On higher-order Szegő theorems with a single critical point of arbitrary order
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Publication:329469
DOI10.1007/s00365-015-9320-4zbMath1353.47061arXiv1310.6712OpenAlexW1615648125MaRDI QIDQ329469
Publication date: 21 October 2016
Published in: Constructive Approximation (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1310.6712
Orthogonal functions and polynomials, general theory of nontrigonometric harmonic analysis (42C05) Difference operators (39A70) Jacobi (tridiagonal) operators (matrices) and generalizations (47B36)
Related Items (8)
An algebra model for the higher-order sum rules ⋮ Large deviations and sum rules for spectral theory: a pedagogical approach ⋮ Large deviations and the Lukic conjecture ⋮ Zeroes of the spectral density of the Schrödinger operator with the slowly decaying Wigner-von Neumann potential ⋮ Sum rules and large deviations for spectral measures on the unit circle ⋮ \(\ell^2\) bounded variation and absolutely continuous spectrum of Jacobi matrices ⋮ A matrix version of a higher-order Szegő theorem ⋮ Spectral edge behavior for eventually monotone Jacobi and Verblunsky coefficients
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