The Bezout equation on the right half plane in a Wiener space setting

Abstract

This paper deals with the Bezout equation G(s)X(s)=Im, s ≥ 0, in the Wiener space of analytic matrix-valued functions on the right half plane. In particular, G is an m× p matrix-valued analytic Wiener function, where p≥ m, and the solution X is required to be an analytic Wiener function of size p× m. The set of all solutions is described explicitly in terms of a p× p matrix-valued analytic Wiener function Y, which has an inverse in the analytic Wiener space, and an associated inner function defined by Y and the value of G at infinity. Among the solutions, one is identified that minimizes the H2-norm. A Wiener space version of Tolokonnikov's lemma plays an important role in the proofs. The results presented are natural analogs of those obtained for the discrete case in [11].