The smallest eigenvalue of Hankel matrices

Christian Berg; Ryszard Szwarc

doi:10.1007/s00365-010-9109-4

The smallest eigenvalue of Hankel matrices

Christian Berg, Ryszard Szwarc

Department of Mathematical Sciences

19 Citations (Scopus)

Abstract

Let H_N=(s_n+m),0≤n,m≤N, denote the Hankel matrix of moments of a positive measure with moments of any order. We study the large N behavior of the smallest eigenvalue λ_N of H_N. It is proven that λ_N has exponential decay to zero for any measure with compact support. For general determinate moment problems the decay to 0 of λ_N can be arbitrarily slow or arbitrarily fast in a sense made precise below. In the indeterminate case, where λ_N is known to be bounded below by a strictly positive constant, we prove that the limit of the nth smallest eigenvalue of H_N for N→∞ tends rapidly to infinity with n. The special case of the Stieltjes-Wigert polynomials is discussed.

Original language	English
Journal	Constructive Approximation
Volume	34
Issue number	1
Pages (from-to)	107-133
ISSN	0176-4276
DOIs	https://doi.org/10.1007/s00365-010-9109-4
Publication status	Published - Aug 2011

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title = "The smallest eigenvalue of Hankel matrices",

abstract = "Let HN=(sn+m),0≤n,m≤N, denote the Hankel matrix of moments of a positive measure with moments of any order. We study the large N behavior of the smallest eigenvalue λN of HN. It is proven that λN has exponential decay to zero for any measure with compact support. For general determinate moment problems the decay to 0 of λN can be arbitrarily slow or arbitrarily fast in a sense made precise below. In the indeterminate case, where λN is known to be bounded below by a strictly positive constant, we prove that the limit of the nth smallest eigenvalue of HN for N→∞ tends rapidly to infinity with n. The special case of the Stieltjes-Wigert polynomials is discussed.",

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T1 - The smallest eigenvalue of Hankel matrices

AU - Berg, Christian

AU - Szwarc, Ryszard

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N2 - Let HN=(sn+m),0≤n,m≤N, denote the Hankel matrix of moments of a positive measure with moments of any order. We study the large N behavior of the smallest eigenvalue λN of HN. It is proven that λN has exponential decay to zero for any measure with compact support. For general determinate moment problems the decay to 0 of λN can be arbitrarily slow or arbitrarily fast in a sense made precise below. In the indeterminate case, where λN is known to be bounded below by a strictly positive constant, we prove that the limit of the nth smallest eigenvalue of HN for N→∞ tends rapidly to infinity with n. The special case of the Stieltjes-Wigert polynomials is discussed.

AB - Let HN=(sn+m),0≤n,m≤N, denote the Hankel matrix of moments of a positive measure with moments of any order. We study the large N behavior of the smallest eigenvalue λN of HN. It is proven that λN has exponential decay to zero for any measure with compact support. For general determinate moment problems the decay to 0 of λN can be arbitrarily slow or arbitrarily fast in a sense made precise below. In the indeterminate case, where λN is known to be bounded below by a strictly positive constant, we prove that the limit of the nth smallest eigenvalue of HN for N→∞ tends rapidly to infinity with n. The special case of the Stieltjes-Wigert polynomials is discussed.

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DO - 10.1007/s00365-010-9109-4

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EP - 133

JO - Constructive Approximation

JF - Constructive Approximation

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ER -

The smallest eigenvalue of Hankel matrices

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