Toeplitz nonnegative realization of spectra via companion matrices

Collao M.; Salas M.; Soto R.L.

Abstract

© 2019 Macarena Collao et al., published by De Gruyter 2019.The nonnegative inverse eigenvalue problem (NIEP) is the problem of finding conditions for the existence of an n × n entrywise nonnegative matrix A with prescribed spectrum Λ = {λ1, . . ., λn}. If the problem has a solution, we say that Λ is realizable and that A is a realizing matrix. In this paper we consider the NIEP for a Toeplitz realizing matrix A, and as far as we know, this is the first work which addresses the Toeplitz nonnegative realization of spectra. We show that nonnegative companion matrices are similar to nonnegative Toeplitz ones. We note that, as a consequence, a realizable list Λ= {λ1, . . ., λn} of complex numbers in the left-half plane, that is, with Re λi≤ 0, i = 2, . . ., n, is in particular realizable by a Toeplitz matrix. Moreover, we show how to construct symmetric nonnegative block Toeplitz matrices with prescribed spectrum and we explore the universal realizability of lists, which are realizable by this kind of matrices. We also propose a Matlab Toeplitz routine to compute a Toeplitz solution matrix.

Más información

Título según SCOPUS: Toeplitz nonnegative realization of spectra via companion matrices
Título de la Revista: Special Matrices
Volumen: 7
Número: 1
Editorial: DE GRUYTER POLAND SP ZOO
Fecha de publicación: 2019
Página de inicio: 230
Página final: 245
Idioma: English
DOI:

10.1515/SPMA-2019-0017

Notas: WOS-ESCI, SCOPUS