On the near periodicity of eigenvalues of Toeplitz matrices

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 AN 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 AN 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 A2 in a particular case when f is a piecewise constant function taking values -1 and 1.