Invariant subspaces of analytic perturbations

Abstract

By analytic perturbations, we refer to shifts that are finite rank perturbations of the form Mz + F, where Mz is the unilateral shift and F is a finite rank operator on the Hardy space over the open unit disc. Here shift refers to the multiplication operator Mz on some analytic reproducing kernel Hilbert space. In this paper, we first isolate a natural class of finite rank operators for which the corresponding perturbations are analytic, and then we present a complete classification of invariant subspaces of those analytic perturbations. We also exhibit some instructive examples and point out several distinctive properties (like cyclicity, essential normality, hyponormality, etc.) of analytic perturbations.