On a Class of Matrix Pencils and -ifications Equivalent to a Given Matrix Polynomial

Abstract

A new class of linearizations and -ifications for m× m matrix polynomials P(x) of degree n is proposed. The -ifications in this class have the form A(x) = D(x) + (e Im) W(x) where D is a block diagonal matrix polynomial with blocks Bi(x) of size m, W is an m× qm matrix polynomial and e=(1,…,1)t∈ Cq, for a suitable integer q. The blocks Bi(x) can be chosen a priori, subjected to some restrictions. Under additional assumptions on the blocks Bi(x) the matrix polynomial A(x) is a strong -ification, i.e., the reversed polynomial of A(x) defined by A\#(x) := xdeg A(x) A(x-1) is an -ification of P\#(x). The eigenvectors of the matrix polynomials P(x) and A(x) are related by means of explicit formulas. Some practical examples of -ifications are provided. A strategy for choosing Bi(x) in such a way that A(x) is a well conditioned linearization of P(x) is proposed. Some numerical experiments that validate the theoretical results are reported