Generalized Standard Triples for Algebraic Linearizations of Matrix Polynomials
Abstract
We define \emph{generalized standard triples} , , and , where is a linearization of a regular matrix polynomial , in order to use the representation which holds except when is an eigenvalue of . This representation can be used in constructing so-called \emph{algebraic linearizations} for matrix polynomials of the form from generalized standard triples of and . This can be done even if and are expressed in differing polynomial bases. Our main theorem is that can be expressed using the coefficients of the expression in terms of the relevant polynomial basis. For convenience, we tabulate generalized standard triples for orthogonal polynomial bases, the monomial basis, and Newton interpolational bases; for the Bernstein basis; for Lagrange interpolational bases; and for Hermite interpolational bases. We account for the possibility of common similarity transformations.
Cite
@article{arxiv.1805.04488,
title = {Generalized Standard Triples for Algebraic Linearizations of Matrix Polynomials},
author = {Eunice Y. S. Chan and Robert M. Corless and Leili Rafiee Sevyeri},
journal= {arXiv preprint arXiv:1805.04488},
year = {2021}
}
Comments
18 pages