und Holderschen Grenzwertes.

^

1 the theorem is trivial, we may assume k 2 in the sequel. detailed bibliography, for this theorem and its numerous proofs, may in the author's papers: I. Zur Theorie der C- und H-Summierbarkeit.

Math. Zeitschr. Vol. 19, pp. 97113. 1923; II. Uber eine klasse konvergenzerhaltender Integraltramformationen und den Aquivalenzsatz der C- und H-Verfahren, ibid. Vol. 47, pp. 229264. 1941; III. Uber eine Erweiterung des Aquivalenzsatzes der C- und H-Verfahren und eine Klasse regular wachsender Funktionen, ibid. Vol. 49, pp. 219255. 1943. 43 Schur, /.: (Jber die Aquivalenz der Oftiroschen und Hdlderschen Mittelwerte. Math. Ann. Vol. 74, pp. 447 458. 1913. Also: Einige Bemerkungen zur Theorie der unendhchen Reihen, Sitzber. d. Berl. Math. Ges., Vol. 29, pp. 3 13. 1929.

269.

482

Chapter XIII. Divergent

Combined with

problem.

becomes

series.

a skilful artifice of A. F. Andersen

44 ,

the proof

particularly simple.

We

next show that the equivalence theorem

contained in the

is

fol-

lowing theorem, simpler in appearance:

Theorem

270.

2a.

If (z n ), for k

^

1, is '

sequence 270 of the arithmetic means zn able and conversely. k _ l with the value

C

By

Ck

limitable

=

with the value

+

-O-i^

1

_

,

the

:JL+_^

,

this

theorem, each of the k relations

a consequence of any of the others; in particular, the first is a consequence of the last. But that is what the equivalence theorem states. It suffices, therefore, to prove Theorem 2 a. But this follows immediis in fact

C

from the two relations connecting the K - and C^^-transformations of the sequence (z n ) with those of the sequence (z n ') viz. ately

y

(I)

Ck (zn ) = k C^ (zn

')

- (A-l) Ck (*'), n

For

if,

in the first place,

have also

Ck (zn ') -+

t>.

Hence by

Cafo.) If,

in the second place,

Ck_i (zn

we have

')

->

(

j f

^,

then,

by rheorem

1,

we

(I),

-**-(*-!)=.

Ck (zn ) ->

,

then,

by 43,

2,

so

do the arithmetic

means

and, with equal ease, (II) provides that

and

45

Accordingly all reduces to verifying the two relations this may be done for instance as follows:

(I)

and

(II),

44 Andersen, A. F.: Bemerkung zum Beweis des Herrn Knopp fur die Aquivalenz der Cesdro- und //o/^r-summabilitat. Math. Zeitschr. Vol. 28, pp. 356 359. 1928.

M

46 If denotes the operation of taking the arithmetic mean of a sequence, the above relations (I) and (II) may be written in the short and comprehensive form

(I)

(II)

Ck = k Ck _! M - (k - 1) C M, Ck = k Ck_! M-(k-l)M Ck

Each of these follows from the other the process of taking the arithmetic

fc

.

if it is

mean

known

are

*hat the C^-transformation

two commutable operations.

and

The C- and

60.

In 265,

sums S^

the iterated

3,

transformation of a sequence

by

S^

(s),

483

//-processes.

were formed, to define the

Let us denote these sums more precisely

(s n ).

and use the corresponding symbols when

The

sequences.

C&-

starting with other

identity

then implies

+

k

2

+

k

1

n

Here write

i>

+ 1 = (n + k)

(n

v

i/),

and observe that in

It

+

k

A

2

-

.

,

,

/7

(n

T N

+

k

1

then follows further that

^

(*)

(*)

w

Dividing by

On

f

,

J,

= (* + *) S^*we deduce

1'

(-')

-(*-

once the relation

at

(I).

the other hand, by the definition of the quantities

Sn (

,

we have .

Substituting in

(*),

we

sf? (*)

(**)

and hence, dividing by

Ck

(arn )

get -J-

(

1)

^

(-')

-

(

+ *) s^ (*'),

" (

=

Substituting in turn 0, 1,

k

J,

+

( .

.

.

,

Ck (.') - n C

1)

A

n for n in

(y_i).

this relation,

and adding, we

obtain finally

Ck (*) + Ck (*J + w 4-

Put into words,

.

.

.

+ Ck

(xr n )

l

=

^fc().

this relation signifies that the arithmetic

mean

of the

Cfc

C

transformations of a sequence is equal to the -transformation of its fc arithmetic means, or, as we say for short, the C^-transformation and the process of forming the arithmetic *6

Cf. preceding footnote 45.

mean

are

two commutable operations

4d .

Chapter XIII.

484

Now

series.

Divergent

Ck (zn ) f

we

in (I) tue expression just found, we obtain (II) at once. This completes the proof of the Equivalence Theorem. After thus establishing the equivalence of the C-process and the //-process, we need only consider one of them. As the C-process is easier if

work with

to

the

on account of the

analytically,

it is

S^'s,

substitute for

explicit

usual to give the preference to

formulae 265, 3 for

it.

We

next inquire how far its range of action extends, i. e. what are the necessary conditions to be satisfied by a sequence in order that it may be limitable Ck Using the notation, which was introduced by Landau .

and has been generally adopted, x n sequence

(

is

*JM

xn

bounded, and

O (w a

--

a

o (w

)

),

a real, to indicate that the

to indicate that (*%\

is

a null

47

we have the following theorem, which may be interpreted by that saying sequences whose terms increase too rapidly are excluded from A -limitation altogether: sequence

,

C

271.

Theorem

j

2 a n with partial = o (n k and k = 0, the statement

3. If

sn

)

Proof. For which we are generalizing.

1,

sums

,

an

is

^

For k

s nj is

= o (n k

summable

Ck

,

then

).

a consequence of Theorem 82, ], with the notation of 265, 3,

the sequence of numbers o^*" 1

c<*)

is

(n

+

\

k

Since (

convergent.

n

+

)

i

k\

o< 4 -*)

i

n

+

k

k

* ~~

l

\

~ (n

"t

*),

the sequence

cn is

convergent, with the same limit.

viz.

S*'

1

1

/^

*"*)'

and similarly

k

l)

).

two quotients,

difference of the

As

therefore forms a nul1 sequence.

It S^~ = o (n s (k-2) = S (k-l) __ s (k-

this implies that

The

follows that

=

Q

^+

Q

(//fc)

=

Q (n

48

47 The first statement thus implies that the quantities xn are of at moit same order as const. w a the second that they are of smaller order than w a in the way in which they increase to +on. 48 The reader will be able to work out quite easily for himself the very simple rules for calculations with the order symbols O and o which are used here and in |

the

the sequel.

,

\

,

The C- and

60.

The

= o (n k

1)

485

//-processes. just obtained in the

proof may be interpreted as an even more significant generalization of the theorem In fact, it means that in question. intermediary result

S^~

4

)

rn We

accordingly have the following elegant analogue of 82, 1: Theorem 4. In a series a n summable CA we necessarily have

E

C

fc

>

272.

,

-Iim n w

-

0.

Moreover, even Kronecker's theorem 82, 3 has its exact analogue, n: though we shall confine ourselves to the case p n Theorem 5. In a series a n summable C kJ we necessarily have 273.

=

,

+

2 "2

+

f

"

<*n\ <*n

- u.

__

)

In

it

fact,

follows from the corollary to

Sl

CK-I

Ck

T~{~

\ "*"

^A^p^

(-

J

1 - 71

~^

->

that

Subtracting this from

*

)

C\

->

(s n )

involves

s

by the permanence theorem

therefore

anc^

s'

270

Ck (s n ) ~>

we

s,

at

once

obtain the statement

r lim C,-lim

(<

^w

-

- *i

*o

I-

+

+

*n \

|rrr

--

J

/i + r C,-hm 1-

2

2

^

(^

I-

{

.

.

.

H-

;/

an \

_

ft 0.

J

x

of these simple theorems, the range of action of the C staked off on the outside, as we might say, for the theorems inform

By means is

fc

process us how far at most the range

may

extend into the domain of divergent

Where this range properly begins is a much more delicate question. this we mean the following: Every series convergent in the usual sense By to the value s is also summable CK (for every k > 0) to the same value s. Where is the boundary line, in the aggregate of all series which are summable C between convergent and divergent series? On this point we have the

scries.

fc ,

following simple theorem, relating solely to the C^-process:

Theorem 8, s.

=

6.

If the

^i^^^~-^

For

(v.

w

series

->

Q,

2 an

then

C ^summable is

to

sum

s,

ami

in fact convergent with

if

sum

supra) w

_

"

With reference

to

-h i

ii

262,

1

express the theorem as follows:

summable with S n

-> 0,

_

~~

_

w

whence the proof of the statement 49

is

Za n

is

-

1

immediate

49 .

The

last

expression

(or 43, Theorem 2), and to 82, Theorem tt, \\e a n converges if, and only if, it is series

A

may C\-

274,

486

Chapter XIII. Divergent

tends, in particular, to

= O (j

that a n

Theorem

if

i.

suffices,

If a

6a.

an

= o (~j A

series.

much

.

deeper result

is

the fact

e.

series

E an

is

Ck and if its

summable

terms a n satisfy

the condition

Z an

then

A

is

(O-Ck -> K-theorem)

convergent.

proof of this theorem

may be

50 .

dispensed with here, since

it

will

follow as a simple corollary of Littlewood's theorem 287. The direct proof would not be essentially easier than the proof of that theorem. 00

Application. The

w

as

is

it

00

I

2= an = 2=

series

n

l

w 1+a<

l

,

a

^

0,

is

not convergent,

easy to verify, by an argument modelled on the proof on p. 442, footnote

=

54 that for n ,

1, 2,

.

.

.

,

with (^ w ) bounded. Further, for this series (n a n ) be summable Ck to any order.

is

bounded, hence the

series

cannot

Closely connected with the preceding, we have the following theorem, where for simplicity we shall confine ourselves to summation of the first order.

Theorem

275*

partial sums

60

A

7.

s n9 to

Hardy, G.

necessary

and

Cl

be summable

II.

:

sum

s, is

for a

series

Za n

,

with

that the series

Theorems

of slowly oscillating series. Cf. also the author's work

relating to the convergence and summability Proc. Lond. Math. Soc. (2) Vol. 8, pp. 30J 320. 1909. I. quoted on p. 481, tootnote 42. The theorem deduces

convergence (K) from C-summabihty. short,

sufficient condition

to the

and more precisely an

O-C

->

We

accordingly call

K theorem,

since an

it

O

a

C -> K theorem

(that

is,

for

the bounded-

A

ness of a certain sequence) is employed in the determining hypothesis. theorem in his case, for the .^-process (v. of this kind was first proved by A. Tauber, 286) for this reason, Hardy gives the name of "Tauberian theorems" to all theorems ;

in

which ordinary convergence

shall call

them

is

deduced from some type of summability.

converse theorems or,

converse theorems,.

more

We

precisely, hmitizing converse or averaging

The C- and

GO

should be convergent and that for

487

H-processes.

remainder

its

the relation

(B)

+

**

(

5l

holds

.

If

denotes the partial sums of the series (A), and a

crn

its

sum, then

(B) asserts that

*-*w -(w+l)(or-an)^0,

(B') i.

that the error

e.

n times as large as the error with n.

s n ) is

(s

an ), except

(or

for a difference that decreases to

Proof.

I.

V and, since

If

E a n mmmable C _ __ *__ -r is

*

6V

$

lt

we have by

183, since a v

*-!,

sv

*

,

on again applying Abel's

*^v-i>

~

summation

partial

becomes

this

*n

n

>"

o

i

*' n

As w ->

\

I

+

+

("

GO,

^1'

!) ( p

all

_

"+ 2 >

five

(^

+

2 i

+

'*)

Sn'_

+

(n

2) (n

_J*J> w

+

/>

+

3)

&n+v

I

+

2

+

(

/>

+

2)

(~+

terms of the right hand side tend to

0,

/>

+

3 )*

whatever

=

o (n) the value of />, for by the assumed CVsummability and theorem 3, s n holds. At the same Hence n fixed and S n time, keeping (A) (w).

O

'

and

letting

.

p

>

+

n

we

obtain

+ (n + 2) e. = -

This tends to since

GO,

->

0.

s,

,

+2

(

by 221, because

Thus (A) and

+ 2)| S"

i

(TTT) (.)

->s.

Hence (B)

f

'

(B) are necessary.

Suppose conversely the conditions (A) 0wrf (B) hold good. write T n for the expressions on the left in (B), we have

II. if

we

also holds,

Tn+i

and hence

= a n+l + (n + 2) g n+1 + = 6n + *+i + (w + 2) (e n+1 = 6n, Tn ^n = *n + (n + 1) (Tn+1

Tn

(/i

1)

Then,

en

e n)

).

61

Knopp, K.: Uber die Oszillationen einfach unbestimmter Reihen, Sitzungsber. Bcrl. Math. Ges., Vol. XVI, pp. 4550. 1917. Hardy, G. H.: A theorem concerning summable series. Proc. Cambridge 304307. 1921. Phil. Soc. Vol. 20, pp. Another proof is given in the author's work I. quoted in footnote 42, and another again in G. Lyra. Uber einen Satz zur Theorie der C-summierbaren Reihen. Math. Zeitschr. Vol. 45, pp. 559 572. 1939. This latter work has furnished the above proof of the sufficiency of (A) and (B) for the C l -sumrnabihty of 2 a n *

488

Chapter XIII. Divergent

Consequently

series.

= 2TB -[(/H-l)Tn+1 -Tn

*

]

and therefore

__ +

n

But owing to T n ->

C

1

to the

We

\

aluc

I

follows

$, it

from

s,

mability

limitable

(sn ) is

sequence

with these general theorems on C-sum-

shall content ourselves 53

this that the

as required 52 .

and we

shall

now proceed

few applications.

to a

Among the introductory remarks (pp. 461 102), it was pointed out that the problem of multiplication of infinite series, which remained very difficult

and obscure

as long as the old concept of convergence

was scrupu-

solved in an extremely simple manner when the concept of summability is admitted. For the second proof of Abel's theorem (p. 322) provides the

may be completely

lously adhered to,

Theorem

276.

8.

of two convergent to the value

C=A

Theorem mable Cp

9.

this,

//

to the value

we now have

certainly summable

Proof.

2a n

is

summable

Ca

C

,

t

Let us denote by

A

A

C

to the value

|

.

.

.

+ an b

Q)

C

1

more general

A

and

2 bn

is

sum-

(

\

.

.

.

+ an *

B%\ C^ (

*\

)

B, where y

a

+ + /?

1.

the quantities which in

Sn

s

2:c n

&

of the general C-process

<

9

54

Hence, by 265,

paper

+

always summable

value

to the

+ ai *_! +

bn

Za n **-Zb n x =

62

al bn_1

the following

the case of our three scries correspond to the as described in 265, 3. For x 1, since

we have

is

B, then their Cauchy product

2c n = Z K is

B

Sb n

B.

Over and above

277.

= Z(aQ b n +

Cauchy'sproductSc n 2a n A and

series

3,

The theorem may be quoted

established similarly for summability

in footnote 42, p.

C

fc ;

cf.

the

481.

63 A very complete account of the theory is given by Andersen, A. P.: Studier over Cesaro's Summabihtetsmetode, Kopenhagen 1921, and E. Kogbetliantz , Sommation des series et integrates divergentes par des moyennes arithme'tiques et

typiques, Memorial des Sciences math., Fasc. 51, Paris 1931. 54 Since a n = o ( a ), b n o (n^), the power series employed are absolutely

=

convergent for

|

x

\

<

1.

The C- and

60.

489

H-processes.

But from this the statement required follows immediately, by Theorem We need only write 43, 6.

B

^(oe)

/i'

(ft)

-f a\

'~~~ *"(":?

"""c:"')'

/n

v

-f-

!

~r.T

in that theorem, so that (r) c ^-

the h) r potheses made, we have x n > A, y n -> /?, and the a rn clearly Hence the last expression satisfy the four requirements of the theorem. as n -> -I- GO. tends to

By

.

AB

Examples and Remarks. 1.

we obtain

The

S

If the series

n (

is

l)

-- 1) being original scries (k

summable

multiplied by

itself (k

1)

times in succession,

the series

C

cube summable

its

3,

summable Cj by 262,

C

5,

etc.

its

However, by 268,

square 2,

is

(certainly) that the

we know

is (exactly) summable Ck These examples show that the order of summability of the product-series is not necessarily the exact order, and that in special cases it given by theorem may actually be too high. This is not surprising, inasmuch as we already know The that the product of two convergent series (k 0) may still be convergent.

k th of these series

.

2.

determination of the exact order of summability of the product series requires a special investigation in each case.

we

In conclusion,

will investigate

one more theorem which may be

materially extended by introducing summability in place of convergence, namely Abel's limit theorem 100 and its generalization 233:

Theorem summable circle^

= Za

is of radius 1 and is n z If the power series f(x) to the value s at the point 1 of the circumference of the unit

Ck

10.

tl

+

then

+

1 in which z remains within an angle for every mode of approach of z to 1, bounded by two fixed chords of the unit circle (v. Fig. 10, of vertex

+

p. 406).

Proof. As of points (s

tending to

,

+

z l9 1

233, we choose any particular sequence within the unit circle and the angle, and

in the proof of .

.

.

,

as limit.

A>

.

.

We

.)

have to show that/(# A ) ->

9

$,

Apply

Toepfitz

278.

Chapter XIII. Divergent

490

theorem 221 to the sequence converges to

We

deduce

55

=S

an

(

/

=

zn

For

+ k\

__ .^ /(~)>

this is exactly

proof to be correct,

this

Since #A ->

theorems 221.

(c) is also fulfilled.

s:

w-0

we

what our statement im-

have, however,

the chosen matrix (a\ n ) satisfies the conditions

K! such

which by hypothesis

once that the transformed sequence also tends to

at

w-O

plied.

("

using for the matrix (0An )

s,

Since Z* St

series.

The

1,

this is

obvious for

still

to verify that

and

(a),

(b)

(a);

and, since

(c)

of the

condition (b) requires the existence of a constant

that 1 _ __ * I

T

y ^X

I

\*+l

I

(I for every with K'

By

A.

,

on p. 406, this is obviously the case has the meaning there laid down. exactly the proof of Abel's theorem as carried out

the considerations

= Kk+1 K For k = 0, this if

is

=

407, in the generalized form of Stolz. For k 1, we obtain an extension of this theorem, first indicated by G. Frobenius 56 and for

on pp. 406

,

k

2, 3,

stance

.

to

.

we

.

O.

obtain further degrees of generalization, due in subHolder 57 instead of C -summability and k taking

H

/c

and first approaching along the radius instead of within the angle only above different the form with in entirely proofs) proved (though expressed 59 58 and A. . Lasher E. Pringsheim by

By

this

theorem

real x's increasing to

we

10,

+

1,

content of the theorem in

have, in particular, lim

n (2 a n x )

=

s,

for

and accordingly we can express the essential the following short form, which is more in

keeping with the context:

Theorem involves

66 56 57

58 69

its

11.

The

A-summability

Ck ~summability of a to the

series

E an

to

a value

s

same value.

h is now the fixed order of the assumed summability. Journ. f. d. reme u. angew. Math. Vol. 89, p. 262. 1880. Cf. the paper cited on p. 405, footnote 13. Phil. Trans. Roy. Soc., Series (A), Vol. 196, p, 431, London 1901. Acta mathematica Vol,

28, p,

1,

1904,

always

The C- and

60.

With

491

H-processes.

the exception of the

C^-summation of Fourier sene^, \\hich more fully in the following section, further applications of the Cfc-process of summation mostly penetrate too deeply into the theory of functions to permit us to discuss them in any detail. We should, however, like to give some account, without detailed proofs, of an appliwill be considered

cation which has led to specially elegant results. This -summation to the theory of Dirichlet series. 7c

The

60

is

is

the application

C

of

Dirichlet series

convergent for every z for which

M

(xr)

> 0,

divergent for every other r

At the point

z.

0,

however, where

it

n

summable

is

it

C

l

sum

to the

1

reduces to the series 21

at the point

1,

where

it

I)""

(

,

1

reduces to

* 1

l)"^

(

n

n, it is (cf.

dications given in 268, 3

mable

Ck

to the

sum

show

"

Bk

-

-,

that for z ,

to the

sum

it

C

fc

9i (z)

> 0,

(k

1)

I

is

C

A

,

and the

4;

the series

for every integral value of k

This property of being summable region of convergence

is

C2

summable

p. 465)

\

for a suitable

'^~

/e,

in-

sum-

is

2.

outside

its

not restricted to the points mentioned;

can be shown by relatively simple means that our series is summable Moreover the order of summability for every z with SR (z) k. exactly k throughout the strip

>

*<8t(*)^-(*Thus

in

1).

addition to the boundary of convergence,

we have boundaries

of summabilily of successive orders, the domain in which the series certainly summable to order k being, in fact, the half-plane

%(#)>Whereas formerly plane

JR (z)

we now

>

it

that

(*-0,

was only with each point of the

we

could associate a

"sum"

right

of the series

1, 2,

.

hand

Z

is

..). half-

-

-j- -,

sum

with every point of the entire plane, thus whole plane. In a way quite analogous to z in the a function of defining that used for points within the domain of convergence of Dirichlet's series, associate such a

further investigations

flo

256,

/()

4, 9,

-

--

(l

now show

*

2*)

10 and 11.)

(;?) '

that these functional values also repre-

where

<-)

^

J?

^

is

Riemann** ^-function.

(Cf.

492

Chapter XIII. Divergent

series.

sent an analytic function in the domain of summability whole plane. Our series therefore defines an integral function

Quite

analogous

every Dirichlet series

of summability

properties

i.

the

in

e.

61 .

belong in general to

fi2

00

z". n

W"l

Besides

the

now prefer we have

boundary of convergence

$1 (z)

=

or

A,

AQ,

as

we

shall

C

since convergence coincides with -summability, the boundaries $1 (z) A fc for fc -summability, k -= 1, 2, . . . . to write,

C

by the condition that the series is certainly summable X k but no longer so for 3J (z) order for Sft (z) of AA

are defined

They to the

7*

>

th

^

^

course have A

A2

^

<

,

and the numbers

, Aj oo or to a definite finite limit.

cither to

.

.

.

A*,

Denoting

.

We

therefore

tend

this in either case

$R (z) > A, and its sum which defines an function suitably chosen, analytic in domain. this If is line the A JR A regular finite, (z) straight

A

by

the given Dirichlet scries

y

k

\\here is

is

summable

Ck for every z with

is

called the boundary of summability of the series.

is

For the investigation of the more general Dirichlet

series, (v. p. 441,

footnote 52)

Za n e-* it

s ,

has been found more convenient to use Riesz

the tract

by Hardy and Riesz mentioned

61.

/^-summation.

Cf.

in 266, 2.

Application of C^-summation to the theory of

The

9

processes

Fourier

series.

described above possess the obvious advantage of

summation processes, namely, that many infinite series which previously had to be rejected as meaningless are henceforth given a useful all

meaning, with the result that the

field

infinite series is

of application of the theory of Apart from this, the extremely

considerably enlarged. nature of these processes from a theoretical point of view in the fact that many obscure and confusing situations suddenly be-

satisfactory lies

these processes are introduced. The first example was afforded by the problem of the multiplication of infinite series 461-2, also p. 488). But the application of C^-summation which

come very simple when of this (see p. 61

ence

From

(z) 62

this ,

-^_-

Bohr, H.

it

:

1909, p. 247, and: 1910.

follows fairly simply that for Riemann's f -function the differ-

is

an integral function,

Ober Bidrag

til

an important

result.

Summabilitat Dirichletscher Reihen, Gott. Nachr. de Dinchletske Rakkers Theon, Dissert., Kopenhagen

die

Application of

61.

is,

Cx -summation

to the theory of Fourier series.

493

perhaps, the most elegant in this respect, as well as the most important is the application to the theory of Fourier series, due to L.

in practice, 63

As we have seen

the question of the necessary series of an integrable function converges and represents the given function is one which presents very great difficulties. In particular, it is not known e. g. what type Fejtr

and

.

sufficient conditions

369370),

(pp.

under which the Fourier

of necessary and sufficient conditions a function continuous at a point x must satisfy at that point in order that its Fourier series may converge there and represent the functional value in question. In 49, C, we became

acquainted with various criteria for this; but all of these were sufficient conditions only. It was for a long time supposed that every function /(#)

which

continuous at x

is

and has the

that point

Reymond

(see 216, 1)

possesses a Fourier series which converges at sum/(# ) there. An example given by du Bois-

was the

first

Fourier series of a function which at that point. the

is

to discredit this supposition.

continuous at XQ

may

The

actually diverge

The question becomes still more difficult, if we require only as that the (integrable) funcminimum of hypotheses regarding f(x)

tion f(x) should

be such that the limit

Km

|

[/(*

+ 2 + f(x - 2 0] - * (* t)

)

*->* o

What

exists.

the

sum

s (x

are the necessary

and

sufficient conditions

in order that its Fourier series

by f(x)

filled

)

may

which must be fulx and have

converge at

?

As was pointed

out, this question

is

not yet solved by any means.

obscure and confusing situation is cleared up very satisfactorily when the consideration of the summability of Fourier series is substituted for that of their Q-summability is quite sufficient convergence. In fact we have the following elegant Nevertheless,

this

Theorem

^

fg x

2

of Fejer. If a function /(#), which is and periodic with period 2 TT, is such that the limit

77

Um

}

->o then

exists t

value

s

+

Fourier series

its

2

is

/)

+ /(* -

2

/)]

always summable

= i (* Cl

in

)

at this point, to the

(XQ).

Proof.

Let 1

*

63

[/(*

integrable

Fejir, L.:

Vol. 58, p. 51.

a

+ M-l Z(a n cos n X + bn sin n X Q

Q)

Untersuchungen uber die /'Ywricrschen Reihen.

1904,

Math. Ann.

280.

494

Chapter XIII. Divergent

be the Fourier 359, that the n

series of ih

partial

f(x) at the point #

sum may be

=

Now

have, for

we

5,

we know, from

1, 2,

t

=4=

1,

.

.

.)

&TT,

t

t

-,

TT, if

in this case the limit of the ratio for t ->

_ "- 1

As

= 0,

. . ,

.

n -+ sin 3 *+...+ sin (2n l)t = sin this continues to hold for t = k we take the right hand side to be sin

and

pp. 356

expressed by

(n

Consequently, for n

by 201,

;

series.

_ ~

k IT, which

is

evidently 0.

Hence

**

n

contrasted with Dirichlet's integral, the critical

factor

~L?

occurs

the above integral which is called Fejfr's power for short and therefore the latter can never change sign ; to integral to

the second

this

and to the

in

whole

fact that the

subsequent part of the proof

is

due.

is

multiplied by

- the success of the

If then the limit

-2 0] = * (*o) = * exists, Fejfr's

We

theorem simply

C

J since

^

states that

o-

w ->

s.

observe that

the integrand

/sin n (~sin-

is f, sin (2 v ,,-i

sin

1) t t

Here the arithmetic mean of the numbers sn is denoted by an = an (x) ' ' by sn == sn (x), to avoid confusion with the notation for differentiation. 65 The value of the integral may also be inferred directly from Fefer's integral for/(ar) = 1, for which a = 2 and the remaining Fourier constants = O 64

instead of

itself,

f

61.

and each term of 2

495

Application of (^-summation to the theory of Fourier series.

when

this,

integrated

from

to ^, contributes the value

since

,

sin^.v-vj * sin

+ 2 cos 2 (v - 1)

= 1 + 2 cos 2 + 2 cos 4 H *

Hence we may

*.

write

5

nit

and therefore n

V-i

~S"

C

2

n*j

f~

f (x '

4-2

"

4

2

L~"

J

Vl,in*

./

o

+

when t -> 0. hypothesis, the expression in square brackets tends to In order to prove that an-1 or
By

If 9

(t)

is

integrable

i/i

.

.

.

f and

lim

9

281.

(t)

= 0,

as n increases.

Now this

follows from a very simple train of inequalities.

we can determine /

such that

8

< t^

<^ 8.

,

for a given e

>

0, so that

(t)

|

<

r/sinA

2'nJo

o

(linTy

since the last integral has a positive integrand,

the other hand, a constant

throughout

< <

0,

for every |

J/< *2 ,

and therefore remains

than the integral of the same function over the whole range

t

->

a

2

e

On

9

(t)

Then

*

less

|

As 9

JTT.

M

exists

such that

|

9

(t)

remains

\

to -.

<M

Consequently

ff

w

J_

%

2 "sin1 8*

(5

On

the right hand side, everything but n

is

fixed,

and we can therefore

496

Chapter XIII. Divergent

choose w

We

o|

282.

w _!

< ^e

>

for every n

.

-s <e |

Thus

hence a n ->s.

for these w's;

lished

becomes

so large that this expression

then have

series.

Fejfr's

theorem

completely estab-

is

66 .

Corollary

If f(x)

1.

^x^ 2

continuous in the interval

is

IT,

C

and if further /(O) =/(27r), /fow /fo Fourier series off(x) is summable l to the sumf(x),for every x. For the hypotheses of Fcjer's theorem are now certainly fulfilled for every x,

1

We now

= f(x) everywhere. We assume, as usual,

defined in the intervals Zkir <^ x < . by means of the periodicity condition, f(x) further state:

that the function f(x)

*= i i 2,

and s (x)

.

.

is

,

2(k+ =f(x

I)TT,

for

2kfr).

With the conditions of the preceding corollary, the C t 2. has been established for all x's, is, moreover, uniform which summability, -

Corollary

for all

i.

x's,

the sequence of functions

e.

In other words

all x's.

Given

:

> N,

such that for every n

e

> 0,

an

we

(x) tends uniformly to

f (x) for can determine one number

N

irrespective of the position of x,

K

(*)-/(*)

I

we have

87

<*

Proof. We have only to show that the inequalities in the proof of the theorem can be arranged so as to hold for every x. Now 9 (0

= 9 ft *) = | [/(* + 2

since f(x)

is

tinuous for 8

>

periodic and

all

#'s (cf.

-/<*)]

continuous everywhere,

is

theorem

19,

+ \ [/(* - 2

5),

and, given

it is

e,

we

-/(*)]; uniformly concan choose one

such that

|/(* for every

t |

\

< 8,

irrespective of x\

and every

x.

20 -/(*)!
these

all

t's

hence, as before, 5 . r /.\ /sinw A 2 dt /
2

-

.

Further, since /(#) say \f(x)

66

|

Note

is

periodic and is continuous everywhere, it is bounded, It follows at once that for all t's and all #'s,

< K for every x.

in passing that the curves of approximation

y


n

(a:)

do wo* exhibit

216, 4). (Fejtir, L.: Math. Annalen, Vol. 64, p. 273. 1907.) 87 The corresponding statement holds, moreover, in the case of the general theorem of Fejer for every closed interval entirely contained, together with its endrwiint in an rtnn interval in whirh /Vv^ ic r-nntinnrniQ

phenomenon

(v.

Application of (^-summation to the theory of Fourier series.

61.

and hence,

497

as before,

,

a

f

~

2

l


t

\ sin

K-

sm 2 8"

n

o

Now we cr |

n_ 1

orte

N

can actually determine one number

<

pression remains s\

<

^ N.

n

that

KM

such that the

For these

we can

so that, as asserted,

e,

N such

number

e for every

we

w's

last

ex-

therefore have

associate with every given e

<e

-/(*)!

> N, irrespective of the position of x. As an easy application, the following important theorem

for every n

results

from

the above theorems:

Weierstrass's Approximation. in the closed interval a

there

^

x 5^

and

b,

if

F (x)

If

e

>

is

is

a function

P (x) with the property |F(*)-P(*)|<.

always a polynomial

is

Proof.

Put

continuous in

-^ *) - /(*).

b

F (a +

<^ x <^

In

TT.

TT

^

<^ x

2

?r,

continuous282a.

arbitrarily assigned, then that, in

Then /

a

^x^

(x) is defined

write as in

50,

2 nd

6,

and

method.

Define /(^) for all other * by the periodicity con*) /(*) =/(%'* dition f(x \-27r)=f(x). Then f(x) is everywhere continuous. Now, for this /(#), let
An

index

m may

then be found such that

\f(x)-*m (x)\<\ for all x.

This am

form a cos/) x

+

(x) is the

sum

number of

of a finite

expressions of the

can be expanded in a power series of the means power series of 24. Let convergent everywhere, by

hence

b sin
CQ

+ ^X+

it

...

+ Cn X n +

...

Since it converges uniformly in denote this expansion. can determine a finite k so that the polynomial

^ x 5^

77,

we

k

satisfies

the inequality

throughout

5^ x

^

TT.

|

am

Hence

(x)

we a

see that

^*^

b,

P(x)

/>

is

(x)

\

<|

it satisfies

!/(*)Putting finally

p

H*)l<*

(J^J n)

- P (*),

a polynomial of the required kind, since, throughout

\FM-PM\

<e.

498

Chapter XIII. Divergent

series.

62. The -^-process.

The last theorem of 60 has already shown that the range of action of the ^-process embraces that of all the C -processes. In this respect it is superior to the C- and //-processes. Also, it is not difficult to give k to any examples of series which are summable A but not summable fc

C

order in

&,

however

power

large.

need only consider

Za n x n

,

the expansion

series of

=

x

at the point

and

We

1.

=

S

Since obviously limf(x) exists for x -> 1 n l) a n is summable A to the value Ve.

Ve, the series ( however, it were summable require to have a n

= o (n

If,

Ckt for some specific k, by 271 we should Now a particular coefficient an is obtained

k ).

xn

coefficients of

by adding together the

+

vidual terms of the series, which

in the expansions of the indi1 uniformly convergent for x g

is

|

\

^ <

:

1

21

As

249).

(v.

the coefficients in these expansions are positive, a n is xn in the expansion of a single

all

certainly greater than the coefficient of

term.

Picking out the (k

n + *(*

For a fixed to

k,

+

th

we

term,

2)

see that

*+l

2)! V

(k

+

2)! (*

+

!)!

a n /n k therefore cannot tend to 0; on the contrary,

it

tends

+00.

Although the ^4-process is thus more powerful than all the (^-processes taken together, it is, nevertheless, restricted by the very simple stipulation a nt the series a n xn that in order that it may be applicable to a series

S

and

2 sn x n

must converge

Theorem

283.

ecessarily

1.

|

If the series

what comes

to exactly the fl

for every s

> 0,

In this

n

Theorem A

i-

with partial sums

sny is

summable A,

g1

and

same

thing,

=

and

Ifin

sn

v'j"^"]

^

1

= O ((1 + e))

,

however small.

we have

-4-hm a n


S aw

= 0((l + e))

a companion to theorem 3 of

4 and 5 of that section

284.

\

S

have fim~v']~07[

or,

x

for

2. In rv

a

also series

j

j

have

E an j

and indeed

,

literal

which

AT A-\im

60;

but theorems

analogues in this connection: is

-

summable A, we necessarily have

fa i

+

2

fl g

~-i

----

na -=n

-f

n\

0.

The

62.

S

of these two relations indicates that (1 a n xn x) 0. This is almost obvious, since by hypothesis as x -> 1 The truth of the second statement follows, on the same

Proof. The must tend to E a n x n -> s.

first

proof of 273, from the two relations

lines as the

the

by subtraction; easily

deduced from

is nothing more than an explicit form summable A, while the second is quite

of these

first

of the hypothesis that

(l-^-^ + VVi '"*"-**

and

(!-*)*,,*-.*

(*)

499

^4-process.

2 an

is

In

fact,

it.

from

(1

x)

2sn x n -> s, we

first infer

that

That the second of the

by 102.

from

relations (*) follows

this, is a special

case of the following simple theorem:

Auxiliary theorem.

0^ x^l,

integrable in

//,

for x

1

a function f(x), which

0,

is

satisfies the limiting relation

a -*)*/( for x ->

then,

1

0,

The proof

we

also

have

follows immediately

by which

FM =

r nm

from the

,lim

provided the right hand side exists and

+

#->

00 as

+

(1

1

0,

such that |

The

direct proof

= +

2

Put x ->

0.

1

s x) f(x) g (x). and so for any given e

g (x)

remains \

<2

for

is

rule

known

as PHospitaPs,

F'(v) '

G

(x) is positive as follows 68 :

and tends to

The function g (x) tends to > 0, we can assign an x l in < x 1 x

< x < 1. We

as

<

1,

then have, for these

values of x,

From

statement follows in the usual way. these theorems 1 and 2 we have to some extent fixed outer limits

this the

By

to the range of action of the -4-process.

As

before

(cf.

the developments

68

The proof is on quite similar lines to that in 43, 1 and 2. The meaning of the assertion under consideration, that the first of the relations (*) implies the second, may also be stated thus: ^4-lim sn

For

first

s

implies

A C^lim sn =

s.

second relation we are concerned with the successive appliof the Ci-orocess. and then of the ^4-orocess. for the limitation of (s-\

in the case of the

cation

=

285.

500 on

Chapter XIII. 485

p.

-()),

Divergent

series.

question as to the point, beyond the region of series which which its action begins is a much more delicate one.

th'j

actually converge, at

we have

In this connection

Theorem

286. i.

e.

the following theorem due to A. Tauber* 9 :

A series Z a n> which is summable A, andfor which na n ^>0,

3.

for which

--Qis

convergent in the usual sense.

Proof.

>

every n

we

If

(o-A

are given e

;/

\

\

a)

I

,

\

> K-theorem.)

> 0,

we can choose 2

l*il

l*l

43,

and

a)

c)

For these

2.)

-

can be satisfied by hypothesis, and b) by referring to 's and for every positive x 1, we then have

<

s=f(x)

sn

r>

+ Sa

s

E

x v)

v (1

v-l

we now observe (1

and

that in the

- *") = av

second

in the

|

I

*.

-* ^ I

x

for every positive

by

a),

and

b)

for every n

may

first

v

!/(*)

<

-

+ ff- < 1

.

,

\

.

it

.

)

1

v

(1

- x),

follows that

+ a- *)^l ** + -r,r r- 3' I

I

Choosing, in particular, x

1.

a v xv. \

sums

of the

- *) (1 + * + (1 = "* < ^

n

(

=

1

,

we

obtain,

c),

>n

Q.

In this proof, positive

so that for

--

n

If

>

<5

c)

(Here

nQ

+ -" + "l*l + ---
M b)

e l^ <$

an na

-

Hence if we

number, but a

sn

->

5,

q. e. d.

interpret e as being, not an arbitrary prescribed suitably chosen (sufficiently large) one,

then

we

e.

one

infer the following corollary:

Corollary.

A

series

2 an

for which

,

summable A, with (na n ) bounded,

i.

-

has bounded partial sums. On account of the great similarity between this theorem and theorem 6 of 60, it appears likely that an O-A -> J^-theorem also holds, i. e. one 69

hefte

f.

Tauber, A.:

Math.

Ein Satz aus der Theorie der unendlichen Reihen, Monats-

u. Phys., Vol. 8, pp.

273277.

1897.

Cf. p. 486, footnote 50.

The

62.

S an

which deduces the convergence of suming, as regards the

n 's,

501

^[-process.

from

^-summability, by as-

its

merely the fact that they arc

O

(-J.

It goes very much deeper, however, is actually true. for the first time in 1910, by J. E. Littlewood:

theorem proved 1

Theorem

A

4.

series

2a

which

nt

is

This

and was

summable A, and whose terms

relation satisfy the

.=<), for which (n a n )

e.

i.

is

convergent in the ordinary sense.

is

bounded,

(O-A -> K-theorem.) Before going on to the proof, contains, as a corollary,

summable

if a series is

A.

Every

Theorem

Cky

we may mention

6 of

then by

Theorem

series, therefore, that satisfies the

60, also satisfies those of Littlewood's

that this theorem

60, as already stated there.

For

summable assumptions of Theorem 6, 60,

11,

theorem just

also

it is

stated,

and

is

therefore

convergent.

Previously

known

plicated, in spite of the

J.

Karamata

72

proofs of Littlewood's theorem were very comnumber of researches devoted to it 71 , till in 1930

found a surprisingly simple proof.

We

shall preface his

argument with the following obvious lemma:

Lemma.

Let g and e be arbitrary real numbers, and

following function interval

Then

^

*

73

<^ 1

,

and

defined

(v. Fig.

integrable (in the

f(t) denote the sense) over the

13):

there exist two polynomials

p

(t)

and

p(t)f(t)P(t)

(a)

let

Riemann

in

P (t) for

which

O^/^l,

(b)

70

The

converse of Abel's theorem on power series:

Soc. (2) Vol. 9, pp. 434448. 1911. 71 Besides the paper just mentioned,

cf.

Proc. Lond.

Math.

E. Landau, Darstellung u. Begrunl rt ed. pp. 45 46. 1916;

einiger neuerer Ergebnisse d. Funktionentheorie. 2** ed. pp. 5762. 1929.

dung

72

Hardy-Li ttlewoodsche Umkehrung des -4fo/schen Math. Zeitschr. Vol. 32, pp. 319 320. 1930. 73 The theorem holds unaltered for every function integrable in the sense of Karamata,

Stetigkeitssatzes.

Riemann.

/., l)ber die

3^7

.

602

Chapter XIII. Divergent

series.

Proof. Let OAA'E'BE (cf. the rough diagram, Fig. 13) be the graph of the function /(*), so that A and A' have the abscissa e~( ll e\ while that of and B' is e~ l Now choose a positive 8 less than the abscissa of A

B

less

.

y

A

than half the difference between the abscissae of

and B, and further-

more

On

the graph, the points

mark

B B2

the points

A A2

with the abscissae e-O+e)

lt

l

with the abscissae e

9

8.

Then

^

8,

and

OAA 2B^BE

the lines

i^B

A,

.

and OA^A'B'BJE (with

^4 2 #i

and

E

B

A 13.

taken along the curve -

.4'JS'

9

the other

portions being straight) are the graphs of two continuous functions

and G(t)

g

(i)

p

(/)

respectively, for which, obviously, in

g(t)
(*')

1

(b')

By

f(G(*)-g(t))dt Weterstrass's

that differs interval

by

approximation (282

less

< < t

1

than

-

a),

there exists a polynomial

from the continuous function g

(i)

- in the

:

e

4

Similarly there exists a polynomial

P (t)

n that differs

less

by

than

e

from

there:

:| These polynomials

m o^t^i.

clearly satisfy the conditions (a)

and

(b) of the

lemma.

The

62.

503

-4-process.

Proof of Littlewood's theorem. By

I.

hypotheses,

the corollary to theorem 3, the sequence is certainly bounded.

($ n ),

under present

In proceeding with the proof, it will be no restriction to assume the a n to be real. For, once the theorem is proved for real terms of the series series, it can be inferred immediately for series of complex terms by split-

Z

ting these

up

> 0, and put

Let g be given

II.

and imaginary

into their real

parts.

+ g) n] == k (n) = k.

[(1

>

anj and for n

as usual the partial sums of

y

write

-,

Let

sn

ak

).

denote

74

u

Max

sv

|

=

sn

pn

|

n
(e),

and lim n->

p. n

=

(Q)

//.

(g).

+

<*v

I

Then

(g)

JJL

->

as g -> 0. v k,

< ^

Indeed, for n |

Sn

Sv

=

nn

I

|

^ (k If

|

ar

Now, I

an

(// \

n)

Max (

|

a n+1

\

,

|

I

a n+2

.

,

1

.

,

for all

\

-^

'

ar

r I

|

^

r

Q

\

ar

\.

K such

that

and so

//,

Mn

(6)

= Max (e)

/*

whence the statement

|

^

*n

|

n<-v
Thus

^ 6 ^-

^e^

follows.

Suppose the sequence (i)

|

follows further that

it

a n ) being assumed bounded, there exists a constant

<^

III.

+

n+2

-tn\<

\*v

n

+

be this maximum,

\

we have

bounded on one

(sn ) ts

side>

say

s n ^z.

A/,

(A/sg

0);

00

(ii)

74

of the

limitable

A, say

The symbol Max

numbers

t l9

t 2>

.

.

(/ lf t 2t .

,

t

x)

(1

.

.

.

,

fp),

2s

v

xv ->

$,

v-o

or

Max

v (assumed real).

tv

(1

/or

A;

^ ^

->

/>),

1

0.

denotes the largest

504

Chapter XIII. Divergent

Then

75

series.

iff(t) denotes the function defined in the lemma,

*/(*) >#>^s

(!-*)

(*)

}/(<) dt,

e.

i.

=g

s.

V-0

For, by

2,

we

x*+ l ) I! s v

(1

(x^y -> s,

v-O as

x ->

Now

^ 0,

have, for every integer k

0, so

1

if

(#)

=

bQ

+6

+

X je

.

. .

+b

q

xq

is

follows at

it

any polynomial,

once that

-Jo = *

Now p

(/),

.

9 T- I/

v-O

w */.

} o

denote any positive number. Then a pair of polynomials can be assigned, by the lemma, so that

let

P (i)

O^J^l,

in

p(t)^f(t)^P(t)

(a)

(b) o irrf

x)

(1

For x ->

M=

assume

0, $0

Ssv p (xv ) -xv^(l

1

0,

it

lp

(t)

follows

(a)

Ssv f(xv)

and

(b),

by

_

i

d t^ lim~ "

^ 0/or a// v;

sv

xv

x) v-0

v=0

5

By

ffeatf

then

^

(1

xv

^

-

x)

Ss v=0

(**), that

(1

- x) Z s

i

v

f(x

v

)

V-O

the integrals on the

left

5 J U

P (i) d

and on the right

t.

differ

from each

i

other and from J / (t)

d t by

less

than

-00

e.

Hence

o

lim(l

x)

1

Esv f(xv)

xv

s

\f(t}dt <:

*

e.

v=0

Since e

>

non-negative

was

arbitrary,

it

follows that the statement (*)

is

true for

sn .

75

This is J. Karamata's Main Theorem. Both theorem altered to any function integrable in the Riemann sense over 1

for the special value p s of the integral J / (t)

dt

in our case.

and proof apply un-

^ ^ t

1,

except

The

62.

M>

If however tn

sequences results,

we

=

+

sn

get (*) in

IV. In III

(*),

0,

M

apply the theorem as so far proved to the two and un = instead of to s n Subtracting the

M

its full

put x

505

^-process.

.

generality.

= e~

on the

n

left

hand

side,

definition of f(t) in the lemma; writing as before

we

n ->

infer that as

+

n

*"") ->

^

S n -> 0,

+

=

-*QS.

-~ w -> g,

and

1

^

1

^

,

Writing, therefore,

SV

*-s)_27

(1

we have then

we have

[(1

back to the k (n) k, g) n] refer

GO,

(1

Since

and

27 sv ->

w y-ni

1

A

^_: w

27 fv v-ni 1

^.

1

s

= 8n

,

and S

-

A'

n

=

T

n

k

Z ^ - S) v

v

._.

8n"

n ^i

Hence sn

s |

Making w ->

and

+

oo

|

,

^ Max

|

sv

^n

+

|

8n

= |

fji

n (Q)

+

|

3n

\

.

we deduce

as this holds for every g

> 0,

lim

^ |

i.

|

e.

This completes the proof.

s

it

follows $n

|

= 0,

by

II that, for g

->

-f"

0,

606

Chapter

28S.

XIIL

series.

Divergent

Examples and Applications. 1. Every series which is summable C is also summable A, to the same value. This often enables us to determine the values of series which are summable C. Thus in 268, 3 we saw that the series S ( l) n (n -f l) k are summable Cfc+1 by means of the ^4-summation process we can now obtain the values of these series, n n which occur conveniently as the # h derivatives of the geometric series -( l) x e~*. In this way we when the exponential function is inserted by substituting x ;

t

obtain the series

_ e-*t +

e-t

convergent for

>

t

__ -

The sum

0.

_ ~

e-*

__ et

l~+~j=i

It-__

**

t' e l

1

1

"

+

i

-+...,

tr*

of this series

-1 _ e *t _ i et

is

^j-J_-_2 e *t

_

r___ i

2

1

-=

e

i

6 2i

___i

2t

1 e**

/

-I*

For a sufficiently small t > 0, these last fractions may be expanded in power series by 105, 5; the first terms of the two expansions cancel each other and we obtain

Differentiating k times in succession with respect to

= Now,

i

letting

Putting e~~* of radius 1; therefore

=

by

x on the

when

we have 2.

hand

l

(^

+

,} y

+

0,

we

we

side,

&H at

& p^

0.

2*

And

+

3*

- +

.

.

as this series

C^ +1 -sum

.

see that

we

.

.

.

-

(

A

+

+ (-

1)

was seen

are dealing with a

+

1.

The

"-*.

1)

+

to

be summable

1)*

+

power

.

.

76

series

value just obtained

(n

by 279. the function represented by a power series its

1)

further obtain

once obtain on the right hand side

decreases to 0, x increases to definition the ^4-sum of the series

_

-

(

/

thus obtained If

left

_

on-f-i

!)*+' 27

diminish and ->

1

for integral

oo

(~

we

tt

is

.

Ck+i

in 268, 3,

also,

2 cn zn

of radius r

is

regular

at a point z^ of the circumference of the unit circle, lim / (x zj for positive inAt every such point the series creasing x -> 4- 1 certainly exists and =/(ari).

2 an = S cn z^

78

For h

>

is

therefore

0,

the sign

summable

(

I)**

1

A

may

and

its

^4-sum

is

the functional value

simply be omitted, by footnote

4, p.

237

The

63.

507

E-process.

Combining the preceding remark with theorem 4, we get the statement: s < 1 and (n c n ) is bounded, then the scries converges for continues to converge (in the ordinary sense) at every point z lt on the circumference of the unit circle, at which /(#) is regular. 4. Cauchy's product 2 c n b Q) of two series 2 a n and 2 (a b H -| |- a n 2bn which are summable A to the values A and B, is also summable A, to the value C = AB, as an immediate consequence of the definition of ^-sum3.

If f(x)

= Sc n z n

|

\

,

mability. oo

With regard

5.

to the series

J5J

w

274

in

order k.

I

T^Ti*'

a ^0> we have already seen

1

that these do not converge, and that they are not summable C^ to any By Ltttlewood's theorem 4, we may now add that they cannot be

summable A

either.

63.

The E- process. 7?

The ^-process was

introduced on the strength of Euler's transa n (not having Starting from any series have to write signs), we should

2

formation of series (144). alternately

-|"

and

and we should have to consider a n as the Zf, transformation of H a n We had agreed to depart from the usual notation so far as to write 78 = and s = a Q + &\ + and similarly for + -i fc> r 0, SQ '

-

.

>

ti

Then

the accented series.

the

is

we

EI

-

transfoi

obtain for the

Sa n', the partial

with

sums

(v.

265, 5)

mation of the sequence (sw ). Applying this again, Zf a - transformation, after an easy calculation,

^.of

which are now

7 A detailed investigation of this process is to be found in two papers by the author, Uber das Eulersche Summierungsverfahren (I: Mathemat. Zeitschr. Vol. 15, pp. 226253. 1922; II: ibid., Vol. 18, pp. 125156. 1923). Complete proofs of all the theorems mentioned in this section are given there.

78 It may be verified without much difficulty that in the case of the E^process "a finite number of alterations" is allowed, as in the case of convergent series. (A proof, into which we shall not enter here, is given in Consethe first of the two papers mentioned in the preceding footnote.) quently the shifting of indices has no effect on the result of the limitation

process.

508

Chapter XIII. Divergent

For the

series.

E v- transformation we obtain in the same way the

series

**?> with terms '

OyV

and

sums

partial

79

(n

E

-

l

(p^

i

The examples given the

'

I

> 0) (p)

of

^

\1/

in

i

i

(p)

(

p)

265, 5 have already illustrated the action them shows that the range of the

the last of

process;

considerably wider than those of the C- and //-processes. with that example, we may form the of /^-transformation n the geometric series 2z , and we shall obtain ZTj-

is

process

By analogy

This 2 1

80

series

converges

P _[_

(2

1)

|

<

(2

can be made

1).

to

sufficiently large.

summable

half -plane analytical

,

P

the point

is

2P

En

We

e.

if

sum

and only if, radius 2 P round

if,

5-37-*

2 lies within the circle of

<

1 Evidently ^v^yy point in the half-plane 9ft (z) such a circle, by taking the exponent p

n

accordingly say: The geometric series 2z a suitable order p for each point z interior to the

9ft(z)
i.

the

inside

lie

to

to

,

may

The sum

is

in

every case

of the function defined

by

1 ,

i.

the series

e.

in

it

is

the

the unit

circle.

The case

of any power series is quite similar, but in order to carry out require assistance from the more difficult parts of function theory. shall therefore content ourselves with indicating the most tangible results 81 The power series 2c n z n is assumed to have a finite positive radius of convergence, and the function which it represents in its circle of convergence is denoted by f(z). This function we suppose analytically extended along every = const, until we reach the first singular point of ^(*) on this ray am z

we now describe the circle

the proofs

we

We

:

which corresponds to the one occurring in the case of the geometric series, The points common to all the circles K

70 The formula of this transformation suggests that, for the order p, the restriction to integers I> might be removed. Here, however, we shall not enter into the question of these non-integral orders. Cf. p. 467, footnote 18. 80 This series is then, moreover, absolutely convergent.

81

As regards the

proof, see p. 507, footnote 77.

63.

The E- process.

509

the simplest cases (i. e. when there are only a small number of singular whoso boundary consists of arcs of points), make up a curvilinear polygon the different circles, and tt every case they will foim a definite set of points then have the which we denote by (V) p will, in

We

.

Theorem. For each fixed p, 2c n z n is summable Ep at every interior point o/289 n is indeed absolutely convergent at that <&p and the Ep transformation of 2c n z numerical values thus associated with every interior point of &p form 2c n z n into the interior of p . Outside &p9

point. The the analytical extension of the element

Ep

the

-

Sc n z n

transformation of

is divergent.

After noting these examples, we now return to the general question, within what bounds the range of action of the E- process lies; in this as in further investigations, we shall restrict ourselves to the first order, e.

i.

are,

The cases of E- summation of higher orders to the ^-process. however, quite analogous. Since Z^-summability of a series 2a n means, by definition, the

convergence of

its

E

transformation }

the general term of the latter

we may now

which

must necessarily tend

write, for short,

^-lim In

this

or

284.

to 0:

an

= 0.

form, we again have an exact analogue to 82, 1 and Kronecker's theorem 82, 3 also has its analogue here.

a sequence which is limitable E l with the value ' >s The arithmetic means transformations E 1 (s n) sn

if

(s n )

is

=

we may denote them

show by that

we

mation

first,

two 82

the

result

+ + --- + *.

(*o

transformations

By

same

if

we apply

are

^

completely

calculation, the identity to be

.

i.

e.

the if

C

-

easy to

82

proved

is

at

.

,

transfor-

we form

m hmg ^ ^ (sj ^ E identical

by the

first

prefer to leave this to the reader

and then the /^-transformation,

sequence E, C, (sj = E, the

we

direct calculation

obtain exactly

E^

for short

since they are obtained by applying in succession 1 (s n Now it is Ej- transformation and then the C x transformation. ),

1

For

its

s,

.

of the latter therefore also tend to s;

C

272

the

^ ^.

Thus we

once reduced

(

also to the

relation

< n < k,

which is easily seen to be true. On account of the property Er and Ct - transformations are said to be commutable. The corresponding property holds good for Ep - and C - transformations of any = CQ Ev (s n). Cf. p. 482, footnote 45, and p. 4S3. order; in every case, Ev CQ (s n) for

in question,

the

tf

!?

(a 51)

510

Chapter XIII

have

Divergent

MMLAIUM + E

and subtracting

n

l

series.

+s **

)

from

this

E i(O-** we

on

obtain, exactly as

485, the relation

p.

stated,

namely

as a necessary condition for the Ej-sumrnability of the determine further what the condition -Yima n l

regards the order of magnitude of the terms a n

the expression for the

whence, as a n '+Q,

M

at

it

's

in

If

we

once follows, by or

= o(3").

a,,

be

we

simi-

The four conditions

1.

= o(3 n

)

in order that

necessary

may

4ft, 5, that

=

an are

.

as

we deduce from

,

carry out the corresponding calculation lor s n and s n', n that s n o(3 ). Summing up, we therefore have

Theorem

290.

implies

terms of the a n "s:

J=-0 larly find

2a n

series

=

E

To

E

summable

n

and the

sn

series

=--o(3

2a n

,

)

with

sums

partial

sn

,

. {

A comparison of this theorem with the theorems 271 and 283 and the examples for 265, 5 shows that the range of the /s'j-process is the considerably more extensive than those of the C- and ^f-processes ;

/^-process

which

ever,

a

is

in

good deal more powerful than these. The question, howthe case of the C- and v4 -processes led to the theorems

274 and 287, here in the

We

mable

and

Et

if,

what may be described

process, as

/^-summation

in fact

as a loss of sensitiveness with the C- and ^-processes. compared

have

Theorem

5891.

reveals

2.

// the

series

2a n

to the value s, so that the

besides this,

fl

2a

with partial

sums

sw

,

is

sum-

numbers

we have

W then the series

,

is

=

convergent with

the

sum

s

-

(0-E t

*

K- theorem}.

The

63.

Proof. We form

and we

2

part from i/ In virtue of

up the expression on the right hand side into three parts: TV T\ is to denote the part from v = to v w, T 3 the 3 ;/ to ^ = 4 w, and T* 2 the remaining part in the middle. sn

|

roughly estimated

there certainly exists

(13)

such that

l

the difference

split

7\ + T +

K

511

^-process.

^i ^ n

5> \

Hence

-

a constant

there also exists a constant

K

such

that sv

I

for every

Now

//,

s2n

^v^

provided

for every integer

>

k

1,

4:

<

A: v^"

|

Hence

w.

we have

T1

|

and \

j

are both

7" 3

|

83

'

*'<*). and accordingly

84

16\

n

as n increases. Therefore 7\ and 7' 3 both tend to In To, i. e. for n <. v <. 3 w, \ve have, by (B),

denotes the largest of the values a^ +l \/n to as n increases. Therefore

if e n

en

|

\

I

This

2

last

-

\

I

sum

to separate 2 n

it "

is

tZ^^

*

'

L

ll~\

l>

however

\

v

easily seen to

v into 2 n

and

v.

*>4W

/

*"

|

a n+2 \/n

\f

n '*

y

\

+

2,

.

.

.

;

v i \^^

*

V

/-w

have the value n

(<>)\

it

suffices

Thus

88 This somewhat rough estimation for k most simply obtained by multiplying together

]

is

-f- 1,

must tend

/

t

which, however, all

is

often

useful,

the inequalities

l\vfl

1+ i) <.<( 1+ _) (l\v (see

46 84

a) for v

1,

Substitute (

for &', in the

2,

...,*

~ J

1.

~

1(3

ancl use )\

denominator the lower estimate.

^

n

t ^ ie

numerator tn e upper estimate

512

Chapter XIII.

Thus, as

fi

n

-*0, we

by 219,

have,

series.

Divergent 3,

r,-*o.

Summing

we

up,

therefore have

r

t

Now av

+r +r = a

- S3n -*o.

'

s

3

>s, hence by hypothesis s^ Q by (B), it finally follows that

*n-*

4

M

*s

s an

s

and

also;

further,

since

>

85 . q. e. d.

we

In conclusion,

shall also consider the question of the

E-summa-

product of two series which are summable E 19 as well as that of the relation of the range of action of the E-process to that bility

of the

of the C-process.

As regards the multiplication problem, we have two theorems, which are the exact analogues of Mertens* theorem 188 and Abel's theorem 189. We confine ourselves to the development of the former and we

therefore proceed to prove

Theorem

292.

summable 2a n' and

let

e.

i.

their

2a n

2bn

be

assumed

E^- trans formations, which

we

shall denote

Let the two series

3.

E lt 2bn

and

to

be

by

be convergent. If one at least of the two latter series ', then Cauchy's product absolutely, converges

Scn = 2(a Q b n + a, is

bn _ l

\-

-\

a n bQ)

summable E^ and between A, B, and C, C. we have the relation A B

also

y

Proof.

By 265,5,

values of x (v. theorem

the

=

three series,

for 1),

&

=

v -

-

and

for

all

E^-sums

sufficiently

of

the

small

we have

= 2X,*" +1 = ^ '(2y), = 2" &*+' = 2b '(2 y), /;(*) = 2 cn x* = 2 cn (2 y)+. f B

f, (x)

n

'

t (x)

On

the other

hand /;(*)/;(*)

Thus we have

84

the identity

287 suggest that an O-E-+K- theorem may one which enables us to infer the convergence of 2'a n

The theorems 274 and

also hold here,

from

= */;(*).

its

i.

e.

^-summability, provided

that

an

=O

I

=

.

)

\V*7

This

is

actually the

case, but the proof is so much more difficult than the above that we must it here. (Cf. the second of the papers referred to on p. 507, footnote 77.)

omit

The E- process.

63.

=2a 6 + < c, +

<

we

f

whence, besides cj =2 &'

',

Q

obtain the general formula for

+' v) twoK' --

Since by hypothesis one at least of the

series

absolutely convergent, Cauchy's product, these two series is convergent and

and

sum C we

for its

by

n ^>

;~i

2a n

188 '

cn

From

1:

v)

2bn

'

h^/V)'

convergence of

c n ', the

--+and

-----]

'

2(aQ 'b n

=/!#,

obtained expression for

*i-i

the

'

is *

last-

follows at once,

obtain

- AB = AB, d.

e.

q.

86

we

Finally,

C-

and

stance,

that

the

i.

e.

that

examine the question of the relation between It is very easy to show, in the first in-

shall

E -processes. the

Theorem

4.

If

a series

'two processes give it the

Proof.

If

c^^c't

condition, the

and

the

With

condition

263,

III;

E

l

(c n')

is

summable C^ and

is

same the

also

summable

E lt

value.

C1 -transformation

and

(s n')

the

E

both these sequences are convergent, by hypothesis: (s w ), f Since both processes satisfy the permanence sn *$'.

'formation of

say

the compatibility

fulfil

processes

we have

T1

-

transformation of

-transformation of

f

also converges to

(s w')

converges to

(c n )

s':

c':

the abbreviated notation, these two relations are

c*EM-** But, as was pointed out on so that s' must be equal to

We series

have already seen

2z n

,

that

the C^- process.

the

p.

and

c',

q. e. d.

(p. 508),

^-process

In fact,

we

^cM-^tf.

509, these two sequences are identical,

is

cannot

from the example of the geometric

more powerful than

considerably

sum

the geometric series by the latter anywhere outside the unit circle, while the E^- process enables us to sum it at every point of the circle z 1 2 But this must not be interpreted to mean that the range of action of the Zij-process |

+

1

<

.

completely includes that of the Cj- process, much less those of Ck processes. On the contrary, it is easy to give an instance of a -

all se-

86 The form of this proof suggests that in certain cases it will be cona n will be venient to introduce the concept of absolute suramability: A series said to be absolutely summable El if 2*a n ', its Et - transformation, converges

2

absolutely.

514

Chapter XIII.

quence

which

(s n )

(s w ) is

limitable

is

= 0,

index n which

is

but not limitable

,

t

=

v and every other s n sv not a perfect square).

This sequence

is

C

limitable

values of the arithmetic

S

means

= v* and the least for n = v

n

~S7i!rn5' If

the

require

to

E

both of which

^(SjJ

*

'

e

-

^

For the largest

.

= ^~~j-^,

latter

the former

c i(O-*^-

El

also limitable

but, for

-:

for every

e. (i.

1

The

1.

-^

same sequence were have

transformation

The

9

sequence

MIL-g are obviously attained J

'

n-\-

for

=

with the value

1

E v The

0, ...

1, 0, 0, 2, 0, 0, 0, 0, 3,

where

of this type,

C

series.

Divergent

n=

2

y'

,

we should

therefore

the (2 n) ili term of the

is

expression on the right

hand

side tends

to

^_

by

219

that for

all sufficiently

cannot

-^.

>

large n's the terms remain

The sequence (sj

is

-J-

so

3, >

\l jt

>

and

--,

therefore not limitable

E

1

(sj

E^ We may

accordingly state:

294.

the two ranges, that of the C^- process ant that contains the other entirely. There are series neither 1 -process, which can be summed by the C^-process, but not by the process,

Theorem

of

the

5.

Of

E

E^

and conversely 87

.

This circumstance raises the further question: which able Cj, can be

summed by

and we

this subject,

shall content ourselves with

sunun-

series,

Little is as yet

the Zs^ process?

known on

mentioning the foL ow-

ing theorem:

Theorem

295.

6.

//

2a n

is

summable

*0-M|-f--"fr3|i __

then

2a n 87

The

is

also

summable E^.

(o

statement remains the same

c

Cl

Cx

,

with

,

E

1

theorem

when higher

88 .)

orders of both processes

are considered. 88

The

corresponding O-theorem does not hold, as has already been shown

by the example on theorem

5,

where the arithmetic mean

is

-f

actually -s

O

.

{

\

\/

11

)

/

The E- process.

63.

Proof. Writing s n Put

= on

s

the sequence (an)

,

Cl

limitable

is

with

the value 0.

<*o

+a

h

H

i

^ an/.>

<*n

^r+i

' by the hypotheses, we then have not only crn >0, but also Vnon *0. Now we have the following general inequality, due to Abel: If '

<7

,

a

.

,

.

.,

an are any numbers, a/

=^

~

gl

y+ 'i"

= 0, 1,

(r

,

.

.

.

,

w),

the corresponding arithmetic means; if, further, r is a number greater than all the (n 0, 1, ...,n, and r k a 1) quantities \o v'\ 3 for v number greater than all the quantities |av'|, for &<^v
=

+

.

monotonely to the term ccm and decrease monotonely from 89 if < p ^ m < n: on, we have the following inequality

term

that

,

0J -f

+

h

Applying

4- ^i)

4-

duced above, and taking a v for

w~

TT

This inequality the

(")

<

V?i

1

In

hold a fortiori

if

and

oj

\

r fe

it

fact,

follows that, for

(TV

=

(v

it

a r+ 1 ) follows that

a,,

av

;/

27

I

|

all

v>

ov

'

intro-

we can choose

,

we may

similarly

-I"

is

^ T p ap

-f-

->

-

1) <, (*r

m am

i to

be greater than

the

quantities

(

of

\m/

)

f-

-7=,

|

aj

the values

so that

is

and therefore, taking a n+1 ft

a v+1 ) =- 27

r rn

the above relation follows directly,

first

(m a m

m-l

I

v0

negative in the

Tjl

all

ceralso

sufficiently large n,

!

whence

,

than

p-o

y.,-0

(oc^

.,

<J

^? (^) Since from some stage on we have

v CTV_I

1) a^

-f-

Z(v

the third,

.

we assume

^ fy

n

Noting that

.-

greater

the limiting relation

9

.

3, the greatest term

from some stage on.

< 3 Vp

89

|

numbers

the

then obtain

Now, by 219,

.

satisfies

tainly

will

quantities

with v ^> ^

e.

,

to

= 0, 1, 2, and p =

v

J, i.

We

.

( -

p the greatest integer <^

take

all

=

> 8,

n

for a fixed

this,

"n

>

*

+

0,

n

27 -f 27

v=p

-

v-w

and second sums and

-f

m+

a rrt -n

+

.

.

+

positive in

>

516

Chapter XIII.

Divergent

series.

Since r V/> was to tend to 0, since, further, p

w does, and

as

same time -r

at the

p and *

0,

m

tend to

follows that

it

-{-

when

n

i.

e.

q. e. d.

Exercises on Chapter XIII. 200. With on

p.

the help of example 119

namely that

461,

oo

*->+o

What summation Define

this?

201.

a)

in

n*

-- =

w== i

prove the fact mentioned

*

might be deduced from

the /J- process

process related to

its

properties.

the condition

Is

273,

in

given

i

^

and indicate some of

it

270),

A-nn-l ( '' -

Hm

(p.

substantially equivalent

to Cfc+i-lim

= 0,

(nan )

to

b)

202. With reference to A lim sn s always x)

2s M x* -*

always involves

s

(1

S< "-

x)

n =o^ + *A V

*-* 1-0). 2O3* Show similarly

that

i

.

(1

284, show

the relations (*) in the proof of e. involves A C^-lim s n s,

general

*

o;

n -* s,

)

(for

B- lim

that

=s always involves B Ck - lim

sn

5n

vi

-a;

_

nti/n + AN *

I

for

does

the

(l-x)2sn

relation

xn

(1

= 0,

i.e.

__

n!

)

a:-*4-oo. 204. Are the conclusions mentioned 5

sn

rn

(fr)

'"*"'""*"

in n

x)

2O3

2O2

and

x n _^

s imply,

reversible, e. g.

conversely, that

-+s1 QO

205. The

/*

I

T"

series

n=0

(

^

/i

fc

_____

~1

"I

V

)^

n is

summable C

fe

for |*|

=1,

/

cos 9? -4-isin
+ 2 cos x

-f-

3 cos 2 x -f- 4 cos 3 x 4-

-cosn;4-2 cos2a:-f 3

=

cos3a;+- =

-75

"

--

,

eta

O6.

a positive monotone null sequence, and

If (a n ) is

=

+a +

a 2 H-----h *n

&0-&1

+ &2-&3 + ----

aO

i

*>n

if

we

put

>

the series

is

summable Ct

207*

If

sum

the

to

=

s

n

-~-J*(

l)

o

we write

exercise that the

1

+ -~6

-f-

-5-

O

+

H

an

.

-- = ^n

it

W

follows from the preceding

C^-sum

*i-A + *-*4 + ---- =

log2

2

'

and similarly that the Cj-sura log 2

208. ing series

then

- log 3 -f log 4 - H---- =

is convergent or summable -!' always convergent with the sum s:

If is

209.

If -TflM is

2a u

itself

is

known

to

2

C%

log

~

.

with the

be summable C, and 2"w

|

sum

n

s, the follow-

a is |

convergent,

convergent. f,

210. Prove the following extensions summable Cj to the sum s, then for z

is

-+$

of Frobenius' >

in general, for

1

and

(p.

490)

:

(within the angle)

an

If

n=1

*"'-**

n=0

n=l and

H-

theorem

>1

every fixed integer p

Jan<

p

e

,

->5.

n=0 But

Sa n z nl

does not necessarily tend to

s,

as

jf (-1)"*"

may be shown by

the example

1

n=0 for

real

which

it

x is

1

>

0.

The maximum

(Hint:

attained, both

211* For every

->-f

real series

n t and the value of t for of t from the left as n increases.) E a n% for which a n xn converges in ^ x < 1, ,

1

we have

Hm

(Cf.

Theorem

161.)

212. With reference

show that the arithmetic means phenomenon. (Cf. p. 496, footnote 66.) which are summable E is invariably

to Feje"r's theorem,

a n (x) considered there do not exhibit Gtbbs'

213. The product of two series summable 214. If 2an is summable E i9 then ,

<x<1

Q

2 an x n

is

also

summable

Ev

for

and

215. Give a general proof of the commutability of the Ep - and C9- processes. 216. Deduce the o-E p -+K- theorem (what is its statement?) by induction from the o-E^-*-

/f-

theorem.

618

Chapter XIV. Euler's summation formula and asymptotic expansions.

Chapter XIV.

Euler's

summation formula and asymptotic expansions. 64. A.

The

Euler's summation formula.

The summation

range of action of

all

the

formula.

summation processes with which we

became acquainted in the last chapter was limited. It is only when the a the divergent series under consideration, do not increase terms a n of

2 w

too rapidly as n increases that of the .B-process,

it is

we can sum

Thus

the series.

-n x n should be necessary that 27 convergent everyf

r-^n\

or -V^l^nj should tend to zero. n B-process cannot be used e. g. for the series

where,

i.

e.

27 (- l) n n-O

that

in the case

\

H!=l- l!+2!-3! + 4l- +

...

Hence

+ (- !)! +

the

...

.

and even more rapidly divergent series, occurred, most varied kind. In order to deal methods used hitherto, we should have to the with them conclusively by Howintroduce still more powerful processes, such as the l^-process. in this have been obtained no essential results ever, way. At a fairly early stage in the development of the subject other methods were indicated, which in certain cases lead more conveniently to results useful both in theory and in practice. In the case of the numerical evaluan tion of the sum of an alternating series 27 ( l) a ny in which the a n 's constitute a positive monotone null sequence, we observed (see pp. 250 and 251) that the remainder rn always has the same sign as the first term neglected, and, moreover, that it is less than this term in absolute value. Series like this one,

however, in early investigations of the

Thus

in the calculation of the partial

somewhat

sums we need only continue

down

the terms have decreased

until

to the required degree of accuracy. similar state of affairs exists in the case of the scries

t-

=1-x+| -+ a

.

.

.

+ (-

1)-

J+

.

.

.

,

x

> 0,

A

64.

Euler's

since the terms

summation formula.

xn -,

likewise decrease

A.

The summation

monotonely when n

formula.

519

> x. We

can

therefore write

for every n

on x and

> #, but

n,

where & stands for a value between is

otherwise undetermined.

It is

when x

g.

1000, the thousandth term

1

,

when x

is

equal to "JQQQI.

is

depending

impossible in practice,

x however, actually to calculate e~ from this formula e.

and

large, for

As 1000

1

a number with 2568 digits (for the calculation see below, p. 529), the term under consideration is greater than 10 431 so that the evaluation of the sum of the series cannot be carried out in practice. From the theoretical is

,

on the other hand, the series fulfils all requirements, since terms, which (for large values of x) at first increase very rapidly, neverHence theless end by decreasing to zero, and that for every value of x. whatever can in be obtained accuracy of any degree theory.

point of view, its

The

circumstances are exactly the reverse, if is represented by the formula

we know

that the value

of a function /(#)

< # < 1, The

for every n.

series

E

n '(

l)

~, whose

partial

sums appear

in this

formula, diverges for every x: but in contrast to nearly all the divergent series met with in the last chapter, the terms of the series (for large values the series at first behaves like a conof x) at first decrease very rapidly

and

vergent one limit.

with great case;

As

it is

Hence we can

this is true

only later on that they increase rapidly and without e. g. /(1000) to about ten decimal places

calculate

we have

even for n

only to find an n for which

=

3,

1

-

the value sought

10 3

2 -4^ 10

is

JQQQn+f

< 2 l^"10

.

given by

~

10*

to the desired degree of accuracy. Thus it happens here that an expansion in powers, which takes the form of an infinite series which is divergent

everywhere and very rapidly

so,

nevertheless

results, because it appears along with its remainder.

however,

not even in theory

to obtain

yields useful numerical are not in a position,

We

any degree of accuracy what-

Chapter XIV. Euler's summation formula and asymptotic expansions.

520

ever in the evaluation of /(#), since f(x) is given by its expansion only with an error of the order of one of the terms of the series. The degree

of accuracy therefore cannot be lowered below the value of the least term of the series. (A least term certainly exists, seeing that the terms finally

As

increase.)

the example shows, however, in suitable circumstances

be

may

practical requirements

all

satisfied.

Series of the type described were produced for the first time by Euler's summation formula 1 which we shall now consider more closely. ,

If the terms

tion f(x) for

x

a

,

= 0,

a lt 1,

.

.

.

.

.

.

an

,

,

n,

,

.

.

.

.

.

.

of a series

we have

,

2

are the values of a func-

already proved by the inis a relation between

(176) that in certain circumstances there

tegral test

sums

the partial

sn

=

+

aQ

+

+

#1

<*

n

an d tne integrals

Jn =]f(x)dx. summation formula throws further

Euler's

possesses v 0, 1,

=

a

...,-

v\\ J (*

on

light

this relation.

^x^n

continuous differential coefficient in

-v-

)/' (*)

dx

=

for each of the values v,

the one value x

i

[(*

- v - *)/(*)]

(fv

x

=v+

+/M-I)

we can put


rf

(To simplify the and of

writing,

its

*

+

1

-

J

/(*) dx.

[x] in

J (*

the integrand

by

19,

on the

theorem

17,

get

M - t)/

(*)

^*.

v

we denote by / and f^ respectively the values f^(x) for integral values x= v.) Adding

derivative

these relations for the relevant values of

we

=

we

v+1

v+l J

v

Since, however,

does not matter,

1

=

1.

v

f (x)

for

V

left, at least for v fg

of

If f(x)

then,

1,

V

Now,

9

i>,

and adjoining the term J (/

-f-

/n ),

finally obtain the formula

to the summation formula cf. footnote 3, p. 521. The phenodescribed above was first noticed by Euler (Commentarii Acad. sc. Imp. Petropolitanae, Vol. 11 (year 1739), p. 116, 1750); A. M. Legendre gave the name 1

With regard

menon

of semi-convergent series to series which exhibit this phenomenon. This name has survived to the present time, especially in astronomical literature, but nowadays it is being superseded by the term "asymptotic series", which was introduced by H. Poincare on account of another property of such series. 8

In the subsequent remarks

all

the quantities are to be real.

A.

The summation

521

formula.

summation formula in its simplest form 3 closed expression for the difference between the sum / /i +

This in a

summation formula.

Euler's

64.

fact is Euler's

It gives

.

+

+/

n

and the corresponding

integral

ff(x)dx. o

We

shall

denote the function which appears in the

last

integrand

byPi():

P This in

is

one It

x

(*)

= *-[*]-[

essentially the same function as the one which we met with of the first examples of Fourier expansions (see pp. 351, 375). is periodic, with period 1, and for every non-integral value of

we have

A

to

simple example

formula..

If

f(x)

i

-

,

begin with will

we

obtain,

the importance

illustrate

by replacing n by n

of

this

1,

n ~2"

We may

n-1 f P

substitute the latter integral for

As P!

is bounded (j;) and we find thai

in

2;

>

+

^

J"

2

(x) r-g

x

dx, since

Pt (x-}- 1) = P

t (a;).

o 1

,

the integral obviously converges

when n *OO

f

lira

8

its general form 298, originated with Euler, who menpassing in the Commentarh Acad. Petrop., Vol. 6 (years 17323, published 1738) and illustrated it by a few examples. In Vol. 8 (year 1736, published 1741) he gives a proof of the formula. C. Mac lauri n uses the formula in several places in A Treatise of Fluxions (Edinburgh 1742), and seems to have discovered it independently. The formula became well-known, especially through Euhr's Institutiones calculi differentials, in the fifth chapter of which it is proved and illustrated by examples. For long it was known as Maclaunns

tioned

The it

formula, in

jn

formula, or the Euler-Maclaurin formula; it is only recently that Euler's undoubted priority has been established. The remainder which is most essential was first added by 5. D. Poisson The (v. Me"moires Acad. scienc. Inst. France, Vol. 6, year 1823, published 1827). particularly simple proof given in the text is due to W. Wirtinger (Acta mathe-

matica, Vol. 26, p. 255, 1902).

An up-to-date, detailed, and expanded treatment is to be found in N.E. NdrV. lund's Differenzenrechnung, Berlin 1924, especially in chapters II

Chapter XIV. Euler's summation formula and asymptotic expansions.

522

We

already know that this limit exists, from 1S8, 2. Now we have a new proof of this fact, and In addition we have an expression in the form of an integral for Ruler's constant C, by means of which we can evaluate the constant numerically.

From (*) /o

r-

the formula 296,

/i

i.

e.

+-

In integration by parts leads to more advantageous representations. order to be in a position to carry it out, we must first assume that/(#) has continuous derivatives of all the orders which occur in what follows;

we have

then the

an indefinite integral of

to select

and so on.

latter,

By

/

\

\

i

i

"

integral of

shall follow Wirtinger 4

{

n~i

P3

Then -

(x)

J?

2

P

'

oo

1

-p

and an

(x),

set -ii

=

1

We

the further calculations are greatly simplified.

and

P

suitable choice of the constants of integration

for

(x),

l

i

a-

= yo-

has the period

Moreover,

We

1.

P9 (#)

now proceed P.f*)

)

is

value of

continuous

x,

and Po(0)

throughout,

and

to set

S~

=+

P8 '(ic) = P2 (a;)

whence we have and in general

nn

every non-integral

i

n=l

\.*

for

wgyy value

of

x,

P3

(0)

=-=

0,

297. (a)

=

Then, for A l, 2, ..., all these functions are throughout continuous and continuously differentiable, and have the period 1; and we have

for ^, A

=

1, 2,

in the interval

.

.

integral functions.

4

.

(cf.

5^ x

^

136). 1

As

is

and for k

immediately obvious from the proof,

^

2,

the functions

Besides the fact that

Cf. the last footnote.

P x (x) =

x

Pk 2

(x) are rational

in

<x<

1,

we

have, in

5^

x

^

.

2

^ \ __ J?l!. __ *a ( x ) -Q '

Hence

in

=== ^_

'

_?ll

__ j_2

*

!

i

as

a?3

""

L_ J?L

"sT

~*"

1

^1

**

TT

2!

-4

1

5 r 24 i

+

B

g

I

,>.

l!

may immediately be

>

1

w ___720 L_ _ j?L_i.L:r__u ^ 3' 4! ^

~.s

,~3

24

general,

-2ljL*LJL+**. ^ 21 2! 1 ~~

y -r 12

~4

y x \;

1 12

*

pM-_^__ W 2

( V

523

1,

1 2

p ^

A. The summation formula.

summation formula.

Euler's

64.

2!

TF'

/?

^.a

2l

2!

i

__^ I-

established by

n 4 '

41

induction,

B **-* **" P^_^:+ +...4.5* ^ 5t (T^-2)! ^ ^ W n Tf (*^ 9

.

.

^) -I-

*i

21

i)T

or

if

we employ

1O5. These are which play an important part in meet with some of their important

the symbolic notation already used in

the so-called Bernoulli's polynomials

many

investigations

6 .

We

shall

5

,

properties directly. First of

all,

however, we

of these polynomials.

improve the formula

shall

(*)

by means

Integration by parts gives

P

n

>

f'\ JQ

_

r

.

/

/

p

?'

*2

'

6 They first occur in James Bernoulli, Ars conjcctandi, Basle 1713. There the polynomials appear as the result of the special summation problem which will be dealt with later in B 1. y

6

Many

writers call the polynomial

polynomial; others, again, give this

These differences are unimportant.


name

(x)

= (-f B) k

Bk

to the polynomial

the

th Bernoulli

Chapter XIV. Euler's summation formula and asymptotic expansions.

524

and, generally, n -

f PM-I/'**-"

-.

.

-,

(

^

for A I>

1. Hence, for every 0, provided only that the derivatives of f(x) involved exist and are continuous, we can write:

n

\(fn

+f

)

+ if (/' -/.') + If (/'" -/'") + + (W W*"" -/o' *^) + ^*2

where we put )

This

for short.

is

(x)

dx

Euler's summation formula.

Remarks. 1.

Since in the

last integration

by

parts,

namely

the integrated part vanishes, on account of the fact that Pa*fi(w) we may also write

**--

'-=

P2k+i(0)

-

0,

fa* (*)/<*>(*)** o

for the remainder 2.

If

we put

term

in the

F (a +

x

h)

summation formula.

= / (#), the formula takes the somewhat more general

form, in which

F(a)

+

F(a

+

h)

forms the left hand side. The formula of any equidistant values of a function.

+

... -f

may

F(a

+

nh)

therefore be used for the summation'

it is permissible t6 let n -> QO in the summation converges or diverges, we then obtain an expression for the sum of the series or for the growth of its partial sums. The statement is. different (on the right hand side) for every value of k.

3.

formula.

With

suitable provisos,

According as

Zfn

summation formula.

Euler's

64.

R

525

B. Applications.

We

we let k -> oo, k may tend to 0. should then have an infinite series right hand side, into which the sum on the left hand side is transformed. case actually occurs very seldom, however, since, as we are aware (v. p. 237, 4. If

on the This

numbers

footnote), Bernoulli's

The

increase very rapidly.

series

k-1

turn out divergent for almost all the functions / (x) which occur in applications, no matter what n may be. Thus the formula suggests a summation process Jor a Cf. however the example B. 3 below. certain type of divergent series. will

Provided that the differences (f^

6.

/o

/

^ave

t ^ie

same

m

s ign

B

series just discussed is an alternating series, since the signs of the numbers 2\ shall see that, in spite of the divergence, the above-mentioned are alternating.

We

evaluation of the remainder of the alternating series remains valid. ductory remarks to this section.) 6.

k

t

R

fc

is

(Cf. the intro-

The formula will be useful only in the cases where, for a suitable value of small enough to give the desired degree of accuracy. At first sight, we have

only the inequality

S

our disposal for the estimation of R k for k the inequality also holds for k 1, and by 136 at

,

form

I

Pk (x) ^

J

Ft

*J

we

but, as

see subsequently,

can be put in the more precise

I

|

|

2:

it

even values of

for

k.

B. Applications. 1.

obvious that the most favourable results are obtained

It is

when 299.

the higher derivatives of f(x) are very small, and especially when they therefore first choose f(x) == x p , where p is an integer vanish. 1,

^

We

and we have

Here the

series

power of n (by

297

Thus by 1*

b)

t

on the

for

}

(/^

when f

(K)

right

f

hand side

(

)

is

to be broken off at the last positive

vanishes not only

(x) is identically

when /

(/t)

+...

+ (-

1)"

=

0,

but also

equal to a non- vanishing constant.

p transferring n to the right hand side we have

+2

(x)

526

Chapter XIV. Euler's summation formula and asymptotic expansions.

or

since there

on the

2.

The sums

ent way.

is

If

expanded

On

dealt with

is

of

powers

the other hand,

sum

inside the brackets

side

above can be obtained in quite a imagine that each term of the sum

we

in

no constant term appearing

is

hand

right

t,

the coefficient of

we use

if

r

symbolic notation

is

(cf.

differ-

obviously

105,5), the

first

equal to nt

___ = ___ eSt= e

nt

e

1

Hence we immediately

we

put f(x)

e

Bt

_

obtain the expression

for the coefficient of 3. If

e (n+B)t

1

.

=

e ax ,

n

=

l,

we

obtain

or

we can immediately

Since

prove,

by 208,

to zero in this case, provided only that

values of

which

is

remainder tends

2n, we

have, for these

||<

cc,

the expansion stated in

Similarly,

sion

6, that the

115

for

by putting

-cot.

105.

= cos ax, f(x)

n

=

l,

we

obtain the expan

64.

4. If

we

Euler's

put f(x)

B

r ^-----_i_ Since here

we may

summation formula.

= y-r

M

>

1),

/ (

5J oo ,

by replacing n by (n

have,

M

*/i

2M 1

let

we

,

627

B. Applications.

just as

on

p.

521 above, we obtain the

following refined expression for Eulers constant:

In this case the remainder certainly docs

creases ; and the series J the corresponding

series

J^T^M

2

*

as A in-

so rapidly that even

diverges rapidly,

-5

power

not decrease to

diverges

everywhere;

for,

by 136,

Nevertheless,

expression

we can

(cf.

evaluate

Rem. 6 ).

C

we

If

very accurately by means of the above take e. g. k 3 , we have, in the first

=

instance,

(a)

120

we

take only the part of the integral from x absolute value of the error is If

*

f

71 '

(2jr)'J

=1

= 4,

the

given by the

first

to

x

^ _~ _J'li_ a;

8

7

(2

jr)

.7-4'

4

Hence 4

where

i> 1

The

required

evaluation

formula written down, for

of

the

n = 4,

integral

is

also

namely

1459 2520

1,__1___L_4__J_ __2-4 252-4 12- 4 120-4* '

a

"*"

"

Chapter XIV. Euler's summation formula and asymptotic expansions.

528

Hence 0-5772146

and

C

with much greater accuracy than easily obtain to The reason any degree of accuracy whatever. theoretically

we can

In this way before,

< C < 0-5772168.

for this favourable state of affairs lies solely in the fact that the logarithms as known. 5.

We now

=

%

of

first

log 1

regard

+

x) and proceed just as we did in log (I on pp. 525 7. If we again substitute (n 1) for from 298 with k obtain, 0,

put f(x)

the previous examples

n we

we may

all

=

+ log n = /log xdx + l\ogn+f

+ log 2 +

^

dx

or log n

=

!

+ 1) log n -(n-l)+f -^ d x.

(n

i

Integrating

by

parts,

we have

1

1

which shows that the

integral converges as

log n

(*)

\

==

(n

+

2 ) log

n

n -> n

oo.

Hence we can put

+ ym

and we know that lim

exists.

Its

value

2 log (2

4

is

.

.

.

yn

=Y

obtained as follows: 2 n)

by

(*)

we have

= 2 n log 2 + 2 log n\ = 2 n log 2 + (2 n + 1) log n 2 n + 2 ya = (2 n + 1) log 2 n 2 n log 2 + 2 yn

and log (2 n

By

+

subtraction

1)

I

=

(2

n

+

1) log (2

+ 1) - (2 +

1)

+ y 2n+1

.

If

let

we now n

*oo,

summation formula.

Euler's

64.

transfer the term

we know, from log

J/%

-=-

log (2

+

w

B. Applications.

1)

hand side and

the left

to

529

Wallis* product (219, 3), that

= - 1 + 1 - log 2 + 2 y -

so that

Y

Hence,

log!

(**)

= log v~2i*

.

we have

finally,

=

+

n

logn

-n

n multiply by M, the modulus of the Bnggian logarithms (pp. 256 and denote the latter logarithms by Log, we have If

we

Logn! = (*+

^Logn-nM+Logv/ITi-Mj

7),

^^) dx.

n Tfcis gives, e. g. for

n

Log 1000! -

=

1000,

3001-5

- 434-29448

. .

+ 0-39908 ... - M

.

.

I

AM d*.

1000

Since

x

iooo

1000

1000 " _

(2 w) it

'

1000

^-__ < 10000

'

follows that

Log 1000 = 2567-6046... 1

<

a number with 2568 10~ which begins with the figures 402 .... Just as in the previous example, we can now improve our result (**) considerably by means of integration by parts. Since

with an error

4

in absolute value, so that 1000! is

digits,

after 2

k steps

we

obtain

f j As here the remainder w 2 *, we can

divided by

(for fixed k)

is

less

than

a certain constant

also write the result in the form

Chapter XIV. Euler's summation formula and asymptotic expansions.

530

A n 's

(i. e. for every fixed k) form a bounded sequence. form is usually known as Stirling's formula 7 6. If we take the somewhat more general form f(x) = log (y -\- x\ where y > 0, Euler's formula for k gives, to begin with,

in

which the

The

always

result in either

.

=

log y

+ log (y + 1) +

.

+ log (y + n) = (y + n) log (y + n)

. .

n

n

-y logy +

*

(ig (y

+

)

+ logy} +

Hence we can obtain a corresponding expression

for the gamma-function 385 and pp. 439 40) as follows: subtract this equation from the v equation (**) in the last example, add log n to both sides, and we obtain

(v. p.

+ log6 VTu - Jf y + x d*- J <*>

Pl

(x)

x

dx.

n

!->

oo , this relation

becomes 00

log

r (y) = ( y - 1)

log y

- y + log V2^ f-*_

dx.

By integrating this expression by parts 2 k times (or by at once using Euler's formula for any value of k), we deduce the following generalized Stirling's

log

T

formula

8 :

= y

(y)

log

y + log

y

1 #2 1 + 372 J + 3~5 y I

^*1

3

7.

We now

As we have case s

=

,

^5,

where

>

5C

and

5

is

arbitrary.

1, 2, ..., and the already dealt with the cases 5=1, s from any of consider different we shall as trivial, being

If

we

y. Stirling,

again replace n by (n

log

x

y

Methodus

differentialis,

London

+

is

log (x -f a)

+

log (x

+

2 a) -f

Euler's formula

1),

log V~2 it was not discovered Stirling (loc. cit.) gives the formula for the

that the constant 8

(1

is

these values.

7

=

put f(x)

1730, p.

till

135.

+

log (x

+

n

gives

But the

later.

sum . . .

now

a).

fact

04.

Euler's

summation formula.

The

C.

/.

1 *- 1

l

~

(

s

B-zk ( s 2k

If s

>

we

1

can

let

w ->

oo,

evaluation of remainders. 1

\

/I

1

531

-\

+V 2 UiL ___ n*+ *2k / \

n-0 + + 2* -

,

2 (n-

l 2

1

\

and we obtain the following remarkable ex444 6, and 491-2): (cf. pp. 345,

pression for Riemann's ^-function

+ 2k -

2k-

Since the right hand side has a meaning for

s

>

2 &, 5

I

and since

=f= 1,

k can take any positive integral value whatever, we immediately infer from the above the details of the proof belong to the theory of complex functions

is

that

an integral transcendental function

(cf.

p.

492, footnote 61).

Further

this expression gives the values

and for

=

s

p

(p a positive integer),

if

we suppose

that 2 k

>/>:

---ri-i-*+*(-.')+*(~V Here the

series terminates of itself,

--

____ L_ n ^ />

where the

+

1

^

4- B)v+l ;

last step follows

and we can write

= __ -*WP + P

from the

fact (v.

106) that

= 0. C.

The

The

evaluation of remainders.

evaluation of the remainder in Euler's formula, which for prac-

purposes is particularly important, we have avoideii hitherto. Now, however, the question becomes imperative whether we cannot formulate some general statement as to the magnitude of the remainder in Euler's tical

532 Chapter XIV. Euler's summation tormula and asymptotic expansions. It may be shown that, very generally, the remainder same sign as, but smaller in absolute value than, the first term neglected, i. e. the term which would appear in the summation formula, if we replaced k by k -f- 1. This will, moreover, always be the case if f(x) has a constant sign for x > and if f(x) and all its derivatives tend monotonely

summation formula. is

of the

as

to

x

+ oo.

tends to

In order to prove

y = Pk

We

(x),

^

&

2,

in

we must examine

this,

the interval

^ ^ x

the graph of the function

somewhat more

1,

closely.

of the type represented in Fig. 14; 1, 2, graph k remainder as leaves the 1, 2, 3, or 0, when divided by according assert that the

is

3, 4,

4.

Fig. 14.

More

precisely,

we

odd

assert that the functions with

three zeros of the

first

two zeros of the

first

More shortly: P^ (x) P^+i (x) is of the type

functions have the signs shown in the graphs. of the type of the curve ( - I)*"1 cos 2 TT x and 1 I)*" sin 2

(

have exactly

,

is

of the curve

suffixes

1, but those with even suffixes exactly 0, order within the interval, and, moreover, that the

order at

TT

x.

These statements are proved directly for the suffixes 2, 3, 4, by using the methods which follow, or they can be deduced from the explicit formulae on p. 522. We may therefore assume that the assertions arc proved up to P2A (#)> ^ == 2, inclusive. 0, J, 297, that PSA*! (*) vanishes for x

=

so that P2A+1 (x)

Thus

if

is

It

is

immediately obvious, by

and

1,

also that

symmetrical with respect to the point x

= g,

y

= 0.

P2A+1 (*) has another zero, it must have two more at least, i. e. and P%\(x) must have at least four zeros by Rollers theorem

five in all, (

in

19,

theorem

<x < g

8),

is

as that of -82 A >

which

is

contrary to hypothesis.

the same as that of PSZA+I (0) i-

e.

the sign

is

given by

= PZA (0), 1

(

The

I)*"

.

sign of P2A+1 (x) that

is,

the same

Euler's

64.

summation formula.

Since P^A-HI (*)

<x

in

<

:

1,

= PZX+I (#),

namely

at

-

x

C.

P*\

\

2

The

only one stationary value

(x) has

Its value

. fc>

evaluation of remainders. 533

PgAf

i>

f

J

must have the opposite

PZ\M(X) would have a constant sign and consequently we should have

sign to P;sA+2(0), for otherwise

^ ^ x

1,

J

which

Pan 2

(*)

/*

-

[P2A.3

in

4= 0,

(*)] J

certainly not the case, because of the periodicity of our functions. since 2 A+2, i. e. the sign ( Finally, PgA+aCO) has the same sign as 1)\ 9 all our assertions are now established . Since is

#

P2A

(x) is

Now,

symmetrical with respect to the if

h

line

-

x

=

.

and monotone decreasing function

(x) is a positive

for

x

*+i J

P2A -n (*) h(x)dx

(p an integer

^ 0,

^ 0),

p

obviously has the sign of P2A+1 (x) in For, that

<#<

i.

2,

on account of the symmetry of the graph of h (x) decreases, we have

e.

the sign

P2 Ahi (x)

(

1)

and the

A~ 1

.

fact

Hence

A" 1

also has the sign of (

A

nating,

if

when h

(x) is

Now

0,

1, 2,

always

1)

...

less

we assume

,

so that, in particular, the signs are alterexact opposite signs occur, of course,

The

.

than

and increasing.

^

is defined for x 0, and, together with as a: -> oo, each of these derivamonotonely to 2 * +3 > tives is of constant sign 10 and /<2*+D (x) has the same sign as/< (x). The remainder in Filler's summation formula is given by

all its

if

that f(x)

derivatives, tends

,

(*)<**

9 The fact that only zeros of the immediately from the relation

first

order come under consideration follows

-PlUiM-P*W. 10

The

onwards 18

is

possibility that one of these derivatives to be included here.

is

always

=

from some point (051)

Chapter XIV. Euler's summation formula and asymptotic expansions.

534

Rk

Hence

R

and

h + 1

have opposite signs, and therefore

we

have the same sign, and

Now, by

Euler's

whence

it

summation formula,

this is the "first

the sign of >

. . .

Rk

-

2 *

+

2)

_

/(

'O

!

term neglected", so that

whereas

,

_

-

* k+l

(

Rk

-

follows that , k

But

Rk+ i)

and (Rk

have, moreover,

!.-.-

= (/o

**

Rk

its sign also is the same as absolute value exceeds the absolute value of

its

q. e. d.

Thus we have

Theorem

300,

the is

Iff(x)

:

defined for

as

tends monotonely to

tives,

stated in the simplified

x->

x

^ 0, and, together with all

its

deriva-

summation formula may be

oo, Euler's

form

o

r(2*

A2k

1)

B

IK

,

2jc

,

2

\

r(2k

r('2k+l)

\

IK

o
in this form the series (divergent in general), of which the few terms appear on the right hand side, effectively possesses the characteristic property of alternating series (mentioned on p. 518) which first

is

particularly convenient for numerical calculations.

Remarks and Examples. 1.

As Cauchy remarks,

mentioned

is

the characteristic property of alternating series just

exhibited by the geometrical series

c

+

t

c

2

c9

-h

^

c3

h

.

. .

not only when it converges, but for arbitrary (positive) c and it with the remainder, i. e. in the form

it is

side

c

, '

t.

For,

> if

0,'

*

we

>

0,'

write

true without exception. For any (positive) c and t, the value of the left hand th is represented by the n partial sum, except for an error which has the sign

of the

first

If

we

term neglected, but is less than this term in absolute value. carry out this process with the fractions

_ __ 4

v*

w

-f t'

_ \(2

IT)'

"*"

(2 v w)

(2 v

w)

65.

Asymptotic

535

series.

and add, we see that the value of 2

for every

t

>

is

also equal to the

where

_ (2*

,

.

(2)!

+

2)!

known about ^ is that it lies in the interval ... 1. we now multiply by e~ xt and integrate from to + oo, it follows,

all

If

'"

4T

21

sum

that

is

since

that oo

1 /Y --

J

\e*

1

'^V *

~"t

2J

x

"t

3

J

(2 2.

By

k

-

+

1) (2

k

_ +

.

t

<


2)

the function

B.

-

log*

-

*

-f log

can be equated to the expression found in 1, for the remainder term used in replaced by the one just written down, by 300. But wj may not conclude from this, without further examination, that also

B.

ti

may be

00

-*+

f( 1

log

1

gt

I

We

have indeed proved that both sides agree very closely for large 301, 4). values of #; but we may not conclude from the previous considerations that they are actually equal for any value of x. (In fact, however, the equation written above (cf.

is true.)

Just as before, we can also briefly evaluate the remainder in the examples of section B., from the fact that the remainder has the same sign as, but For it is immediately is smaller in absolute value than, the "first term neglected". obvious that the functions / (x) used in these examples satisfy the hypotheses of the 3.

4, 5, 6, 7

theorem 300.

65. Asymptotic

We now

series.

return to the introductory remarks of

The

64, A.

which we obtain from Euler's summation formula

in

series

examples 4

7,

by continuing the expansion to infinity instead of writing down the In the cases when they are power series in remainder, are divergent. - or -,

we can

say,

more

precisely, that they are

In spite of everywhere. practice, since examination of the

diverge

corresponding to a particular partial

this,

they

remainder

sum

is

power

can

be

shows

smaller in

series

which

employed

in

the

error

absolute

value

that

536 Chapter XIV. Euler's summation formula and asymptotic expansions.

and of the same sign as, the first term neglected. Now at first these terms decrease, and become even very small for large values of the variable; it is only later on that they increase to a high value. Hence the series can be used for numerical calculations in of its dithan,

spite

with limited accuracy, to be sure, but with an accuracy often close enough to be sufficient for the most refined

vergence;

which

is

practical

Astronomy in particular) 11 Moreover, the larger the variable is, the more readily does the series yield the results just mentioned. More precisely: if (as in B, 5 and 6) the expansion obtained from Euler's summation formula is of the form purposes

(in

not only do

as

x~*oo,

.

we have

for every fixed k, but

even

A

general investigation of this property of the expansions was lade almost simultaneously by Th. J. Stieltjes 12 and H. Poincard. bllowing the older usage, Stieltjes calls our series semi-convergent,

term which emphasizes the fact that so far as numerical purposes concerned they behave almost like convergent series. Poincare,

re

n the other hand, speaks of asymptotic series y thus putting the lastlentioned property, which can be accurately defined, in the foreground. 'he older term has not held its ground, although it is often used, specially in astronomical literature. The reason is that it clashes with le terminology which is customary, particularly in France, whereby

We

ur

conditionally convergent series are called semi-convergent. therefore adopt Poi ncar&'s term, and we proceed to set up the blowing exact hall

11

ic left

Euler, who makes no mention of remainders whatever, frankly regards hand side of as the sum of the divergent series on the right hand

298

1/97?

Thus he writes Css-jr-f-^-f-^-l-... without hesitation, on account of fi It 4 299, 4. This interpretation is not valid, however, even from the general view64 have provided no process by which point of 59, for the investigations of the sum in question may be obtained from the partial sums of thq series by a convergent process, as was always the case in Chap. XIII. 12 Recherches sur quelques series semi-convergentes, AnStieltjes, Th. /. nales de I'Ec. Norm. Sup. (3;, Vol. 3, pp. 201258. 1886. w Poincave, H.: Sur les integrates irregulieres des Equations line'aires, Acta mathematica, Vol. 8, pp. 295344. 1886. side.

65. Asymptotic series.

A

Definition.

not converge for (or expansion)

series of the

a function F(x)

ciently large positive value of x,

as x

*

oo:

-f-

+ ^+^H----

and we

if,

need

(which

an asymptotic representation

value of x) is called

any

of

form ^o

537

which

is

defined for every

for every

n

(fixed)

suffi-

= 0, 1, 2,...,

shall write symbolically

Remarks and Examples. 1.

Here the

coefficients an are not

need ^~ x

the series

not converge.

bound

to satisfy any conditions, since

They may be complex,

in fact,

if

F(x)

a complex function of the real variable #. The variable may also be com--- conplex, in which case x must approach infinity along a fixed radius am x stant; for the asymptotic expansion may be different for each radius. In what follows we shall set these generalizations aside and henceforward suppose alJ the quantities to be real is

On

the other hand,

it

frequently happens that the function F(x\

is

defined

for integral values of the variable only; e. g.

+

1

2*

+

.

.

.

+

*P,

1 -j-

\ *

+

. . .

+

1 x

.

In such cases we shall usually denote the variable by k, v, n, . Then F(x) simply represents a sequence, the terms of which are asymptotically expressed as functions of the integral variables. .

the series JjJ-J does converge for x

2. If

#> R,

.

and represents the func-

is obviously an asymptotic representation of F(x) in this Thus .examples of asymptotic representation can be obtained from

tion F(x), the series

case also.

any convergent power

series.

3. The question whether a function F(x) possesses an asymptotic representation, and what the values of the coefficients are, is immediately settled

in theory

must

by the fact that the successive limiting values

exist.

In fact,

(for a;-*--f-oo)

however, the decision can seldom be made in this way, show that any function can have only one

simple considerations asymptotic expansion. but

these

4.

On

the other hand, for f(x)

= e-* a?>0, t

all

the an 's are zero, since

301.

538 Chapter XIV. Euler's summation formula and asymptotic expansions.

#5^0, when x >oo. Thus

for every integral

^

a

.

.

which shows that different functions may have the same asymptotic Thus, if F(x) has an asymptotic representation, e. g.

result

expansion.

have the same asymptotic representation. It

was

mentioned 5.

in

for this reason

3OO, 2 were

that

we

could not inter that the two functions

identical.

Geometrically speaking, the curves

y=o +

+ ...-f- X

X

and

have contact of at least the n** order at n increases.

= F(x)

y

and the contact becomes

infinity;

closer as 6.

For applications

it is

advantageous to use the notation

F <*)~/(*) + g (*) (00+

2*

+

a xl

+

...),

where / (x) and g (x) are any two functions which are defined for sufficiently large values of x and such that, further, g (x) never vanishes. This notation is intended t

essentially to express that

Some of the examples worked out in 64, B may be regarded as giving the asymptotic expansions, in this sense, of the functions involved, for we may now write

B ._- B'. ...1. .1 C + ^--2 + s + ... + ~log +,>-,,! T --...; l

b)

logn!~ (n +

c)

iog(r(*~

I

t

,

a)

I)

logn

(*

1)

- + log V~2 +

log*

|?| \

- * + iog\/^ +

__ \ln

2

In the

t

1

;j

last

formula

we must have

s 4= 1

;

for i

=

1

it

+ f^ ^ + *

^

.

. .

;

+ 3^4-^ *-;

_ 4

3

n*

becomes the expansion in

a).

65.

Asymptotic

539

series.

Calculations with asymptotic series. In just as It

many respects we can make we do with convergent series.

calculations with asymptotic series

immediately obvious that from

is

and C(*) there results the expansion

where

cc

It

and

are any constants.

/?

almost as easy to see that the product of the functions also

is

possesses an asymptotic expansion, and that

if,

as in the case of convergent series,

"(A is

set equal to cn

if

by

e

.

== e and (x)

x+-\-oo.

But

For,

77

=

in this

+ "A-iH-----hA

by hypothesis, we may write

v\

we denote we have

(x)

case

(for fixed

functions which

tend to

ri),

as

.G(*)-(i^ at

(b n

,

'

and

this

-1

-

*

t

a:

obviously tends to

Repeated

,.

as

x

,

,

"r"""t"

>-{-c

application of this simple result gives

Theorem 1. // each of the functions possesses an asymptotic representation, and if

F

F% (x), ..., Fp (o;)802. g(z.L> z^, -, zp is a polyl

(x) 9

]

any rational anticipate what immediately follows function whatever, of the variables z l9 *3 , ..., zpt then the function nomial, or

if

we

540 Chapter XIV. Euler's summation formula and asymptotic expansions. also possesses an asymptotic representation; and this is calculated exactly as if all the expansions were convergent series^ provided only that the denominator of the rational function does not vanish when the constant terms of

z lt # 2

the asymptotic expansions are substituted for

,

.

.

,

,

#.

Further, the following theorem also holds:

Theorem

2.

If g (z)

with positive radius r y if

and

as

if

\

a

which x ->


\

and

.

+ a n zn +

.

.

.

is

a power

and

this is

since \

aQ

\

series

the asymptotic representation

a function

the function of

an d

>

Proof.

.

.

obviously defined for every sufficiently large x, since

is

+

sentation,

= a + 04 z +

F (x) possesses


also possesses

again calculated exactly as if

F (x) ->

#

an asymptotic repre-

2 x-^

were convergent.

In order to calculate the coefficients of the expansion of

> R, say, we have to set F (x) = a + /, < r we obtain, in the instance, assuming only that a + &/* + g (F) =- s K + /) = A, + J8i/+ (*) Z ^ converges

when

for |

x

Q

Q

first

\

.

- .

. . . ,

where we put

& is

= 0,1,2,...)

<

T (*) converges whenever |/(#)| |ol of the case for value x, whether certainly every sufficiently large

This expansion

for short.

which

(*

2 ^converges

or not, since in fact /(#)->() as

with the part of theorem

we deduce

1

x ->

oo.

In accordance

which has already been proved, from

the asymptotic expansion (*>

(*>

(**)

for every

k

=

1, 2, 3,

.

. .

.

Here the quantities

'

a^

have quite definite

values, obtainable by the product rule for asymptotic expansions (i. e. must now substitute these expansions (**) as for convergent series). in (*) and arrange the result formally (i. e. again just as if the series (**)

We

05.

were convergent) form

+

*+

coefficients are given

It

remains to show that 27

is,

that the expression

~

541

series.

Thus we

powers of

in

4. where the

Asymptotic

obtain an expansion of the

+

by

an asymptotic expansion of

is

<J>

(#),

that

_ [*(*) tends to

Now tend to

n as # ->

for fixed if

ex

= E! (#),

as JC->QO,

oo.

^e

e2

2

denote certain functions which

(#)

from

follows

it

(*)

and (**) that

n x Hence, since /n+1 may be put equal to ^

,

and our assertion follows

at a glance, for the expression in the last

bracket tends to

x

as

j& n+1

-*-

+ oo,

and the

(finitely

numerous)

square tend

v 's

to 0.

Taking g

and replacing

~r

(z)

F (x)

as a particular case, provided only that a

__

_1

_a

^ Jl

F(v)

a'

i

*

1

,

ai

2

X -r

={=

qu q a 3

by

F (x)

,

it

follows

0, that 1 ,

jc

2

^"

Hence we "may" divide by asymptotic expansions with non-vanishing constant terms;

this

Taking g (z) =

In particular,

completes the proof of theorem 1. we obtain, without any restrictions,

ez y

we may n

Term^by-term suitable provisos. 18

-

write,

integration

We

11

by 299,

r

and

5,

139

differentiation

1

are

also

valid

have (051)

with

Chapter XIV. Euler's summation formula and asymptotic expansions.

542

Theorem for x ;> #

,

3.

F (x) ~ aQ +

If

--

+ ^J +

and

. . .

if

F (x)

is

continuous

then

If F (x) has a continuous derivative, and if F' (x) is known to possess an asymptotic expansion, then this expansion may be obtained by differentiating term-by-term,

~

1F' (x^ (X)

Proof.

Since

l

X

t

e.

i.

2~

2 a*

("

2

)

set

F(/)-*

- /-...--^ =

an ~ l

....

-

-> a 2 as

t

+

->

oo

the integral

,

exists for

x ^> XQ

^ (^1,

fixed),

where

e(/)| in

#f^f

which defines the function *P(x) always fl

-])

^

*l

a

{F (t)

"~

.

X3

Further,

.

we may

e(0->0

as

/->+oo. Hence

Now

if

e(#) denotes the

maximum

-

# n multiplication by x c (#) ->

also

as

|

and since the

increases ; it

value of

last

integral

<+> then ^

C

nxn,

after

likewise tends to 0.

Now

if the derivative F' (#), an expansion asymptotic possesses

which

is

continuous for

x ^>

.r

,

we have X

log* where

C19 C3

+C -

=^=

By what we have

just proved, and beasymptotic expansion uniquely, it follows and that bn 1) an _ 1 for n ^> 2. (n

are constants.

cause a function defines that &

3

its

=

The expansion

exemplifies the fact that F'(#) need not possess pansion, even when F(x) does.

an

asymptotic

ex

543

66. Special cases of asymptotic expansions.

Theorems

3 lay the foundation for Poincarffs very fruitful 1 14 of asymptotic series to the solution of differential equations . applications detailed account lies outside the plan of this book, however, and

A

we must content of

by giving an example

ourselves

of

this

application

asymptotic series in the following section.

Special cases of asymptotic expansions.

66.

The use

expansions raises two main questions: whether the function under consideration question possesses an asymptotic expansion at all, and how it is to be found in a given case (the expansion problem); on the other hand, there is the question how the function, or rather, a function, is to be found, which is represented by a given asymptotic expansion (the summation problem). In the case of both questions, the answers available in the first

there

is

of

asymptotic

the

present state of knowledge are not completely satisfactory as yet, for although they are very numerous and in part of remarkably wide range, they are somewhat isolated and lack methodical and funda-

mental connections.

This

section

collection of representative the two problems.

1.

From

functions

seldom out.

therefore

Examples

the

theoretical

of the expansion problem.

point of view, the expansion of given dealt with in the note 301, 3; but it is only

the required determinations of limits can also fails if lim (x) does not exist,

that

rather of a

consist

examples than of a satisfactory solution of

A.

was thoroughly

will

F

The method

all i.

e.

be carried if only an

->QO

asymptotic expansion in the more general sense mentioned in 301, 6 can be considered. It is only when f(x) and g(x), the functions involved, have 2.

We

been found

have

from Enter' s

learned

summation

that

we

can proceed as in 301,

3.

that

asymptotic series very frequently arise formula: but there it is not so much a

of expanding given functions as that by special choice of the function f(x) in the summation formula we are often led to valuable

case

expansions. 3. As we have already emphasized, hitherto perhaps the most important application of asymptotic expansions is Poincarfs use of them in the theory of differential equations 14 The simple fundamental .

14

A

very clear account of the contents of Pomcar&s paper, including alJ is given by E. Borel in his "Lecons sur les series diver-

the essential points,

gentes"

(v.

303

644 Chapter XIV. Euler's summation formula and asymptotic expansions. idea

this

is

where if

suppose we know

:

y= F

that

(a?)

and

its first

the expansions for 3, from the first one,

satisfies a

Now

Theorem

n

derivatives all possess asymptotic n follow, by 302 y', y", ..., y< >

representations,

we

= F (x)

denotes a rational function of the variables involved.

we know

If

a function y

that

w th order

equation of the

differential

substitute these expansions in the differential equation, in accord

3O2, Theorem

ance with

the

for

0,

the

equations

all

1,

obtained

tions, the coefficients

in

we must

obtain an expansion which stands From which must therefore vanish.

of

coefficients

this

way,

together with

and hence the expression

for

the

F(x)

initial

condi-

are in general

found.

Thus

which

e. g.

the function

defined for x

is

>

0, has for

its

derivative

X that

the differential equation

satisfies

it

is,

1

for

>

x

here exist

It

.

but we cannot give the details directly has only one solution y such that y and y' and have an asymptotic representation. If we

may be proved

that this equation

x

for

> XQ I>

accordingly set

y~o + + 3-+-'

so that

-S-

we have

whence *o

We

y '^_||._y?_...;

the equations

it

=

follows that >

i

= l>

a

=

1, ...,

fl

n+1

=

n l)

(

therefore find that _,,

x

* F(x) \ /

1,2! ~ --;rH-- --r-H-X x x x* 3!

1

2

=-

B

,

.

n! .....

66.

4.

The

Special cases of asymptotic expansions.

545

function in the previous example can be asymptotically

expanded by another method, which u x, we have put t

is

= +

frequently applicable.

If

we

GO

u

e

du.

o

Here, by Cauchy's observation

for all positive values of

Thus we have 5.

there,

If

/(w)

and

if

3OO,

(v.

x and u.

It

l),

we can

put

follows that

again found the expansion in the last example is

a function

which

is

defined for

u^O

and

15 .

is

positive

the integrals

J/ ()-i

exist for every integral

n

^

1,

<*

we

= (- !)-'

.

similarly obtain the asymptotic expan-

sion

for the function

partial sums of this series represent F(x), except for an which is less in absolute value than the first term neglected and is of the same sign as the latter. Expansions of this kind have been investi10 gated especially by Th. J. Stieltjes (For further particulars, see below,

Moreover, the

error

.

B, p. 549.)

"The

function e~*

F (x) = f x

=

-^>

which becomes

~jf j^~

with the

transformation e~ i e~~*. v, is known as the Logarithmic-integral function of y 16 Recherches sur les fractions continues, Annales de la Stieltjes, Th. J.: Fac. des Sciences de Toulouse, Vols. 8 and 9, 1894 and 1895.

Chapter XIV. Euler's summation formula and asymptotic expansions.

546

Certain methods requiring the more advanced resources of the functions date back to Laplace, but have recently been ex-

6. ,

theory of

tended by E. W. Barnes, H. Burkhardt 18 0. Perron 19 , and G. Faber 20 We cannot go into details, but must content ourselves with the following remarks. Barnes gives the asymptotic expansions of many integral .

,

functions, e.g.

n \(n+&}' (*

^

>

~~ 1 * ~~ 2

'

and

"")'

similar func '

Besides the expansions we have met with, O. Perron obtains as examples the asymptotic expansion in terms of n of certain integrals which occur in the theory of Keplerian motion, such as tions.

+a

J From our

point of view

e n(t-esmt)i

it

l-.cogf

is

dt

'

lo


,

w an

noteworthy that in these examples the

terms of the expansion do not proceed by integral powers of fractional powers.

Thus

the expansion of C(ri)

of the

is

This suggests another extension of the definition 301, we shall not discuss.

Numerous

integer),

additional examples

of asymptotic

6,

,

but by

form

which, however,

expansions

of this

kind, in particular those of trigonometrical integrals occurring in physical and astronomical investigations, are to be found in the article by H. Burk-

"Uber trigonometrische Reihen und Integrate", in the Enzyklomathematischen Wissenschaften, Vol. II, 1, pp. 815 1354. der padie hardt:

21

An

and was expansion, which was first given by L. Feyer 22 subsequently treated in detail by O. Perron , is of a more specialized nature; its object is to deduce an asymptotic representation for the 7.

,

t

coefficients of the 17

1

"X 9

or,

more gener-

The Asymptotic Expansions

of Integral Functions defined Trans Roy. Soc., A, 206, pp. 249297. 1906. Burkhardt, H.\ Ober Funktionen grofier Zahlen, Sit/ungsber. d. Bayr.

Barnes. E. W.:

by Taylor's 18

expansion in power series of e

Series,

Phil.

111. 1914. t)ber die naherungsweise Berechnung von Funktionen grofier Zahlen, Sitzungsber. d. Bayr. Akad. d. Wissensch., pp. 191219. 1917. 20 Faber, G.: Abschatzung von Funktionen grofier Zahlen, Sitzungsber. Akad.

d.

19

Wissensch., pp.

Perron,

O.'.

Wissensch., pp. 285304. 1922. in a paper in Hungarian. 1909. 22 Perron, O.: t)ber das infinitare Verhalten dcr Koeffizienten einer gewissen Potenzreihe, Archiv d. Math. u. Phys. (3), Vol. 22, pp. 329340. 1914. d.

Bayr. Akad.

d.

Fejer, L.:

Special cases of asymptotic expansions.

06.

ally,

of ^/d-*) 9 , where Q

^= Z I k^o

where the

>

*

(*

J= +

*-

a

1

l

+ c, & +

x

c,

'

once find that

at

have the values

coefficients cn

-Z

cn

For these Perron showed 24 expansion of the form

*~

> 0. We

and a

54:7

(

\"-

~~v-l

a"

l

\ I/ 'I' 23

work

in a later

Al + \

V

~

n

,

that they have an asymptotic

*

*

*i

^ + v^ + 7* + i

.

,

'

\

8. Finally, we draw attention to the fact that the asymptotic representation of certain functions forms the subject of many profound inIn fact, our examples vestigations in the analytical theory of numbers.

301,

6, a, b,

and

belong to this

d,

class, for

the functions expanded have

meaning only for integral values of the variable in the first instance. Just to indicate the nature of such expansions, we give a few more examples, a

without proof: a) If T (n) denotes the number of divisors of

n,

+ (2 Cwhere all

that

C is

is

26 practically Regarding the next term lower in degree than n~% but not lower than

25

Euler's constant

known

is

that

.

it is

,

n~*.

b) If a (n) denotes the a (l)

+

q(2)

sum

+

of the divisors of w,

.

+

(*)

^

tr"

^

_

.

23 perroftt o. tJbcr das Verhalten einer ausgearteten hypergeometrischen Reihe bei unbegrenzten Wachstum eincs Parameters. J. reine u. angew. Math. :

Vol. 151, pp. 24

An

6378.

1921.

elementary proof of the far log cn

less f*+*

2

complete result

Van

given by K. Knopp and /. Schur: Elementarer Beweis einiger asymptotischer Formeln der additiven Zahlentheone, Math. Zeitschr., Vol. 24, p. 559. 1925. 26 t)ber die Bestimmung der mittleren Werte in Lejeune-Dirichlet, P. G. der Zahlentheorie (1849), Werke, Vol. II, pp. 4966. 20 Hardy, G. H. On Dinchlet's Divisor Problem, Proc. Lond. Math. Soc. is

:

:

(2), 15,

pp.

115.

1915.

Chapter XIV. Euler's summation formula and asymptotic expansions.

54:8

c) If

to

9

denotes the

(ri)

9

d) If

In

TT

all

number

of numbers less than n and prime

_+

9

--

it,

(ri)

+

(1)


(2)

denotes the

these and in

+

^ _3 n + .

..

f

number of primes not

similar cases,

many

Hence

exists.

complete asymptotic expansion

it

is

greater than w,

known whether a we have

not

the relation which

down only means that the difference of the right and left hand of smaller order, as regards n y than the last term on the right hand

written sides

(n)

is

side. e) If

p

(n)

denotes the

partitioned into a

sum

number of

different

In this particularly difficult case G. H.

by means

ceeded

of

profound

very

expansion to terms of the order

B.

ways

Examples

Hardy and

S.

investigations

still

more

in

28

continuing

sucthe

.

summation problem.

of the

and lacking

isolated

,

--

an assigned, everywhere divergent series

tion are

27

Ramanujan

Here we have to deal with the converse question, 304. function F(x) whose asymptotic expansion

is

which n may be

in

of (equal or unequal) positive integers

2

^.

that of rinding a

The answers "to

this ques-

in generality than those of the previous

division.

When

the function

"sum*

as the

1

F (x)

is

found,

of the divergent series

it

2

has some claim to be regarded in the sense of

becomes more and more

closely related to the partial

as their index increases.

This

however, since, as 17

E. g.

(4)

we

= 5,

59, since

sums of

it

the series

the case only to a very limited extent, have already emphasized, the function (x) is not is

F

since 4 admits of the five partitions:

4,

3

+

1,

2

+

2,

and 1 + 1 + 1 + 1. Hardy, G. H., and S. Ramanujan: Asymptotic Formulae in Combinatory Analysis, Proc. Lond. Math. Soc. (2), Vol. 17, pp. 75115. 1917. See also Rademacher, H.: A Convergent Series for the Partition Function. Proc. Nat. Acad. Sci. U.S.A., Vol. 23, pp. 7884. 1937. 29 When the series converges, the required function is defined by the series 2

+ 1 28+

itself.

1,

549

Special cases of asymptotic expansions.

66.

defined uniquely by the series. Thus the question how far F(x) behaves like the "sum" of the series can only be investigated in each particular case a posteriori. 1

We

.

The most important advance in this direction was made by Stieltjes 30

saw above

(v.

A,

5),

that a function given in the

=

F(X')

m+ du

J x

^

possesses the asymptotic expansion

(-

(*)

#3

,

.

for

n

=

we

if

Conversely,

=

1

I)"'

.

form

u

which

in

//()

are given the expansion

"-'

d u,

2 a~,

(n

=

1, 2, 3,

.

.

.)

with coefficients a l9 a 2 ,

and if we can discover a positive function f(u) defined in u > 0, a 2> #31..., for which the integral in (*) has the given values a l9 .

.

,

1, 2, 3,

.

.

. ,

then the function

will be a solution of the given summation problem, by A. 5. The problem of finding, given a n> a function f(u) which srtisfies the set of equations (*) is now called Stieltjes problem of moments. Stieltjes gives the necessary 9

be capable of solution, and, in particular, one solution, with very general assumptions. In particular, if/(w), and hence F(x), is uniquely determined by the problem

and

sufficient conditions for it to

for the existence of just

of are

moments more

such a

justified in claiming

instance as

its

a 2 #n

is

F (x)

as a

-

series

called a Stieltjes series for short J

sum of the

we

divergent series 27 ~^, for

S-sum.

Lack of space prevents us from entering into closer details of these An account which includes everyvery comprehensive investigations. thing essential is given by E. Borel in his "Leons sur les series divergentes", which we have repeatedly referred the series X

/4A (t)

"+ 1!

l

to.

2!

As an example, suppose we

are given

- 3! + -----

80 Loc. cit. (footnotes 12, 16), and also in his memoir, Sur la reduction en fraction continue d'une sine proceclant suivant les puissances descendantes d'une

variable,

Annales de

la

Fac, Scienc, Toulouse Vol.

3,

H.

1

17.

1889,

550 Chapter XIV.

The

Euler's

summation formula and asymptotic expansions.

statement of the problem of

moments

=

1 //() iC- du

/()

prove without

is

above QO

n=l,2,

(-!)!,

which obviously possesses the solution difficulty that the

is

= e~ u

.

In this case

,

we can

Hence

the only solution.

.

in

e U ^_

/x + u du we

have not only found a function whose asymptotic expansion is the 3l given series, but, in the sense of 59, we can regard F (x) as the ^S-sum of the (everywhere) divergent series (f). 2.

in the

The

appeal to the theory of differential equations as in the expansion problem

summation problem

we can

is

(v.

just as useful

A,

3).

Fre-

down

the differential equation which is formally quently satisfied by a given series and among the solutions there may be a function whose asymptotic expansion is the original series. As a rule, however,

write

matters are not as described above, nor as in A. 3, but the differential equation itself is the primary problem. It is only when this equation can be solved formally by means of an asymptotic series, as was indicated

and provided we succeed in summing the scries directly that we can hope to obtain a solution of the differential equation in this way. Otherwise we must try to deduce the properties of the solution from the asympPoincarfs researches 32 which were extended later, totic expansion. in A, 3,

,

by A. Kneser and

especially

J.

Horn

33 ,

deal with this problem, which lies

outside the scope of this book. 3.

In

Stieltjes*

process the coefficients a n were recovered, so to speak, QO

from the given

series

2

n~l x

",

by replacing a n by

J(_ 81

Thus

for

x

=

1

we

n I)"-* f (u) U

dU

obtain the value

=

u

for the

~l

.9-sum of the divergent series

2

n-Q

(

0-596347

l)

n !

.

. .

This

series

had already been

studied by Euler (who obtained the same value for its sum), Lacroix, and Laguerre. work formed the starting-point of Stieltjes investigations. 1

Laguerre's 82

83

Poincare,

A

loc. cit.

(footnote 13).

comprehensive account

is

nd ed., Leipzig 1927. gleichungen, 2

given by J. Horn:

Gewohnliche

Differential-

and hence the

551

Special cases of asymptotic expansions.

66. series

by

2 xn there

now appears the very simple geometrical multiplied through by the factor f(u). The solution of the problem of moments is necessary in order to determine /(*/), and this is usually In place of the series

series,

We

not easy.

make

can, however,

the process

more

elastic

by putting

Un

and choosing the

factors c n firstly so that the

cn is

=

Jf(u)u

n

du

and secondly so that the power

soluble,

problem of moments

series

W

**()* cn Thus represents a known function. with Borel's summation way process, cn

we can by

for instance link

putting c n

~n

!.

up

in this

If the function

x/

can be regarded as known, then

o

a solution of the given summation problem M Here we cannot discuss the details of the assumptions under which this method leads to the desired is

.

34

follows.

The connection The function

with Borel's summation process

y which was introduced

~

v**

**&**

59, 7 for the definition of

in

can be established as

Borers process, has for

its

derivative

00

Thus

if

we

set 27

an- n t

nQ nl

=

(*)

H an

exists, it is

as

i

n the

text above,

we have

y'

= e~x 0' (x), so that

o

Hence

if

the

B-sum

of

given by

an expression which, with suitable assumptions, can be transformed into }e~ f (p(t) dt o

by integration by in the text.

parts.

This corresponds precisely to the value of

F (1)

deduced

652 Chapter XIV. Euler's summation formula and asymptotic expansions.

We

result.

conclude with a few examples of this method of sum-

shall

mation:

in these, of course, the question whether the function found is really represented by the series must remain unsettled, since we have not

proved any general theorems. a)

For the

It can,

however, easily be verified a posteriori.

series 1 1! 2! 3! ---*-** + **-*' + .

,

which we have already discussed an

= (- I)*-

1

(n

- 1)

in 1,

we have

so that

!,

'

g)

= log

(l

+ ?),

and accordingly

By

by

integration

we

b) If

2-*

we have

easily

shown

that the function is identical

1.

are given the asymptotic series

l 1 1

is

it

parts,

with that discussed in

g)

2 "nnllL 6 --^ 2~.*''~

-----r( + 2*~~x* --4-...-J-/ 1<3

0-

= (l

+

J)~*,

1)

1J

1

.

~r

.

*

t '

so that 00

= 2 e VxeF(x) = V^J -^^du JVw-f x ^

tz

'

d

t.

V*

This provides,

for

what

is

further, the asymptotic expansion

known

as Gauss's error-function,

which

is

of special importance

in the calculus of probabilities. c) If

; ith a with

we

+

> 0,

are given the

(+

1)

we have

somewhat more general

-+ g)

+(-!)" (+!)

= (l

+

?\

",

series

'(a

t

o

'

n-l)

so that

_d_ ^ = 1-1- rf- * ,~

(u +

i

2

dt.

j

jl

+

Exercises on Chapter

XIV.

553

d) For the series

i_2!9

X

= tan"

-

we have

Y

1

ii_ + ... + X* ^

X

so that

FW =

tan-

S-sum of

If this is regarded as the

-

rf.

g)

^/^, <*.

the given divergent series,

we

obtain

the value

e. g.

= for the

sum

= 0-6214...

!--.<*

of the series 1

_2! +

6!+

4!

____

Exercises on Chapter XIV. 217. Generalize this result and prove the following statements: if e

symbolically,

*Tl

we Cn

=

+ ?r* +

1

have, in the

_ ~

(1

+

first

n

-

+

l

and

(C

n

+

instance,

1

2B)**

l)

+ ??*" + " = <**

8 ?f* +

(2B) n+l

_ _ ~~

2 (2"+*

n

+ Cn =

^

for

+

1)

Bn+1

1

1,

so that

C -

1,

C = t

Ca =

J,

0,

C8 -

C4 =

~,

0,

C - 5

|,

....

Using these numbers, we have (again symbolically) IP__ 2 P

+

3P

-+

. . .

H-

(-

n l)

**>

=

1

-f I {(- I)*- (C

1

+ n)P -

C*}.

218. Generalize the result of Exercise 217 and deduce a formula for the

/(I) ~/(2) +/(3)

_+

...

+

sum

(_ l)-i/(),

where / (x) denotes a polynomial. 219. Following 296 and 298, deduce a formula for

220.

power ^

a)

series

Following 299,

x for expansion *

b) In Euler's

and using Euler's summation formula, derive the

3, .

summation formula, put = x log x, x2 log x, xP- log

/ (x) and investigate the

relations so obtained.

a,

x

(log #)

(Cf. Exercise 224.)

a ,

554 Chapter XIV. Euler's summation formula and asymptotic expansions. 221.

summation formula 298 can of course be used equally well Show in this way that

Filler's

for the evaluation of integrals as for the evaluation of sums.

o (v.

Ex. 223 below).

222.

The sum

a)

+

assuming that

this, first

b) Prove that n

C

.

for

+ A has n ~ 1000,

.

for

n

+

-*.

7-485470 14-392720

ami the value Prove of C.

*

+

1

.

.

.

.

...

has the value

\

10 466 673

2-8242... g

1Q5565708

n

=

10".

c)

Prove that

F (x +

x

for

x

10 3

=

2630

.

.

.

has the value

~^J

10 2566 for

1000000.

known, and then without assuming a knowledge

is

10 5 , and the value

for n for

--

the value

1-272 3...

.

and the value

,

10 5 685 705. 8 2639...

10.

d) Without assuming a knowledge of the value of

A and find the e)

limit of this

Using

2

sum as n ->

show

d),

+A +

t

n

for

=

(We obtain 0- 104

oo.

=

6

Show

+^

Z

evaluate

,

10',

166 83

.

.

. ,

0-105 166 33

. .

.).

that

? f)

. .

.

TT

1-64493406..

.

.

that

2

\ =l w

-

1-20205690...,

and that 1

oo

2

-~

=

2-61237...

.

-ln* g)

Prove that

1

-f-

V* + ~/-^-

~

/**

v

+

-f-

"/ -- has the value

Vn

1998-540 14 ...

n

for

-

10.

223. Taking for fixed

p

=

1,

66, B. 3

2, 3,

a)

E (w

c)

(Cf Ex, 221.) f

.

=

.

.

d

as a model, find the

S-sum

of the following

:

!)"(/>*)!,

b)

E (-

n-O

f-0 (-!)"(/> n +#-!)!,

n l)

(pn+l)\,

d)

f

w

...,

series,

Exercises on Chapter

XIV.

555

224. Prove the following relationships, stated by Glai\heri I'

2*

3'

. .

where

A

has the following value:

where

C

is

.

nn

^A -n*

*

*

'" "'.

00

Euler's constant

and sk denotes the sum 2! ~

220, b.)

1

n

( (

1

Bn

n~ 4. n

+

i\*.*

;

225. For the function f__

nn

^w^^^ obtain the asymptotic expansion

and prove that the

coefficient

2 /t a n has the value --

for n

^ 2*

^^' ^ xerclse

556

Bibliography.

Bibliography. (This includes

some fundamental

papers, comprehensive accounts, and

textbooks.) 1.

Newton,

I.

De

f

analyst per aequationes

don 1711 (written

numero terminorum

infinitas.

Lon-

with

some

in 1669).

John: Treatise of algebra both historical additional treatises. London 1685.

and

2.

Wallis,

3.

Bernoulli, James: Pr opositiones arithmeticae de seriebus infinitis summa finita, with four additions. Basle 16891704.

4.

Euler, L.: Introductio in analysin infinitorum. Lausanne 1748. Enltr, L.: Institutiones calculi differentialis cum ejus usu in analysi

5.

torum ac doctrina serierum. 6.

7

8.

Gottingen 1812 .: Cours d'analyse de l'cole polytechnique. Cauchy, A.

9. Abel.

N. H.\ Untersuchungen liber die Reihe

13. 14.

15. 16.

69.

Part

I.

Analyse

1

+*^x+ 1

^""^a^ 1 &

und angewandte Mathematik, Vol.

1,

pp. 311

du Bois-Rey mond P.: Eine neue Theorie der Konvergenz und Divergenz von Reihen mit positiven Gliedern. Journal fllr die rcine und angewandte Mathematik, Vol. 76, pp 6191. 1873. Pringsheim A.: Allgemeine Theorie der Divergenz und Konvergenz von Reihen mit positiven Gliedern. Mathematische Annalen, Vol. 35, .

t

pp. 12.

infini-

Paris 1821.

Journal fUr die reine to 339. 1826.

11.

earumque

Berlin 1755.

Euler, L.: Institutiones calculi integralis. St. Petersburg 1768 Gauss, K. F.\ Disquisitiones generates circa seriem infinitam

algSbrique.

10.

practical,

297394.

1890. Irrationalzahlen

und Konvergenz unendlicher Prozesse. Enzyklopadie der mathematischen Wissenschaften, Vol. I, 1, 3 Leipzig 1899. .: Lemons sur les series a termes positifs. Paris 1902. Borel, Runge, C.: Theorie und Praxis der Reihen. Leipzig 1904. Stole, O.j and A. Gmeiner: Einleitung in die Funktionentheorie. Leipzig 1905 Pringsheim, A. and /. Molk: Algorithmes illimite's de nombres re'els. Encyclopdie des Sciences Mathmatiques, Vol. I, 1, 4. Leipzig 1907. An introduction to the theory of infinite series Bromwich, T. J. I A. London 1908: 2 nd ed. 1926. Pringsheim, A. and G. Faber: Algebraische Analysis. Enzyklopudie der mathematischen Wissenschaften, Vol. II, C. 1. Leipzig 1909. Pringsheim, A.:

1

17.

18.

19.

:

Fabry,

.:

20. Pringsheim,

The'orie des series & termes constants. Paris 1910. A. 9 G. Faber, and J. Molk: Analyse alge*brique,

Encyclopedic des Sciences Mathdmatiques, Vol. II, 2, 7. Leipzig 1911. 21. Stolz, O., and A. Gmeiner: Theoretische Arithmetik, Vol. II. 2nd edition. Leipzig 1915. A.: Vorlesungen uber Zahlen- und Funktionenlehre, Vol. and 3. Leipzig, 1916 and 1921. 2 d (unaltered) ed. 1923.

22. Pringsheim,

I,

2

Name and The Abel,

N

H.,

127,

122,

Subject Index.

references are to pages.

211, 281, 290 424 seqq.,

Asymptotically equal, 68. proportional, 68, 247. series (expansion, representation), 518 seq., 535 seqq.

seq., 299, 313, 314, 321,

459, 467, 556.

Asymptotic

Abel-Dim theorem, 290. Abel's convergence test, 314. limit theorem, 177, 349. partial summation, 313, 397. series, 122, 281, 292. theorem, extension of, 406. Abscissa of convergence, 441. Absolute convergence of series, seqq., 396. of products, 222. Absolute value, 7, 390. Adams, y. C., 183, 256. Addition,

Averaged comparison, 464-66. Axiom, Cantor-Dedekind, 26, 33.

Axioms of arithmetic, Bachmann, F.

Bernoulli, James and John, 18, 65, 184, 238, 244, 457, 523 seq., 556. Bernoulli's inequality, 18. Bernoulli, Nicolaus, 324.

136

Bernoulli's

polynomials, 523, 534 seqq. Bertrand,J., 282. Bieberbach, L., 478. Binary fraction, 39. Binomial series, 127, 190, 208-11, 423-8. theorem, 50, 190. Bdcher, M., 350. Bohr, H., 492.

199, 415.

Aggregate, closed, 7. ordered, 5. d'Alembert, .?., 458, 459. all

Alterations,

du Bois-Reymond,

P., 68, 87, 96, 301, 304, 305, 353, 355, 379, 556. du Bois-Reymond's test, 315, 348. Bolzano, B., 87, 91, 394. Bolzano-Weierstrass theorem, 91, 394. Bonnet, O., 282. Boormann, J. M., 195.

", 65. finite

number

numbers, 183, 203-4, 237,

479.

5, 30, 32.

function, 191. for the binomial coefficients, 209. for the trigonometrical functions,

Almost

2.

Barnes, E. W., 646.

term by term, 48, 70, 134. Addition theorem for the exponential

"

t

5.

of,

for se-

quences, 47, 70, 95. for series, 130, 476. Alternating series, 131, 250, 263 seq., 316, 518. Antes, L. D., 244.

Borel, E., 320, 471 seqq., 477, 543, 549, 551, 556. Bound, 16, 158. upper, lower, 96, 159. Bounded functions, 158.

Amplitude, 390. Analytic functions, 401 seqq. series of, 429. Andersen, A. F. 488. Approach within an angle, 404. Approximation, 65, 231. Archimedes, 7, 104. Area, 169. Arithmetic, fundamental laws of, means, 72, 460. t

sequences, 16, 44, 80. Breaking off decimals, 249. Briggs,

H.

t

58, 267.

Bromwich, VA., 477, 556. Brouncker, W. t 104. Burkhardt, H., 353, 375, 546.

5.

Arrangement by squares, by diagonals, 90.

Arzeld, S., 344. Associative law,

Cahen, E., 290, 441. Cajori, F., 322.

Cantor, G., 1, 26, 33, 68, 355. Cantor, M., 12.

5, 6.

for series, 132.

657

558

Index.

Cantor- Dedekind axiom, 26, 33. Carmichael, R. Z>., 477. Catalan, E., 247. Cauchy, A. L., 19, 72, 87, 96, 104, 113, 146,

138,

117, 136, 186, 196, 546, 556.

147,

219, 294,

148,

154,

408, 459, 534,

for sequences, 78-88. for series, 110-20, 124, 282-90. for series of complex terms, 396-401. for series of monotonely diminishing

terms, 120-4, 294-6. for series of positive terms, 116, 117. for uniform convergences, 3328. Convergent sequences: see Sequences. Cosine, 199 seq., 384, 414 seq.

Cauchy''s convergence theorem, 120. double series theorem, 143. inequality, 408. limit theorem, 72.

product, 147, 179, 488, 512.

Cauchy-Toepht* limit theorem, Centre of a power series, 157.

Convergence, systematization of theory of, 305 to 311. tests for Fourier series, 361, 364-72.

74, 391.

Cotangent, 202 seq., 417 seq. Curves of approximation, 329, 330.

Cesdro, E. y 292, 318, 322, 466.

Decimal

Chapman, S. 477. t

Characteristic of a logarithm, 58. Circle of convergence, 402. Circular functions, 59: see also Trigonometrical functions.

Closed aggregate,

sums of

series,

232

Commutative

of a power series, 174-5.

and second

kinds, 113 seq., 274 seq.

Completeness of the system of numbers, 34. :

see

real

Numbers.

test,

fractions, 105.

Continuity, 161-2, 171, 174, 404. of power series, 174, 177. of the straight line, 26.

uniform, 162. Convergence, 64, 78 seq. absolute, 136 seq., 222, 396

seq., 435. conditional, unconditional, 139, 227. of products, 218, 222. of series, 101.

uniform, 326 seq., 381, 428 seq. Convergence, abscissa of, 441. circle of, 402. criteria of: see

also

Main

Convergence

tests,

criterion.

general remarks on theory of, 298 to 305. half-plane of, 441. interval of, 153, 327. radius of, 151 seqq. rapidity of, 251, 262, 279, 332.

region

of, 163.

right hand, left hand, 163. Differentiation, 163-4. logarithmic, 382. term by term, 175, 342.

Dim,

Cauchy' s, 120, 297. Conditionally convergent, 139, 226 seq. Conditions F, 464.

Continued

315, 348.

test,

12.

Differentiability, 163.

tests of the first

Condensation

Dense,

Difference-sequence, 87.

law, 5, 6. for products, 227. for series, 138.

Complex numbers

26, 33, 41.

1,

section, 41.

Diagonals, arrangement by, 90. Difference, 31, 243.

interval, 20, 162.

Comparison

section, 24, 51.

Dedekind, R., Dedekind's

7.

expressions for to 240.

see Radix frac-

fractions, 116:

tions.

U., 344.

Dim's

227,

282,

290,

293,

311,

rule, 367-8, 371.

G. Lejeune-, 138, 329, 347, 356, 375, 547. Dinchlet's integral, 356 seq., 359. rule, 365, 371. Dirichlet series, 317, 441 seq. Dirichlet's test, 315, 347. Disjunctive criterion, 118, 308, 309. Distributive law, 6, 135, 146 seq. Divergence, 65, 101, 160, 391. definite, 66, 101, 160, 391. indefinite, 67, 101, 160. Dirichlet,

proper, 67.

Divergent sequences, 457 seqq. series, 457 seqq. Division, 6, 32.

of power series, 180 seqq. term by term, 48, 71. Divisors, number of, 446, 451, 547, sum of, 451, 547. Doetsch, G., 478.

Double

series,

theorem on, 430.

analogue for products, 437-8.

Duhamel, y.

M.

C., 285.

559

Index. e,

82, 194-8.

Fejer's theorem, 493.

Fibonacci's sequence, 14, 270, 452. Finite number, 15, 16. of alterations see Alterations. Fourier, J. P., 352, 375. coefficients, constants, 354, 361, 362.

calculation of, 251. Eisenstetn, G., 180. Elliot, E. B., 314. e-neighbourhood, 20.

:

Equality, 28.

theorem

Equivalence

of

Knopp and

Schnee, 481. test, 296 seqq., 311. Error, 65. evaluation of: see Evaluation of re-

Ermakqff's

mainders. 7, 14, 20, 69.

Euclid,

Eudoxus, postulate

theorem

of, 11, 27, 34.

Frobenius, G., 184, 490. Frullani, 375. Fully monotone, 263, 264, 305. Function, 158, 403. interval of definition, limit, oscillation,

upper and lower boundb

ot,

158-9.

of, 7.

Euler, L., 1, 82, 104, 182, 193, 204, 211, 228, 238, 243, 244, 262, 353, 375, 384, 385, 413, 415, 439, 445, 457 seqq., 468 seq., 507, 518, 535-6, 556. Eider's constant, 225, 228, 271, 622, 527 seq., 536, 538, 547, 555. 9-function, 451, 548.

Functions, analytic, 401 seq. arbitrary, 351-2. cyclometrical, 213-5, 421 seq. elementary, 189 seq. elementary analytic, 410 seq. even, odd, 173. integral, 408, 411. of a complex variable, 403 seq.

of a real variable, 158 seq. 189 seq., 410 seq.

formulae, 353, 415, 518, 636.

numbers, 239.

rational,

of transformation scries, 244-6, 262-6, 469, 507. Evaluation, numerical, 247-60. of <>, 251. of logarithms, 198, 254-7. of 7U, 252-4. of remainders, 250, 525, 531-5.

more accurate, 259. of roots, 257-8. of trigonometrical functions, Even functions, 173. Everywhere convergent, 153. Exhaustion, method

series, 350 seqq., 492 seqq. Riemann's theorem on, 363.

of,

326

seq., 429.

198 seq., 258, 414

seq.

Fundamental law of natural numbers, 6-7. of integers, 7. laws of arithmetic, of order, 5, 29.

6, 32.

Gamma-function,

of, 69.

seqq., 419.

225-6, 385, 440, 530. Gaps in the system of rational numbers, 3 seqq. Gauss, K. F., 556.

Geometric

of infinite products, 437. series,

543

seqq.

Exponential function and series, 148, 191-8, 411-4. Expressions for real numbers, 230. for sums of series, 230-73. for sums of series, closed, 232-40. Extension, 11, 34. Faber, G., 546, 556. Fabry, E. t 267, 556. Faculty series, 446 seq. Fatzius, N., 244. Fejer, L., 493, 496, 546. Fejer' s integral, 494.

sequences

trigonometrical,

2589.

Expansion of elementary functions in partial fractions, 205-8, 239, 377

problem for asymptotic

regular, 408.

1,

113, 177, 288, 289, 552,

see Series. 496. Glaisher, J. W. L., 180, 555. Gmeiner, y. A., 399, 556. Goldbach, 458. Goniometry, 415. Gtbbs*

series:

phenomenon, 380,

Grandi, G., 133. Graphical representation,

8, 15, 20,

seq.

Gregory, y., 65, 214. Gronwall, T. H., 380.

Hadamard,y.,

154, 299, 301, 314.

Hagen.y., 182. Hahn, H., 2, 305. Half-plane of convergence, 441.

390

560

Index.

Hanstedt, B.

180.

t

Hardy, G. H. 318, 322, 407, 444, 477 t

seq., 486, 487, 547, 648. series: see Series.

Harmonic

series, 448 seq. Landau, E., 2, 4, 11, 444, 446, 452, 484.

Hausdorff, F., 478.

Hermann,

131.

Jr. t

History of infinite series, 104. Hobson, E. W., 350. Holder, O., 465, 490. Holmboe, 459. Horn, J., 650.

Hypergeometric

series, 289.

Identically equal, 15. Identity theorem for power series, 172. Improper integral: see Integral.

Induction, law of,

Laplace, P. S., 646. Lasker, E., 490. Law of formation, 16, 37. of induction, 6. of monotony, 6. Laws of arithmetic, 5, 32. of order, 6, 29. Lebesgue, H., 168, 350, 353. Leclert, 247. Left hand continuity, 161. differentiability, 163.

6.

limit, 159.

Inequalities, 7. Inequality of nests, 29. Infinite number, 16. series : see Series.

Legendre, A. M., 375, 620. Leibniz, G. W.,

equation

Infinitely small, 19. Innermost point, 23, 394. Integrabihty in Rtemann's sense, 166.

Integral, 165 seq.

improper, 169-70. logarithmic, 645. Integral test, 294. Integration by parts, 169. term by term, 176, 341. Interval, 20.

of convergence, 153, 327. of definition, 158. Intervals, nest of, 21, 394. Inverse-sine function, 215, 421 seq. Inverse-tangent function, 214, 422 seq.

Isomorphous,

Lacraix, S. F., 650. Lagrange, J. L., 298. Laguerre, E., 650. Lambert, J. H., 448, 451.

10.

1,

103, 131, 193, 244, 457.

of, 214.

rule of, 131, 316.

Length, 169. Le Roy, E., 473. Levy, P., 398. Limit, 64, 462. on the left, right, 159. upper, lower, 92-3. Limit of a function, 159, 403-4. of a sequence, 64. of a series, 101. Limitable, 462. Limitation processes, 463-77. general form of, 474. Limiting curve, 330. Limiting point of a sequence, 89, 394. greatest, least, 92-3. Limit theorems see Abel, Cauchy, Toe:

JacoU, C. G. J. 439.

plitz.

t

Jacobsthal, E., 244, 263. Jensen, J. L. W. V., 74, 76, 441. Jones, W., 253.

Jordan, C., 16.

Karamata,J., 501, 504. Keplerian motion, 546. Kneser, A., 560. Knopp, K., 2, 75, 241, 244, 247, 267, 350, 404, 448, 467, 477, 481, 487, 507, 547. Kogbetliantz, E., 488.

Kowalewskiy G., 2. Kronecker, L. theorem t

of, 129,

485.

complement to theorem of, 150. Kummer, E. E., 241, 247, 260, 311. Kummer's transformation of series. 247, 260.

Lipschitz, R., 368, 371. Littlewood, J. E., 407, 478, 501.

Loewy, A., 2, 4. Logarithmic differentiation, 382. scales, 278 seqq. series, 211 seq., 419 seq. tests, 281-4. Logarithms, 57-9, 211 seq., 420. calculation of, 24, 198, 254-7. Lyra, G., 487.

Machin,

J., 253.

Maclaurin, C., 521. Main criterion of convergence, for sequences, 80.

first,

for series, 110. second, for sequences, 84, 87, 393, 395.

561

Index.

Main

criterion of convergence, second, for series, 126-7. third, for sequences, 97. Malmsten, C.J., 316. Mangoldt, H. v., 2, 350. Mantissa, 58. Markoff, A., 241, 242, 265.

Markoff's transformation of series, 242 to 244, 265 seq. Mascheroni's constant: see Euler's constant.

Mean

first,

of the integral calculus, second, 169. Measurable, 169.

first,

168.

cially

Odd

functions, 173. 184, 320. Oldenburg, 211. Olivier, L., 124.

Ohm, M.,

549.

Napier, y., 58. Natural numbers: see Numbers. Nest of intervals, 21, 394. of squares, 394. C., 17.

211,

457,

556.

Non-absolutely convergent, 136, 396-7, 435.

Norlund, N. E., 521. Null sequences, 17, 45 seq., 60-3, 72, 74. axis, 8.

concept, 9. corpus, 7. Number system, 9. extension of, 11, 34. Numbers see also Bernoulli's numbers, :

numbers. complex, 388 seq. irrational, 23 seq. Euler's

natural, 4.

number the

to

of,

548.

limit

term by term,

see also Addition, Subtraction, Multiplication, Division, Differentiation, Integration. Peano, G., 11.

70, 135.

193,

expansion of elemen239, 377

338 seqq.:

Multiplication, 6, 31, 50. of infinite series, 146 seq., 320 seq. of power series, 179.

104,

5.

summation, Abel's, 313, 397. sums, 99, 224.

Partitions,

of, 5, 6.

1,

Partial

Passage

de Morgan, A., 281. Motions of x, 160.

/.,

5, 29.

Orstrand, C. E. van, 187. Oscillating series, 101-3.

Partial of,

263-4, 305. Monotony, p-fold, 263-4.

Newton,

20.

Ordered,

tary functions in, 205-8, seqq., 419. Partial products, 105, 224.

1.

fully,

Neumann,

247-60.

Pair of tests, 308.

Modulus, 8, 390. Molk, y., 556.

Number

real,

Partial fractions,

Mobtus' coefficients, 446, 451.

term by term,

seq., 451, 548.

Oscillation, 159.

Mercator, N., 104. Mertens, F., 321, 398. Method of bisection, 39.

Moments, Stieltjes* problem Monotone, 17, 44, 162-3.

445

Numerical evaluations, 79, 232-73, espe-

Ordered aggregate,

164.

Mittag-Leffler, G.,

14,

3 seqq. 33 seqq.

rational*,

Open,

value theorem of the differential

calculus,

law

Numbers, prime,

Period strip, 413 seq., 416-8. Periodic functions, 200, 413 seq.

Permanence condition, 463. Perron, O., 105, 475, 478, 546. TT, 200, 230. evaluation of, 252-4. series for, 214, 215. Poincare, H., 520, 536, 543, 550. Poisson, S. D., 521. Poncelet, y. F., 244. Portion of a series, 127. Postulate of completeness, 34. Postulate of Eudoxus, 11, 27, 34. Power series, 151 seqq., 171 seqq., 401 seqq. Powers, 49-50, 53 seq., 423. Prime numbers, 14, 445 seq., 451, 548. Primitive period, 201. Principal criterion: see Main criterion. Principal value, 420, 421-6. Pringsheim, A., 2, 4, 86, 96, 175, 221, 291, 298, 300, 301, 309, 320, 39<J, 490, 556. Problem of moments, 559 seq.

Problems

A

and B,

78, 105,

Products, 31. infinite, 104,

218-29.

230 seqq.

562

Index.

Products with arbitrary terms, 221 seq. with complex terms, 434 seq. with positive terms, 218 seq. with variable terms, 380 seq., 436 seq. Pythagoras, 12. Quotient, 31. of power series, 182.

off,

recurring, 39. Raff, H., 475. Ramunujan, S. t 548. Range of action, 463. of summation, 398. see Conver-

t

bounded, 16. complex, 388 seqq. convergent, 6478.

gence.

:

see

Numbers.

rational, 14.

of products, 227. of sequences, 47, 70. of series, 136 seqq., 318 seqq., 398.

Reciprocal, 31. Regular functions, 408. Reiff, R. t 104, 133, 457 seq. Remainders, evaluation of, 250, 526, 531-5. Representation of real numbers

real, 15,

43 seq.

Series, alternating,

131, 250, 263 seq.,

316, 518.

asymptotic, 535 seqq. binomial, 127, 190, 208 seqq., 423 seqq. Dirichlet, 317, 441 seqq. divergent, 457 seqq. exponential, 148, 191, 411.

theorem, main, 143, 181. application of, 236-40. Riemann's, 318 seq.

259,

on a

straight line, 33.

Representative point, 33. Reversible functions, 163, 184. Reversion theorem for power series, 184, 405. Riemann, B. 166, 318, 319, 363. t

Rtemann's rearrangement theorem, 318 to 320. series,

363. 9

s ^-function, 345, 444-6, 491-2, 531, 638. Riess, M., 444, 477. Right hand continuity, 161.

differentiability, 163. limit, 159,

infinite, 15.

45 seq., 00-3, 72, 74. of functions, 327 seqq., 429. of points, 1 5. of portions, 127.

Rearrangement, 47, 138. in extended sense, 142.

Riemann's theorem on Fourier

divergent, 65. null, 17 seqq.,

Rational-valued nests, 28. Real numbers: see Numbers.

Riemann

116-7.

test,

Semi-convergent, 520, 536. Sequences, 14, 43 seqq.

Ratio test, 116-7, 277. Rational functions, 189 seq., 410 seq.

numbers

Root

Runge, C. 556.

Schroter, H., 204. Schur, /., 267, 481, 547. Section, 40, 99. Seidel, Ph. L. v., 334.

249.

Rapidity of convergence:

t

Saalschutz, L., 184. Sachse, A., 353. Scales, logarithmic, 278 seqq. Scherk, W., 239. Schlonnlch, O., 121, 287, 320. Schmidt, Herm., 212. Schnee, W., 481.

Raabe, J. L., 285. Rademacher, H., 318, 548. Radian, 59. Radius of convergence, 151. Radix fractions, 37 seq. breaking

Rogosinski, W. 350. Roots, 50 seqq. calculation of, 257-8.

faculty, 446 seq. for trigonometrical

functions,

19?

414 seq. Fourier, 350 seqq., 492 seqq. seq.,

geometric, 111, 179, 189, 472, 508.

harmonic, 81, 112, 115-7, 150, 237, 238.

hypergeometric, 289. infinite, 98 seqq. infinite sequence of, 142. Lambert, 448 seq. logarithmic, 211 seq., 419 seq. of analytic functions, 428. of arbitrary terms, 126 seqq., 312

seqq. of complex terms, 388 seqq. of positive terms, 1 10 seqq., 274 seqq. of positive, monotone decreasing terms, 120 seqq., 294 seq.

563

Index. Scries of variable terms, 152 seq. seq.,

320

Tests of convergence: see Convergence

200

Theory of convergence, marks on, 298-305.

428 seq.

tests.

transformation

of,

240 seqq.,

seqq. trigonometrical, 350 seq. Sierptriski, W. 320. Similar systems of numbers, 10. Sine, 199 seq., 384, 414 seq. Sine product, 384. t

Squares, arrangement by, 90. Stemitz, E., 398. Stieltjes, Th. y., 238, 302, 321, 530, 545, 549 seqq., 554. Stieltjes' moment problem, 649. series, 549. Stirling, y., 240, 448, 530. Stirling's formula, 529 seq., 538, 541. Stokes, G. G., 334. Stolz, O., 4, 39, 70, 87, 311, 407, 550. Strips of conditional convergence, 444.

systematization of, 305-11. Titchmarsh, E. C., 444. Toeplitz, O., 74, 474, 489-90. Toeplitz' limit theorem, 74, 391. Tonelli, L., 350. Transformation of series, 240

200 seq. Trigonometrical

Sub-series, 110, 141.

of, 492.

402. absolutely, 513. uniformly, 490.

Summable,

16,

47, 95, 103.

Unconditionally convergent, 139, 2?6.

Uniform

continuity, 102.

Dirichlet series, 442.

faculty series, 440-7.

Fourier series, 355-0. series, 449.

Lambert

power

series,

convergence, tests summability, 490.

332 seqq. 344 seq., 381.

of,

real

num-

bers, 33 seqq.

arithmetic means, 400

Summation formula, range

350 seq.

Uniformly bounded, 337. Uniqueness of the system of

seqq. of Dirichlet series, 404, 491. of Fourier series, 404, 492 seqq. Eider's,

518 seqq.

of, 99.

of, 398.

Summation

series,

Ultimate behaviour of a sequence,

of of of of of

of divisors, 451. of a series, 101 seq,, 402.

Summation, index

198-208,

functions,

calculation of, 258-9.

Trigonometrical

30.

Summation by

seqq.,

414-9.

Subsidiary value, 421. Subtraction, 5, 31. term by term, 48, 71, 135.

Summability, boundary

re-

convergence of products, 381. of series, 320 seq., 428 seq.

Sub-sequences, 40, 92.

Sum,

general

for asymptotic 548 seqq. Summation processes, 404-76. commutability of, 509. Sums of columns, of rows, 144.

problem

Uniqueness, theorem

of, 35, 172.

Unit, 10.

Unit

circle, 402.

Value of a

series, 101, 400.

Vieta, F. 218. Vivanti, G., 344. y

Voss, A., 322.

series, 543,

Sylvester, J. J., 180.

seq.,

417 seq.

Tauber, A., 480, 500. Tauberian theorems, 480, 500. Taylor, B., 175. Taylor's series, 175-0.

Term by term

Weierstrass, K.,

1,

91,

334

V

345, 379,

394, 398, 408, 430.

Symbolic equations, 183, 523, 520. Tangent, 202

Wallis, y., 20, 39, 219, 550. Wallis' product, 384, 529.

passage to the limit:

see Passage. Terms of a product, 219. of a series, 99.

Weierstrass' approximation, 497. test for complex series, 398 seq. test of uniform convergence, 345. theorem on double series, 430 seqq.

Wiener, AT., 451. Wirtinger, W., 521 seq.

Zero, 10. -function, Riemann's, 491-2, 531, 538. Zygmund, A. 9 350.

345,

444-6,