The Hoffman-Wielandt inequality for quaternion matrices and quaternion matrix polynomials

Abstract

The purpose of this paper is to derive the Hoffman-Wielandt inequality and its generalization for quaternion matrices. Diagonalizability of the block companion matrix of certain quadratic (linear) quaternion matrix polynomials is brought out. As a consequence, we prove that if Q(λ) is another quadratic (linear) quaternion matrix polynomial, then under certain conditions on the coefficients, a generalization of the Hoffman-Wielandt inequality for their corresponding block companion matrices holds. We also prove that if P(λ) is a quaternion matrix polynomial with unitary coefficients, then any right eigenvalue λ0 of P(λ) lies in the annular region 12 < |λ0| < 2.