Quasi-Triangularization of Matrix Polynomials over Arbitrary Fields

Abstract

In [19], Taslaman, Tisseur, and Zaballa show that any regular matrix polynomial P(λ) over an algebraically closed field is spectrally equivalent to a triangular matrix polynomial of the same degree. When P(λ) is real and regular, they also show that there is a real quasi-triangular matrix polynomial of the same degree that is spectrally equivalent to P(λ), in which the diagonal blocks are of size at most 2 × 2. This paper generalizes these results to regular matrix polynomials P(λ) over arbitrary fields F, showing that any such P(λ) can be quasi-triangularized to a spectrally equivalent matrix polynomial over F of the same degree, in which the largest diagonal block size is bounded by the highest degree appearing among all of the F-irreducible factors in the Smith form for P(λ).

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