2015
DOI: 10.1007/s00222-015-0588-6
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On the determinacy problem for measures

Abstract: We study the general moment problem for measures on the real line, with polynomials replaced by more general spaces of entire functions. As a particular case, we describe measures that are uniquely determined by a restriction of their Fourier transform to a finite interval. We apply our results to prove an extension of a theorem by Eremenko and Novikov on the frequency of oscillations of measures with a spectral gap (high-pass signals) near infinity.

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Cited by 8 publications
(12 citation statements)
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“…From one of the results of [33] (or Theorem 17, Chapter 4, in [41]) we deduce Corollary 2. If W is a weight, A is a separated sequence and B is any closed set then sup{a| M W a (A, B) = ∅} ≤ 2πD * (A).…”
Section: The Following Version Of the Type Theorem Is Theorem 36 Frommentioning
confidence: 80%
See 2 more Smart Citations
“…From one of the results of [33] (or Theorem 17, Chapter 4, in [41]) we deduce Corollary 2. If W is a weight, A is a separated sequence and B is any closed set then sup{a| M W a (A, B) = ∅} ≤ 2πD * (A).…”
Section: The Following Version Of the Type Theorem Is Theorem 36 Frommentioning
confidence: 80%
“…The following statement is a combination of Lemmas 13 and 16 from [33]. (A, B) is non-empty it contains a discrete measure ν, whose positive and negative parts have interlacing supports.…”
Section: Completeness Gap and Type Problemsmentioning
confidence: 97%
See 1 more Smart Citation
“…Very recently, the second author jointly with Poltoratski, refined these results even further [37], and obtained a generalization of the Beurling spectral gap theorem that strengthened this theorem by a factor of two.…”
Section: Spectral Gap and Oscillationmentioning
confidence: 96%
“…The class of MIFs serves as a natural object in the so called Toeplitz approach to the Uncertainty Principle, see ([19], [20], [27]). It was used to obtain an extension of the Beurling-Malliavin theory ( [19], [20]) and to study classical problems of Fourier analysis ( [22], [23], [25], [26]). Some function theoretic questions arising from such applications were treated in [30].…”
Section: Introductionmentioning
confidence: 99%