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On the near periodicity of eigenvalues of Toeplitz matrices

arXiv:1006.2462

Abstract

Let $A$ be an infinite Toeplitz matrix with a real symbol $f$ defined on $[-π, π]$. It is well known that the sequence of spectra of finite truncations $A_N$ of $A$ converges to the convex hull of the range of $f$. Recently, Levitin and Shargorodsky, on the basis of some numerical experiments, conjectured, for symbols $f$ with two discontinuities located at rational multiples of $π$, that the eigenvalues of $A_N$ located in the gap of $f$ asymptotically exhibit periodicity in $N$, and suggested a formula for the period as a function of the position of discontinuities. In this paper, we quantify and prove the analog of this conjecture for the matrix $A^2$ in a particular case when $f$ is a piecewise constant function taking values $-1$ and $1$.

10 pages, 5 figures, to appear in AMS Transl. volume dedicated to tne memory of Viktor Lidskii