2.9.
SOME OPEN PROBLEMS CONCERNING H ~ AND BMO*
I. I. An interpolating Blaschke product is a Blaschke product having d...
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2.9.
SOME OPEN PROBLEMS CONCERNING H ~ AND BMO*
I. I. An interpolating Blaschke product is a Blaschke product having distinct zeros which lie on an H ~ interpolating sequence. Is H ~176the uniformly closed linear span of the interpolating Blaschke products (see [1, 2])? It is known that the interpolating Blaschke products separate the points of the maximal ideal space (Peter Jones, thesis, University of California, Los Angeles 1978). 2.
where ~I
Let ~
be a real locally integrable function on ~
is the mean value of ~
~=~+Hd , where i ~ . ~
and |~B~$~
Assume that for every interval
over I, and where C is a constant. ?
Does it follow that
(H denotes the Hilbert transform.)
This-is the limiting
case of the equivalence of the Muckenhoupt (A2) condition with the condition of Helson and Szeg~ (see [3, 4]). This question is due to Peter Jones. A positive solution should have several applications. 3.
Let f be a function of bounded mean oscillation on
~
Construct L ~ functions u
and v so that ~=~+H~, ll1~11~+gl~|~'~I~B~0 , with C a constant not depending on f (see [5, 6]). 4.
Let TI, T2,...,T n be singular
and sufficient conditions
integral operators
on IT1, T2,...,Tn}
such that
on
~H(#)
~m (see [7]).
Find necessary
if and only if I ~ I + ~ [ ~ [ ~ -
j._~
-
-
~
-
~.'C~") (see [5, 8]). LITERATURE CITED I 9
2. 3. 4. 5. 6. 7. 8.
D. Marshall, "Blaschke products generate H~, '' Bull. Am. Math. Soc., 82, 494-496 (1976). D. Marshall, "Subalgebras of L ~ containing H~, '' Acta Math., 137, 91-98 (1976). R. A. Hunt, B. Muckenhoupt, and R. L. Wheeden, "Weighted norm inequalities for the conjugate function and Hilbert transform," Trans. Am. Math. Soc., 176, 227-251 (1973). H. Helson and G. SzegS, "A problem in prediction theory," Ann. Math. Pure Appl., 51, 107-138 (1960). C. Fefferman and E. M. Stein, "HP spaces of several variables," Acta Math., 129, 137193 (1972). L. Carleson, "Two remarks on H l and BMO," Adv. Math., 22, 269-277 (1976). E. M. Stein, Singular Integrals and Differentiability Properties of Functions, Princeton N.J. (1970). S. Janson, "Characterizations of H I by singular integral transforms on martingales and ~ ," Math. Scand., 4__I, 140-152 (1977).
*JOHN GARNETT.
2254
University
of California,
Los Angeles,
California 90024.
