The Beurling--Malliavin Multiplier Theorem and its analogs for the de Branges spaces
Abstract
Let ω be a non-negative function on R. We are looking for a non-zero f from a given space of entire functions X satisfying (a) |f|≤ ω or(b) |f|ω. The classical Beurling--Malliavin Multiplier Theorem corresponds to (a) and the classical Paley--Wiener space as X. We survey recent results for the case when X is a de Branges space . Numerous answers mainly depend on the behaviour of the phase function of the generating function E.
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