English

Non-self-adjoint Toeplitz matrices whose principal submatrices have real spectrum

Classical Analysis and ODEs 2023-01-02 v4 Spectral Theory

Abstract

We introduce and investigate a class of complex semi-infinite banded Toeplitz matrices satisfying the condition that the spectra of their principal submatrices accumulate onto a real interval when the size of the submatrix grows to \infty. We prove that a banded Toeplitz matrix belongs to this class if and only if its symbol has real values on a Jordan curve located in C{0}\mathbb{C}\setminus\{0\}. Surprisingly, it turns out that, if such a Jordan curve is present, the spectra of all the submatrices have to be real. The latter claim is also proven for matrices given by a more general symbol. Further, the limiting eigenvalue distribution of a real banded Toeplitz matrix is related to the solution of a determinate Hamburger moment problem. We use this to derive a formula for the limiting measure using a parametrization of the Jordan curve. We also describe a Jacobi operator, whose spectral measure coincides with the limiting measure. We show that this Jacobi operator is a compact perturbation of a tridiagonal Toeplitz matrix. Our main results are illustrated by several concrete examples; some of them allow an explicit analytic treatment, while some are only treated numerically. Update: The proof of Theorem 8 contains an error. An erratum is attached in the end

Keywords

Cite

@article{arxiv.1702.00741,
  title  = {Non-self-adjoint Toeplitz matrices whose principal submatrices have real spectrum},
  author = {Boris Shapiro and František Štampach},
  journal= {arXiv preprint arXiv:1702.00741},
  year   = {2023}
}

Comments

There is an error in the proof of Theorem 8. An erratum has been attached to the end of the paper

R2 v1 2026-06-22T18:07:52.802Z