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517.38
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^f J
i
PROPERTY OF THE OF
LI BRAKY
517.38
V93t
The Hunt Library Carnegie Institute of Technology Pittsburgh, Pennsylvania
DATE DUE
Unless this book
below a
fine
vrill
is
returned on or before the last date stamped Fairness to other borrowers makes
be charged.
enforcement of this rale necessary.
LOUIS CLARK
VANUXEM FOUNDATION
THE THEORY OF PERMUTABLE FUNCTIONS BY
VITO VOLTERRA PROFESSOR OF MATHEMATICAL PHYSICS IN THE UNIVERSITY OF ROME
LECTURES DELIVERED AT PRINCETON UNIVERSITY OCTOBER,
1912
PRINCETON UNIVERSITY PRESS PRINCETON LONDON HUMPHREY MILFORD OXFORD UNIVERSITY PRESS :
1915
Published April, 1915
LECTURE I
LECTURE I.
I
We shall begin with quite elementary and
general notions. First, let us recall the properties of a
This operation mutative, that
is
sum
both associative and com-
is,
= tt-r(i + ?) (a + l) + c and #
+i=I+
tf
.
Now we
can pass from a sum to an integral by a well-known limiting process. For the sake of simplicity, definition of
which
we
shall
use of the
Riemann: Given a function /(#)
defined over an interval ab,
is
divide the interval ab into h
make
......
hn
we
.
n parts
we
hi,
sub-
h,
Corresponding to every
Jt B
,
in-
then take some value f t of /(#) lying between the upper and lower limits of f(cc] onh,, and we form the sum terval h
l
4
THEORY OF PERMUTABLE FUNCTIONS
Now
suppose we allow h i9
become
hz,
&3 ,
h n to
Then if a unique sum regardless of
indefinitely small.
approached by the the way in which the subdivision of ab we have limit
is
Urn Si/j
Necessary and
7*
is
made,
= z
sufficient
for
the
known.
In
conditions
existence of this limit are well particular, if the function /(#)
is
continuous
over the interval ab or has at most a finite
number
of discontinuities, the limit
and hence
also the integral exists. 2.
Now let us
This operation that
is
form the product
is
associative
and commutative,
to say, (aV) c
= a (be)
and ab
= la
.
not worth our while to consider the operation which could be obtained from a product It
is
by a limiting process such
as the one
employed
LECTURE in defining
an
5
I
We
integral.
should be led to
logarithmic integration. 3.
cess
However, let us consider a limiting prowhich leads us to something more than
these elementary operations. Let us choose a set of numbers i,
s
= 1,
2,
g
.
.
,
which
m
isJ
where
be written in
may
an array
m lg
22
.... ....
mg2
....
mgg
mn m m m 2l
m
ffl
12
and numbers n is where ,
that
We
i9
$=
.
.
m$g
1 ? 2,
.
.
g
,
is,
n Ll
n 12
n gl
n g2
.
.
....
n lg
nffg
.
then consider the operation (1)
which we type.
shall call
XT,
^
w^ r
composition of the second
This operation
is
associative, for if
we
THEORY OF PERMUTABLE FUNCTIONS
6
also introduce a set of i,
s=I,
2
.
.
I
(j
?
numbers
jp l89
where
and write the sum
I
the expression which
we
thus obtain
is
equiv-
alent to either of the forms
which proves that the associative law
is
sat-
isfied.
Making use
we
shall
of the notation
have
which ma}r be written without the parenthesis, thus,
K
n > p\s
The commutative law
-
will in general not
satisfied. When it is, the quantities under consideration are called permutable, and we
be
have
LECTURE
=
(m, n) Lr
7
I
m) ir
(n,
.
We
can at once give an example involving permutable quantities. All that is necessary is
to consider (m, m) ir
(m, m,
and
m) ir
so on.
which majr be written (m 2 ) lr which may be written (m*) tl
And it is clear that k = (m k m h (m \ m
.
j
) ir
since the associative 4.
We
) ir
,
law
,
is satisfied.
shall consider also another operation
similar to the last,
namely s
(2)
I
2 m lh 7l
%
s
H-l
which will be called composition of the
first
The sum
type. (I) previously considered reduces to this one if we suppose that the num-
bers are zero unless the second subscript is In other words, we greater than the first.
have in
this case
m^ m
000 000
1B
.
.
.
... .
.
.
m lg
mg .
THEORY OF PERMUTABLE FUNCTIONS
S
Let us represent the sum
O
?
W]
This expression vanishes equal to
i
+
[[m, n]
we
shall
by
ts
s is less
if
Moreover,
1.
(2)
jp]
if
we
write
lg
have ,
which vanishes 2
+
2,
than or
and so
In general,
if
s
is
less
ia
,
than or equal to
on. it is
not true that
[m,n] l8
=
[n,i] t8
but when this condition
is
satisfied,
quantities are called permutable. guish this sort of pennutability
which we defined in section
we
the two
To
distin-
from that
shall
say that
the old are of types one In other words, if respectively.
and two
the
3,
new and
ff
(3)
2^
m th
n hg
we have pennutability whereas
9 = 2* n
lh
m hg
of the second type,
if
5-1
%h *+l
Sl
m ih n hs = 2^ i-rl
n ih
m hs
LECTURE
we have permutability Clearly, if we put
I
of the
first
type.
[^
,
an example of permutability type like the one mentioned in the
at once obtain
of the
first
last section,
Nevertheless,
other example which 1. suppose that n lh
shall give an-
of interest.
is
=
we
Then
Let us
the condition for
permutability becomes s-1
i
,s
2 h M =2fc M hs
.
th
1+1
Putting
s
= + i
i,
?%, H-l
we have
2,
1}l
and putting
i-rl
i+l
5
= +
+
MI, i+2
^ ^i+l,i+2 8,
2
?
we have
= ^i+l,
+m
+3
i+2, i+3
9
whence W^,i+2
and
so on.
Owing
= W+l, l+
to the above,
m rjr + g for all values of
8
r, s,
= m ltl+g
and
g.
From
lows that the matrix of the m*s ing type
:
we have
is
this
it
fol-
of the follow-
THEORY OF PERMUTABLE FUNCTIONS
10
#j
a>
^3
a
//
L
U
2
^i
...
tf^
.
.
.
a g _9
.
.
.
tt%
0000...^ ...
The law
for this matrix
m
is
may
wis
i
.
be expressed by
)
which puts into evidence the fact that the value of m, depends upon the difference between the two subscripts s
and
i.
Now
what do we find when we pass to the limit by a process analogous to the one employed in the integral calculus in going from a sum to an integral? We there passed from a set of quantities /i, f-2 /s, fn 5.
,
,
with single subscripts to a function f(oo] of one independent variable oc3 the variable taking the place of the subscripts. Here, we have instead a set of quantities m l8 with double subscripts;
hence,
we must
function of two variables
replace
them by a
LECTURE
11
I
where the two variables take the place of the double subscripts. Moreover, we also have another set of quantities n s which must be replaced by a different function of two variables (j>($,y).
2 m %h n hs must
Finally,
be replaced by
7l
We thus obtain two operations Composition of the
first
:
type:
Composition of the second type:
The
condition for permutability of the
first
is
type
,
y)
d
for permutability of the second type,
// a
The 6.
(x, f)
* (g, jj) d
=/ V
(*,
a
associative property
is
I)
/ & y)
always
*t
.
satisfied.
Let us begin by examining peraiuta-
THEORY OF PERMUTABLE FUNCTIONS
12
bility of the first type.
facts are here
The most important
summarized
:
All of the functions which can be ob-
1.
tained by the composition of permutable functions are permutable with one another and also with the original functions.
All of the functions which can be ob-
2.
tained by the addition or the subtraction of permutable functions are permutable with one
another and with the original functions. 'Now, let us see how the following problem
To
may
be solved:
tions
which are permutable with unity. can readily solve this problem if we
determine
all
the func-
We
re-
a
question which has already been answered. For before passing to the limit, we call
saw that
if
the functions
m
ls
were permutable
with unity, the condition MIS
was
satisfied.
= m,^
Now since,
in the limit, the sub-
scripts are replaced by the variables we are led to infer that
This
we can prove immediately.
x and y9
For
if
LECTURE
13
I
f"f(z, it
must follow that %
y
3
Hence $ and
x
J
l
'
JJ
.
/ are of the forms $>(y
00}
and
f(y OB) respectively. Moreover, all of the functions of the type
f(y
oo)
are permutable with one another; for
as can be verified at once.
type f(y
oo)
ever, it
we
it
functions of
form a group of permutable
functions which
have called
The
of especial interest.
is
the group of closed cycle.*
shall
We How-
not go into an examination of
here. 7.
We have used
representing
The
the
several different notations
operation
of
composition.
simplest scheme where no confusion with
multiplication write
is
f
liable to arise, is
merely to
or
*Leons sur les equations integrates et integro-differentielles. 1913. P. 150. Paris: Gauthier-Vfflars.
THEORY OF PERMUTABLE FUNCTIONS
14,
to represent the resultant
of
two function
/
and
.
of the composition But in a case where
confusion might arise, we star over the letters, thus
may
place a small
f'4--
We may also put the letters in square brackets [f,
we wrote [M ? n\ Jik to represent the composition of the quantities m th
just as in the above
and
m
To
lk
.
indicate the composition of / with itself,
the composition of the resultant thus obtained with f, and so on, we shall write *
*
Jf'2
respectively,
plication
is
J
and
Jf8 if
?
no confusion with multi-
liable to arise,
the small stars
we may even omit
and write
Jf2 ? JfS ? 8.
The notation
in certain cases
particular examination.
demands
Thus, to indicate the
product of a constant a by f, we write af; and if 6 is also a constant and a function which is
LECTURE permutable with
/,
then b
15
I
(f>
is
permutable with
af and the composition of the two gives us *
a 6f
Moreover,
if
* .
we have two polynomials made
up of permutable functions with constant coefficients, these polynomials will also be premutabie with one another, and to composition
all
that
the same rule which
is
is
necessary
effect their is
to apply
used when polynomials
are multiplied together. But if a and 5 are constants, then a
and &
+
<j>
will not in general be
with one another.
Nevertheless,
+
/
permutable
we
shall ex-
tend the definition so as to have in this case
= ab + a (a+f) (b + ) 9. Before going further, what takes place
let
us
consider
in the case of composition
of the second type. All that we have said above concerning permutability of the first type can be established for permutability of the second type barring the remarks on permutability with unity.
With
this exception, all of the properties just
mentioned may be extended to
this case at once.
THEORY OF PERMUTABLE FUNCTIONS
16
Let us pass
10.
in review
some of the most
interesting properties which can be derived from the operation of composition.
We
once more to the
shall return
finite case
and
consider the operation of composition for the saw above that if we comnumbers is
m m
We
.
j
s with the ris, the resultant thus posed the j obtained with the p s and so on, then after
s--I compositions, the resultant would be zero. In a like manner, all of the symbolic powers
m
of
i8
beginning with
+1 [m*"*"
] te
have a value
zero.
Having seen lytic
this, let
us consider any ana-
function 00
2n
- 7l
A ^n*
which converges within a certain let
circle,
and
us write
2, This
new
A n [m^ *. ls
expression
rational function of
#,
evidently an integral that is, a polynomial.
is
Moreover, this result may be generalized. Consider the analytic function
of
more than one
We
LECTURE
I
variable,,
and write
17
again obtain a polynomial.
Now, what does become when we pass by 11.
the
above
theorem
a limiting process to the composition of functions? This we proceed to investigate.
Consider
We
shall
prove that
expression
whatever
To
is
may
prove
always an
this
theorem, \
is
M
is finite,
some
\<
this
we
f (x,
y
z, )
.
notice that
M
n\<-Jn
R
quantity and where less than the radius of convergence of the is
finite
Moreover, let /x be a quantity which larger than the absolute value of /. Then
series. is
y)
entire function of
be the absolute value of
\A A
where
if f (x,
we
shall
have
THEORY OF PERMUTABLE FUNCTIONS
IS
H~&
= t# J
d
*
3
\
and
so on,
whence n Li
which proves that the all
of
*
J
values of 2 and
is
xY~
t
M
l
convergent for
series is
thus an entire function
z.
This theorem
may
also
Let
be generalized.
us consider the series
which represents the expansion of a function F (z l9 2 83,. .% e ) about a point, and which ,
converges If the absolute values of z^ z 2j z Bj z e do not exceed certain limits. Then the series
F=2 -n
o
Is
ij
.
.
.
^ 2
A
}i,
i
t
e
i
i
e
ff-
fi
f^
si
l
.
.
.
f
fe sf e
.
.
.
0je
o
always an entire function of g^ z z , % 2j
.
.
.z n
.
LECTURE
The proof
made
is
in the previous case.
/ e are each less
if fij /2j /3>
19
I
than
p,
Thus, in abso-
lute value, then
/e
1/1
...
t
l
and hence the theorem may be
verified im-
We
mediately. may also demonstrate another property besides the one just shown. Indeed, we have up to the present regarded the function
F (z^.
s3 ,
4,
and
.
x, y] as a function of z l9 z 2y
.z e)
.
.... z e , but
Regarded
y.
is
it
also a function of
as a function of these
variables, the function
oo
two
permutable with the This may be seen at
is
functions / x ____ f e once; for owing to the uniform convergence of the series, the operation of composition .
may
be performed term by term, and since is permutable with /i,
each term of the series /2> /a?
.
.
.
.
To sum
fe
5
so also
up,
... is
must be the sum.
we have
.,
the following theorem:
...
e
...
the expansion of an analytic function about
a point, then
THEORY OF PERMUTABLE FUNCTIONS
where
tions^ is tf/zd
fsj-.-.fe are
f2
permutable func.z e? an entire function of Zi, z^ z 35
fi,
.
x
as a function of
0?zd
y
with the functions f i? f 2 fs Now If in (z^ z 2j ---- z e Zi
=
z^
which 12.
=
Is
z
ze
=
convergent for
1,
all
.
permutable
fe.
,
F = ....
is
.
\
we
y] we put obtain a series oc,
values of the fs.
The theorems which we have been
de-
riving above suggest a method for investigating to a considerable extent the properties of
permutable functions and for carrying out the operations of composition. Thus, let us consider any analytic expression
ffr...*.) which can be expanded about the point %2
=
ZB
=
4
z 2j Z B , ---- z e In the series
nr .
__ If
we
z-i
g e =: o in powers of % 19 replace z^ z 2j z & , ---- z e
by fl9 /2 /8 ---- f e respectively, and write the operation of composition wherever we previously had multiplication, we shall ,
,
LECTURE always obtain a
I
which converges for all .... f e9 and which repre-
series
values of f l9 / 2 / 3 sents a function permutable with ,
,
f
e
We may represent
.
it
/i, / 2 , f $,....
by
Thus, every algebraic expression takes on a
new meaning for For example,
the operation of composition.
1+0 a series which converges within the unit But if we write cle.
is
cir-
we
obtain a series which converges for all values of / and which is permutable with /.
Consequently, a meaning has been ascribed to the expression on the left hand side of the equation.
Moreover,
and
if
we take two
expressions
THEORY OF PERilUTABLE FUNCTION'S
% > .,-y~-r/"-... *
,
make
then to
the composition of the
hand members,
It
Is
two
left-
only necessary to apply
the rules for finding their algebraic product
and we
shall
have
Hence, all the rules of ordinary algebra remain valid when we pass from the field of multiplication to the field of composition.
Some rived
of the consequences which can be de-
from
13.
this fact will
Now
let
be seen shortly.
us see what takes place for
the second type of composition.
Let (4)
jFte)
= _M_
be the ratio of two entire functions 1 4-
=
$
(z)
which are such that
<(0)
0.
Then we
shall
have an expansion
(z)
=
and
LECTURE
23
I
=A
lS + A 2 2* + AS # + F(s) which converges in general within a certain .
having the point z
circle
=
.
.
as center.
ISTow let us consider the expression FL*(Z)
We
shall
tient of 14.
=A
+A
h* %
prove that this
+
2
2
(m
)z
new
,
.
.
.
series is the
quo-
two entire functions.
Let us
write
first
= Si* + R <(*)
+
2
...
and determine a quantity
h,(*)=S m l
We say that For
<
is
l8
(3)
+
*
is
+
*(?)**
...
an entire function of
z.
^ be greater in absolute value than tn ls then have (3)
let
We
JMoreover, \B,
+
\tiz
\B, \p* ff #
converges for is
all
values of
|z? 8 2,
\(f/^+
the same reason, $(e)
then the i/f
= Ci s +
if
Cs
+
..
.
series
u (0)
=dm
is
z
an entire function.
+
.
.
.
and the theorem
proved.
For
is
+
Ct(m*) ts z
2
+
.
.
.
THEORY OF PERMUTABLE FUNCTIONS
54
Bearing these facts in mind, let us consider the system of algebraic linear equations
X + I ^ Xa = j*
d, *
t8
= 1, 2,
1
If
we
X
unknowns
replace the
ls
9)
by
-
F
ts
we
can verify without trouble that these equa-
But
tions are identically satisfied.
if
we
solve
X
for the unknowns is in the above system, the solution will be expressed as the quotients
of rational entire functions of
hence the quantities functions of It
is
X
19
\ft is
and
<j> is
and
are quotients of entire
z.
clear that the determinant
which con-
the denominator of these quotients cannot vanish identically, and hence the theostitutes
rem
is
proved. not difficult to generalize this. Thus instead of the quotient (4), let us write It
is
where
and
<^
variables
are entire functions of the
\j/
z 2j
z^
z e which vanish for
z^
= 3 = 2s =...** = 0. Zl 2
X7/^ JL
is
\
iCi
.
.
.
JC
g
\
"O
)
<^r
the expansion of
...
v* ^/
If
A
XI
^i.B.^fi
*
F about the point for which
LECTURE ^2
1
(?. Pis\*l
~
==
3
=
....
}=^^.,.Z,ri ^A %e)
?
where
m
n
,
the function
,
....
F (z
l9
fl>
q
z2 ,
Q,
z
y
^
S5
I
(m ll wit \m t%e
and l*
we
if r/
...(/
l
write
?' e e )ai...Z
e\ ?
l
il
are permutable, then % e & y) will be .
.
.
.
9
\
the quotient of two entire functions of z^ z& %$j .... % e .
To make
the proof in this case, it is only necessary to repeat the argument given above. may add that F^ is permutable with iS7
We
Wts,.
15.
m
?
Let us now pass
to the limit, that
is,
us consider permutable functions of the second type*. All of the theorems remain
let
valid.
In other words, we have the theorem
that
F&, ...*
|
where f^
x,y)
=2
.
.
.
24
lt
.
.
^tf
.
.
./>
^
.
.
.
*,S
f 2 , fs? ---- fe are permutable func-
tions of the second type, entire functions.
is
the quotient of two
Also,
* To indicate composition of the second type, we shall use of a double star thus:
make
^6
is
1z,
THEORY OF PERMUTABLE FUNCTION'S a function which
is
permutable with
/i,
/2 ,
..-./,.
We
study some applications of these fundamental theorems in the second lecture. shall
LECTURE
II
LECTURE I.
We
shall
II
begin by classifying integral
equations into several categories. us examine those which are linear. ones
plest
following
which
we run
across
First, let
The
sim-
are
the
:
(1)
known kind.,
as Volterras equation of the second
and
(!')
/ (y) +/o
/(*) F(x,y] dx
= i(y),
Fredholm's equation of the second kind.
We shall also consider certain other kinds further on.
Let us look
at equation
(
1
)
.
If
we
multi-
ply both sides by <& (y>z) and integrate with and we respect to y between the limits ,
obtain ,e}
dy
THEORY OF PERMUTABLE FUNCTIONS
30
now
If
(A) it
the function
*
be so chosen that
f^Fiz.tf
will follow that
|>, s)
which
is
f\y dy Far.
*)
l(*,
}
*
s)
reducible
fix) dx
by
=
A?)
J^ (y) Q(y, z) dy
(I) to ,
so that the difficulty has to the solution of
z) dy,
been narrowed down
(A).
In the symbols for
composition of the first kind, this equation be written as follows:
ma
(2)
If (!')
the
$0^) + F(x.y) +
J>(x,y)
=
.
we apply a similar argument to equation we find that the solution will be given in
form
where ** **
2.
Let us
be solved.
first see
If
we
how
write
equation (2)
may
LECTURE
we
31
II
shall obtain
__
the solution being valid
But suppose we
Then, in
this case,
equation
Hence we
(2)
shall
|
I.
write
we have an expansion which
converges for all values of fies
<
z
if
F and
which
satis-
by what we have proved.
have
and the integral equation (2) is solved. If we replace F (oc, y] by u F (at, y) in equation (2)
we
<(#, y]
which
+ u F(x, u] +
series is
always an entire function of u.
Turning to equation (2 by uF as in the previous
3.
F
obtain
then have
X
), let
case.
us replace
We
shall
THEORY OF PERMUTABLE FUNCTIONS
32
3>
u
=
F - uF
.
theorem of can be ex-
as a consequence of the last
and the
-
first
we have
lecture,
pressed as the quotient of
that
two
3>
entire functions
of u.
As
4.
soon
we have
as
the
stated
fun-
easy to see that they are only special cases of other
damental problems in
classes of
this
problems of a
form,
it is
much more
general
nature.
Indeed,
let
tion F(ZI, z z >
us consider any analytic funcz n ) whatsoever and write 3, .
.
.
.
the equation (3)
Furthermore,
JK^^-.-.^O. let
us suppose that this equation zn 3 2 0, and
is satisfied by Zi = z =
.
.
.
=
=
Si, .
.
us regard z n as a function dependent upon If the point z I %2 ^3 3? 2? 2n-i-
let
.
=
.
.
= zn =
is
not a
critical point,
velop z n as a power series in z i9 % 2
,
-
-
=
we may de% n-i and
the expansion will be convergent within region.
We
shall thus
.
.
.
have
== V
'
=
some
LECTURE
Now suppose we replace z
33
II
z2
i9
.
,
.
.
z n in equa-
.
tion (3) by the permutable functions /i, f 2) .... f n respectively and regard the operations .
as compositions of the first type. terms of our notation, we shall have
The equation which we have
.
Then, in
just found will
no longer be algebraic or transcendental but will be an integral equation, since the operation of composition is an operation of integration. Nor will the equation in general be linear as was equation (2), but of any degree
whatsoever. the its
unknown solution
function,
we
we regard
if
Nevertheless,
f
n
as
shall be able to find
by the same process which we used
in solving equation (8). Indeed, it necessary to replace z i9 s 2? 2 3? .... %
is
n
only
in the
by f^ f^ f z , ---- f n respectively and to treat the operations as operations of comIn this manner, we find position.
series (4)
(5)
An
/n = SS...Sl
l
...
v ^/ *.../,,V. l
interesting fact to be noticed
whereas the expansion (4)
is
is
that
in general con-
THEORY OF PERMU1ABLE FUNCTIONS
34
vergent over a limited region only, the solution (5)
valid for all values of f^ / 2 ,
Is
.
.
.
f n-i>
.
Evidently problems of integration are of a more complicated nature than algebraic or transcendental problems, yet
we have
the sur-
prising and interesting result that the solutions of the former are much more simple in
the sense that the regions over which they are valid
infinite.
is
We
may
also replace
z^
^
z.2 ,
% n-i
-
.... 3 w _i/ n _i res-
In equation (8)
by zj, Zsf 29 write and the equation pectively ^(*l/l, *8/8,
Then Jfn
'
-
-
*n-l
/-!,
fn)
=
.
the solution will be
= VZ
which
.
is
.
,
V 2,
J A.
^_
^^^ ^
-.11 .
.
.
A ... /_! ynl
%n-\ *_! fi
of the form
---*n-lK^) The series will be an entire function of z^ % 2j z^ .... zn^i and with respect to os and y y //ifel
-
?
,
f n (%ij
Z& 2 8 ,.
.
.
.s n
! j
#,
2/)
will be
permutable
with the functions / 15 / 2 / 3? .... / n _ x ,
5.
We
might
equations, as
also start with a
.
system of
LECTURE
II
35
(6)
which are
=
....
satisfied
=
s nt
0.
when
Now
^ =
let
^=z = 2
u2
us suppose that
= we
can define
(7)
Up = 2 2...
z
l
as implicit functions of * 15 ^ 2?
have no
critical
Then
we
if
where / Xj
*
l
*
^
..
n
____ a n which
=z =
____ % n point at z 2 write the integral equations
= o.
/ 2 ^ / 3j ---- / n are permutable functions, the solution of the system will be
THEORY OF PERMUTABLE FUNCTIONS
36
and the functions thus obtained functions of z ly z 2 r 3s .... z ,
/ij /2
for all values of
Moreover, these solutions
/*
/c>
tl
will be entire
will be pennutable with the given functions, All of the equations which we have been con-
sidering involve only integrals for which the limits of integration are say, they are equations
x and y;
with variable
Let us see what the situation
tions (6)5 (7) let
when
is
Returning to the
are constant.
we
shall
that
is
to
limits.
the limits
set of
equa-
suppose that the solutions
are quotients of entire functions.
Then
us examine the integral equations *
**
**
*
-
1
.
jy.?i /;,
where f l9 / 25 /3
.
.
s n fn
,
.
.
.
$p)
=
=o
f n are permutable functions of the second type. In these equations ,
the limits of integration are constant, since
we
are concerned with composition of the second type.
LECTURE
SI
II
now we put
If
the functions thus obtained satisfy the preceding system of equa-
1) tions,,
2) are quotients of entire functions, and 3)
have permutability of the second type
with the original functions / 15 / 2
Thus we
.... / n , , see that linear equations are only
a very special type of integral equations and that we can pass from their study to that of a
more general class. 6. Let us prove ties
certain important proper-
about functions which
may
be found by
a process like the one above outlined. More precisely, let us show what certain algebraic properties become when we pass from multiplication to composition.
We
shall
begin by
giving an example:
We
consider the exponential function
THEORY OF PERMUTABLE FUNCTIONS
38
z
_1 1
A
"~3
2 i
i
,
_L
rf-r^fTg-fi
Associated with
It is
...
an addition theorem
e ^^ = r ^ -
Suppose we put f(s)
= e*-l
^
.
We then have /(* + *i)
(8)
=/(^/(^J +/(^) +/(^i)
Keeping the above
.
in mind, let us write the
function
We
can see at once what the relation (8) Indeed, we have only to replace
becomes.
multiplication therefore have
that
by composition.
We
shall
is
In other words, the theorem of algebraic ad-
LECTURE
39
II
dition for the exponential function becomes for this new function a theorem of integral addi-
we have
tion as 7.
called it.*
To go from
the particular case to the
general involves no difficulty. Consequently, we may state the theorem: To every theorem of algebraic addition, there corresponds a the-
orem of
integral addition,
Thus, for example,, if we consider elliptic functions, we can pass from these to entire functions
by the process of
preceding
lecture.
To
II
of
for elliptic functions, there correspond
addition theorems for
manner,
let
the
the addition theorems
new functions.
us consider the
cr
new
In a like
function of
Suppose we examine for a moment the expansion of this function and replace Weierstrass.
u
in the expression
powers of tion.
by uf(x, y] where the
/ represent operations of composi-
The three-term equation
to a three-term equation for the *
Evans has studied
permutable
functions.
In a systematic
(Memorie
leads us
new
function
for
manner an Algebra of
Lincei,
S.V.
Vol.
1911; also Rendiconti del Circolo di Palermo, Vol. 1912.)
VIII,
XXXIV,
THEORY OF PERM UT ABLE FUNCTIONS
40
which
of the integral type since
is
we have
replaced products by compositions. 8.
What we
have said about compositions
of the first type may be repeated for compositions of the second. Returning once more to
the example involving the exponential function, let us put
This function
we
shall
W(s
- gl
is
also
an entire function and
have ;
x, y)
= W(z
\
x, y)
+
-
W(z,
\
z; y)
fr(*|*,y)fFk| a r,y),
or in other words,
+ S W( g \x,S) W(*\e,y)d. a It is
hardly necessary to prove that the above true in the general case. is
9.
A
similar theorem
may
also be stated
more than one variable hence, all the theorems about AbeHan functions may be carried over to the domain of integration by for the case of
a process like the one which
;
we have
indicated.
LECTURE Let us now return
10.
41
II
to linear Integral
As indicated, equations (1) and equations. Those of the first (!') are of the second kind. kind of the Volterra and Fredliolm types spectively may be written
re-
(9)
(9') 7
Leaving out of consideration equations which can only be attacked by methods
of a
different sort, let us consider equations
(9).
The
(9
)
may be reduced to equations of the second kind. For we can differentiate and latter
obtain
If
F (y,
y} does not vanish,
we can
by F(y,y) and get an equation
divide
of the second
kind.
If
F
(y,
equation
is
y}
is still
vanishes identically, the last of the first kind. But if
not zero, then by a second differentiation,
we
THEORY OF PERMUTABLE FUNCTIONS
42
shall get
an equation of the second kind, and
so on.
If F(jc,y) is such that F(x,os) $ 0, call it a function of the first order. If
=
and
(
x
)^0
,
we
shall call
it
we
shall
F (x, #)
a function of
sy'W
the second order,
and
order of the function
so on.
F (x
f
Hence,
if
the
y) in equation (9)
determinate, the equation can always be reduced to one of the second kind by a finite is
number solved
But
of differentiations,
and hence can be
by the method which we have the order of
minate.
F (x,
A case in point
y)
is
may
where
indicated.
not be deter-
F
(a?, OB)
is
in
general different from zero but vanishes for certain values of x. Then the nature of the
problem changes, and to solve it, new methods must be used. To develope these would lead
The solution of this question has been the goal of numerous enquiries. were the first to take up the matter and since us too far afield.
We
then Lalesco and others have studied
it.*
Instead of considering equation (9) which *See: Lalesco, Introduction d grates.
Paris:
Hermann,
1913.
la theorw des equations inteTroisi&me partie I.
LECTURE Is
of
the
first
kind,
43
II
we may
consider the
equation
where we can regard F and functions and as unknown.
*|/
as the
known
For we have a constant, when the
only to suppose that x is equation reduces at once to equation (9) If we take the equation of the first kind In .
this
that
we may
form,
is
also write
to say, the
problem Given a function
nature:
Is \jt
It
of the following
which
Is
the re-
F
and 4>, and sultant of the composition of of the factors the of one composition, given If for the moment to find the other factor 4>.
F
we were tion
to replace the operation of composithat of multiplication, the problem.
by would reduce operation;
to that of finding the inverse
that
problem which
is
we
dealing with a analogous to the problem of
is,
are
division.
Now
necessary to observe that certain conditions must be satisfied if the problem is it is
THEORY OF PERMUTABLE FUNCTIONS
44
to have finite solutions.
The order
of
$ must
F
be greater than the order of by at least to a higher when vanishes oc=y, $ unity. For Is of order m and ^ is of order than F. If
F
$ must be of order m-n. Moretwo cases may arise according as the
order n, then over,
functions
F and
are or are not pennutable Clearly In the latter case,
\b
with one another. <E>
cannot be pennutable with F, otherwise the
two would But if F and $
resultant of the composition of the
be permutable with either. * be permutable with JF
are pennutable, will
and
i/f'?
We shall prove that this property realized.
In
fact,
F^F =
ijf
is
actually
we have
F,
FF =
Hence
and
since this integral equation has but
one
solution,
<$>F
and the theorem II.
Is
=F
,
proved.
Furthermore,
when the problem
of
LECTURE
45
II
linear Integral equations of the first kind has
been put
in the
form
F <&==$ other problems suggest themselves at once. Thus, if F, and ^ are known functions, we
may
set the
problem of determining a quantity
such that (10)
or
PX+X3> = $;
again the following problem: given the
F
known
F4
2j F^ quantities J?lf calculate a quantity $ such that
(11)
F,
The above
+*F
are
2
-f
^3
*
and
,
F = 4
*|/
to
.
\ff
new equations which up
to the
present have never been studied and with which we shall now concern ourselves. First, let us consider equation
we can
write
X,
Let us put
(10) which
THEORY OF PERMLTABLE FUNCTIONS
46
Then we
shall
have
where we have put
F = l 1
From
the
first
c^ ,
c
-
3> ^2
.r
equation,
we
= c^ r
.
//
derive
and from the second
cy
where / and ^ are two kno\\Ta functions which one can obtain from F and and where
is
the
known
Then by subtracting second equation from the first, we have at
also a
once
function.
LECTURE
(.y>y)
^y
F\x.'x)
47
II
dx
and Integration by parts gives
Thus we
are led to the following result
:
To
solve the Integral equation (10) we must solve the problem which presents itself in the shape
of the last equation. This problem Is nothing more than the integration of an Integra-differential equation.
Indeed, equation (12)
of the type of an integral equation
is
both
and of a
differential equation.
The above problem admits of a solution, but we shall not go into details of the solution. The interesting point to notice Is that integro-differential equations arise in a great
THEORY OF PERM UT ABLE FUXCTIOXb
4S
We
have examined these variety of problems. equations in a number of forms and have made a particular study of the Integra-differential equations of the second order and of the ellip-
or hyperbolic types which arise In connection with certain problems of mathematical
tic
physics.*
The problem we were considering
is
of a
It Is of the first order, and different type. since two dependent variables appear, it cor-
responds to problems Involving partial derivaThe case of equation (II) may be
tives,
handled in a similar manner. 12.
We
wish to demonstrate certain inter-
esting results which are closely connected with the problems we have been discussing. Let us go back to equation (9). In certain
equation has a finite number of solutions, while in others the number of solutions Is infinite and the solutions Involve an arbitrary cases, this
function.
To
see this,
we need
only to consider the
equation *
Lemons sur
1913.
les fonctions
de lignes.
Paris: GantMer.Villars.
LECTURE
what conditions x = the only solution and under what conditions
and is
49
II
to determine under
solutions other than
exist.
To
simplify matters, we shall assume that and are of the first order the functions
F
and
shall determine
under what circumstances
the equation has a solution of the first order. Suppose we write our equation in the form
r
X J Jr>(*,|)x&;/)#+
Then by
X
differentiation with respect to y,
we
have ^
+f x
and when
as
=
x(*>
**&*)#
=
Q
y,
which gives us a necessary condition. Moreover, by suitable transformations of a simple sort, we are always led to the case where
= - *(*, *) =
(12)
F(x,
(120
^fos)^^,^
x)
where the subscripts
1
1
,
and 2 denote
,
partial
THEORY OF PERMUTABLE FUNCTIONS
SO
differentiation -with respect to
pectively; that
For we can
Then
we
if
we
x and y
res-
is
first
write
take
clearly see that the equation
(B) becomes
where
Hence we can suppose
at the outset that con-
ditions (12) are satisfied.
The above having been
established, equation
LECTURE (B)
may
If
we put
we
shall
/3
51
be written
have
But we can make use and
II
of the arbitrariness of a
to choose
=F
F\(x, x)
f
%(x, x)
=
Qf&x, x]
= ^2(37, x) =
,
which shows that we can always assume that 7
condition (I2 ) is satisfied. Now let us write
^= - /pj a;
We shall have
52
THEORY OF PERMUTABLE FUNCTIONS
whence we derive X'-''.
U)
=
?
^
/-^ ^ - A /,<-*: f)-, .
.
/
where
and therefore
(see
}\(z,
a:)
Lecture II,
=
<^ 2 (,r, .*)
=
1) .
Hence, integrating by parts, we have
where
and therefore
LECTURE
53
II
This integro-differential equation
may
be in-
tegrated.
If
we
write
we have (16)
where
$(x,y) is
= 6(v) -
an arbitrary function and v
~~ = %-ry
9
The
solution of the equation (16) is obtained the method of successive approximations. by Applications of the above will be brought
out in the next lecture.
LECTURE
III
Ill I.
We
of the
We
shall begin
work developed
with some applications in the last lecture.
have solved the problem of finding the ?/) which satisfies the equation
function x (#
JV(s,
|)
x &#) & +/*Xto ^ * *'^ /7* = (
on the hypothesis that order.
Now
and
'
are of the
first
suppose we put (*,!l)
Then
F
=
-F(x,i/)
.
the condition <(#, #)
+
jFfo x)
=
clearly satisfied, and hence we shall be able to calculate all of the functions x (^ y) which is
satisfy the relation
in
other words,
all
of the functions which
have permutability of type one with a given function.
However, in the last lecture (12) this problem was solved only in the special case where the given function is of the first order. If the function
breaks down.
is
of higher order, the
method
THEORY OF PERMUTABLE FUNCTIONS
5S
We
have seen that the problem
may
be re-
duced to the solution of an integro -differential equation of the first order. If the given function is of the second order, the integro-differential equation which we must solve is of the
second order and admits of a solution.
An
arbitrary function always enters in. As we increase the order of the given func-
problem becomes more and more complicated, hence we shall not go into details on tion, the
we
this question as
should be led too far
afield.
In the general case where the functions are analytic the question has been answered by
M.
Peres.*
2.
We
wish to present some of the prop-
of permutable functions. The very method which enables us to calculate all of the erties
functions that are permutable with a given function also leads us to the result that if
F
and
first
$
are permutable and
if
P
is
of the
we must have <(# X) = const.
order, then
*
,
F(x. x)
We shall give a rigorous proof of this * RendlcontI del Lincei.
1913-14.
fact.
LECTURE
We
59
III
write
Differentiating with respect to y,
= $(ar,^) F(y,y) +
*(*,
I)
we have
^(1,^)
^
,
differentiating this last expression with respect to x,
and
- *(a;, x] Ffc, Suppose we put x
y~]
=
= *i(^, y) that
is
Moreover,
if
we put
F(y,y}=f(i/},
we have
+ y.
F(y,
We
shall then
have
THEORY OF PERMUTABLE FUNCTIONS
60
and consequently whence the theorem. 3.
It
sion of
a simple matter to find the expanany function \b which is permutable
is
with a function
For b
where
c
F of the
is
order.
The expression
a constant. i/rU\^i
~c
will be of higher order
able with
first
the last theorem
F
F(x,t/)
l
than
F
and permut-
.
Now by one of the theorems which we proved in the last lecture,
we may
write
where *! will be permutable with F, there will be a constant c2
*!
and consequently we
$
c*2
such that
F = F$*
shall
have
= c F+ F + 2
l
Then
2
...
If this process can be carried on indefinitely,
LECTURE
we
shall
61
III
have under certain conditions an ex-
pansion of
We
in terms of F,
\ff
P
2
....
,
a short survey of the results which can be obtained by the intro4.
shall
duction of a
we can
give
new symbol.
If
we put
write
F= i" l
where F~ and
1
^,
O^ 1 are
merely symbols which do not represent functions but which may be they did. If the functions are permutable, we can write
treated as
and
If
If
=
-!$ -1
hence the symbols
=
$-1
^ and F~
permutable. Let us assume that
We wish to determine
l
we have
~1 ?
are themselves
pennutability.
THEORY OF PERMUTABLE FUNCTIONS
63
111
other words, let
We shall then have and owing to the property of permutability, /7 (! +
2
= )
(.F-f
whence !
and we
ma
+
= (/>r (J ^ - (/V*)!/'* T
1
2
write
rte rZ^ /or the sum of teo fractions be may applied. Thus we see that we can develop as it were an arithmetic for the symbol .F" 1 quite analthat
is,
ogous to the theory of fractions. 5.
We
have seen
are of the
first
<3>(.r ?
then a function such that
I)
(
type and .*|i
T)
that
= ^I(T,
(oc^y)
if
<1>
and
\jj
if .r)
may
?
always be found
LECTURE
Hence we can
And
write
by solving the equation
x * L
we
63
III
shall
= ix
l
,
have that
*
(2)
= x'- xf. 1
Therefore the two functions
-*
1
and
*
t|i
can
always be obtained the one from the other by a transformation through the functions x or x'-
In
particular,
if
$(x,x)
we
=
1,
shall always be able to find
xtX-
(3)
The even
if
relations (I)
X and
1
and
=
I-
(2)
may
and $ are permutable.
<3>
be obtained
In
this case,
do not belong to the group of functions which are permutable with the given
In
ones.
even
x'
if
tji
We
particular, equation is
(3)
may
hold
permutable with unity.
on permutable functions to a close by extending some 6.
shall bring these lectures
THEORY OF PERMUTABLE FUNCTIONS
64
of the results which were obtained in the first lecture.
11.)
(
A function which
depends upon all the values of a certain function f(cc) between the limits a (4)
and b admits of an expansion r6
-flo-rl *J
a
"
f(2\) FI(J\) th\
~b
Jb J a
F
j.\
2
(x^
f
]
(
j:
2
}
F*( ^ 1? .r 2
conditions
certain
provided
where
f(
cfa.2
th\
)
+
.
.
.
,
a
and
)
symmetric functions.
F
z
(oc^
are
x^
satisfied;
#3), etc., are
The expansion
in ques-
tion corresponds to Taylor's expansion (or to a power series) in ordinary analysis.*
With
these facts before us ? let
/
(#,
y
\
a)
be a set of permutable functions of type one, that is of such a sort that if a be given any 0,1 and a 2 the two functions thereby obtained will be permutable with one another.
two values
As an
,
we give /U"- V/ja)
example,
which has the above properties. *See:
Lecons sur
les
equations integrals
ferentielles.
*Paris: Gauthier-Villars.
Lecons sur
les
1913.
1913.
et
Chap.
integro-difI,
VIII.
Paris: Gauthier-Villars. fonctions de lignes. II. Lectures delivered at Clark University,
Chap. Worcester, Mass., 1912.
Third lecture,
IV.
LECTURE ,
III
65
us write
let
'
f /V
*/
f(%*/J\fi) <-%
=/lr,//,a,j8)
.
?
The function f($
J
a, j8) is
y)
permutable with
the original ones. Again let us write
/U%fW(^i a ^ and is
so on,
and let us suppose that the
convergent when
|
Then
tain quantity.
is
f(tf) if
\
we
less
series (4)
than a cer-
write the series
-
a
+ Jf
Jf a f(x^j\xl
^
converge no matter what the absolute
will
it
a
value of /(#, y
\
a)
may
be.
Moreover, let us consider the series "
*(f)
(5)
+
=/(f + Jf a /(2V)
fa *Jf
*^
)
Fifa,
f(^f( xt) Fsfci, x,\
}
I) dx,
dxidxt
+
...
a,
If the determinant of the linear integral
THEORY OF PERM UT ABLE FUNCTIONS
66
equation which
we
obtain by taking into con-
sideration only the first
we can
vanish,
*(l) from
derive / (
two terms does not fr)
as a function of
equation (5), provided
!
$()
|
does not exceed a certain value.*
But
let
us examine the series
is known, we can derive f(a},y form of a series which converges no matter what the absolute value of $ (#, y %}
Then
if
<
in the
\
may
be.
This
is
we have dewe have been
the latest theorem which
rived in the field of research
developing. "
sitr Us equations integrates et integro-diferentielles. XVI. Gauthier-VUlars. 1913. Chap. Ill,
Lecons
Paris:
138153
