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A UNIQUENESS THEOREM FOR BOUNDED ANALYTIC FUNCTIONS

Published online by Cambridge University Press:  01 January 1997

YURII I. LYUBARSKII
Affiliation:
Institute for Low Temperature Physics and Engineering, 47 Lenin Prospect, 310164 Kharkov, Ukraine
KRISTIAN SEIP
Affiliation:
Department of Mathematical Sciences, Norwegian University of Science and Technology, N-7034 Trondheim, Norway
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Abstract

Suppose that K is a linear space of functions analytic in some domain D in the complex plane. A sequence Λ = (λk) of distinct points from D is said to be a set of uniqueness for K if ƒ∈K and ƒ(λk) = 0 for all k imply ƒ≡0. Depending on the dispersion and the density of Λ on the one hand, and the growth of the functions in K on the other, one may often require only |ƒ(λk)| [les ]ak for some sequence of positive numbers ak, and still conclude that ƒ≡0 for ƒ∈K. Of particular interest are sharp conditions on the decay of ak, which reflect the interplay between growth and decay of analytic functions.

Type
Research Article
Copyright
© The London Mathematical Society 1997

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