A system-theoretic approach to the factorization theory of non-singular polynomial matrices

Abstract

Consider the non-singular polynomial matrices D, L, R and the canonical realizations σ, σ σ of D^-1, L^-1, R^-1. The main result is the establishment of a bijective correspondence between L, R which satisfy the condition D = LR, and σ, σ which are in a certain relationship to σ. Furthermore, this result is specialized to the case where R is a monic polynomial matrix.