A Toeplitz-like operator with rational matrix symbol having poles on the unit circle: Invertibility and Riccati equations

Abstract

This paper is a continuation of the work on unbounded Toeplitz-like operators T with rational matrix symbol initiated in Groenewald et. al (Complex Anal. Oper. Theory 15, 1(2021)), where a Wiener-Hopf type factorization of is obtained and used to determine when T is Fredholm and compute the Fredholm index in case T is Fredholm. Due to the high level of non-uniqueness and complicated form of the Wiener-Hopf type factorization, it does not appear useful in determining when T is invertible. In the present paper we use state space methods to characterize invertibility of T in terms of the existence of a stabilizing solution of an associated nonsymmetric discrete algebraic Riccati equation, which in turn leads to a pseudo-canonical factorization of and concrete formulas of T-1.