On the Hurwitz Stability of Hurwitz-Type Matrix Polynomials

Abstract

Every matrix polynomial fn admits a decomposition of the form \[ fn(z)= hn(z2)+z\, gn(z2). \] The matrix polynomial f2m is said to be of Hurwitz type if the expression g2m(z) h2m-1(z) admits a representation as a finite continued fraction with positive definite matrix coefficients. Similarly, the odd-degree matrix polynomial f2m+1 is of Hurwitz type if 1z h2m+1(z) g2m+1-1(z) has the same property. We derive an explicit representation of the Bezoutian associated with Hurwitz-type matrix polynomials. Using this representation, we obtain a direct proof that every Hurwitz-type matrix polynomial is Hurwitz. The Hurwitz property of this class was also investigated in [52]; our approach is based on an explicit Bezoutian representation. This provides a constructive connection between continued-fraction representations, matrix Bezoutians, and Hurwitz stability. We also develop a completion procedure that associates with a given matrix polynomial a Hurwitz-type matrix polynomial of higher degree. As a consequence, whenever such a completion exists, the original polynomial is Hurwitz. The proposed construction is illustrated by examples.