Yang gave a general notion of polynomial Bezoutian matrix, and presented: (1)generalized Barnett decomposition formula of polynomial Bezoutian matrix;(2) an intertwining relation of polynomial Bezoutian matrix and Alliance matrix ; (3) the generalized Bezoutian reduction via confluence Vander monde matrix.

Several properties of Bezout matrix;

Bezout matrix′s diagonalization anatomy;

The Bezout matrix is reduced to diagonal form with the congruence given by Vander Monde matrix.

In this paper, the concepts of the least common multiple of polynomial matrices and the prime polynomial matrix are introduced, and some algebraic properties of the greatest common divisor and of the least common multiple of polynomial matrices are given.

Based on the theory of polynomial matrix,it is implied that the right coprime of polynomialmatrices of the autoregressive part and moving-average part is only the necessary condition,not the suf-ficient condition to ensure that the model is the normalized form.

On square-rooting matrices of a kind of matrix polynomial

The frequency criteria for Schur stability of matrix polynomials without expanding the determinants of the matrix polynomials has been proposed.

Based on this,some identities of the rank of a class of matrix polynomials were obtained.