Abstract
A Hilbert space, whose elements are entire functions, is of particular interest if it has these properties:(H1) Whenever F(z) is in the space and has a non-real zero w, the function is in the space and has the same norm as F(z).(H2) For each non-real number w, the linear functional defined on the space by F(z) —> F(w) is continuous.(H3) Whenever F(z) is in the space, is in the space and has the same norm as F(z). If E(z) is an entire function satisfying
Publisher
Canadian Mathematical Society
Cited by
11 articles.
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1. Gap and Type problems in Fourier analysis;Nine Mathematical Challenges;2021
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3. A restricted shift completeness problem;Journal of Functional Analysis;2012-10
4. Pólya sequences, Toeplitz kernels and gap theorems;Advances in Mathematics;2010-06
5. Bibliography;Introduction to the Theory of Entire Functions;1973