Nearly invariant subspaces for shift semigroups

Abstract

Let \T(t)\t≥0 be a C0-semigroup on an infinite dimensional separable Hilbert space; a suitable definition of near \T(t)*\t≥0 invariance of a subspace is presented in this paper. A series of prototypical examples for minimal nearly \S(t)*\t≥0 invariant subspaces for the shift semigroup \S(t)\t≥0 on L2(0,∞) are demonstrated, which have close links with nearly Tθ* invariance on Hardy spaces of the unit disk for Toeplitz operators associated with an inner function θ. Especially, the corresponding subspaces on Hardy spaces of the right half-plane and the unit disk are related to model spaces. This work further includes a discussion on the structure of the closure of certain subspaces related to model spaces in Hardy spaces.