Finite Gap Jacobi Matrices, II. The Szeg\H{o} Class

Jacob S. Christiansen; Barry Simon; and Maxim Zinchenko

arXiv:0906.1630·math.SP·October 29, 2019

Finite Gap Jacobi Matrices, II. The Szeg\H{o} Class

Jacob S. Christiansen, Barry Simon, and Maxim Zinchenko

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TL;DR

This paper explores the Szeg\

Contribution

It establishes a new equivalence for the Szeg\

Findings

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Szeg\

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Proves Szeg\

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Provides new proof of Szeg\

Abstract

Let $\fre \subset \bbR$ be a finite union of disjoint closed intervals. We study measures whose essential support is $\fre$ and whose discrete eigenvalues obey a 1/2-power condition. We show that a Szeg\H{o} condition is equivalent to \[ \limsup \f{a_1... a_n}{\ca(\fre)^n}>0 \] (this includes prior results of Widom and Peherstorfer--Yuditskii). Using Remling's extension of the Denisov--Rakhmanov theorem and an analysis of Jost functions, we provide a new proof of Szeg\H{o} asymptotics, including $L^{2}$ asymptotics on the spectrum. We use heavily the covering map formalism of Sodin--Yuditskii as presented in our first paper in this series.

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Taxonomy

TopicsSpectral Theory in Mathematical Physics · Matrix Theory and Algorithms · Quantum chaos and dynamical systems