On singular pencils with commuting coefficients
Abstract
We investigate the relation between the spectrum of matrix (or operator) polynomials and the Taylor spectrum of its coefficients. We prove that the polynomial of commuting matrices is singular, i.e. its spectrum is the whole complex plane, if and only if (0, 0, ... , 0) belongs to the Taylor spectrum of its coefficients. On the other hand we prove that this equivalence is not longer true if we consider the operators on infinite dimensional Hilbert space as coefficients of polynomial. As a consequence we could propose a new description of (Taylor) spectrum of k-tuple of matrices and we could disprove the conjecture previously proposed in the literature. Additionally, we pointed out the Kronecker forms of the pencils with commuting coefficients.
Cite
@article{arxiv.2402.00673,
title = {On singular pencils with commuting coefficients},
author = {Vadym Koval and Patryk Pagacz},
journal= {arXiv preprint arXiv:2402.00673},
year = {2024}
}
Comments
15 pages