Study of nearly invariant subspaces with finite defect in Hilbert spaces

Abstract

In this article, we briefly describe nearly T-1 invariant subspaces with finite defect for a shift operator T having finite multiplicity acting on a separable Hilbert space H as a generalization of nearly T-1 invariant subspaces introduced by Liang and Partington in YP. In other words we characterize nearly T-1 invariant subspaces with finite defect in terms of backward shift invariant subspaces in vector-valued Hardy spaces by using Theorem 3.5 in CDP. Furthermore, we also provide a concrete representation of the nearly TB-1 invariant subspaces with finite defect in a scale of Dirichlet-type spaces Dα for α ∈ [-1,1] corresponding to any finite Blashcke product B.