Invariance and near invariance for non-cyclic shift semigroups

Abstract

This paper characterises the subspaces of H2( D) simultaneously invariant under S2 and S2k+1, where S is the unilateral shift, then further identifies the subspaces that are nearly invariant under both (S2)* and (S2k+1)* for k≥ 1. More generally, the simultaneously (nearly) invariant subspaces with respect to (Sm)* and (Skm+γ)* are characterised for m≥ 3, k≥ 1 and γ∈ \1,2,·s, m-1\, which leads to a description of (nearly) invariant subspaces with respect to higher order shifts. Finally, the corresponding results for Toeplitz operators induced by a Blaschke product are presented. Techniques used include a refinement of Hitt's algorithm, the Beurling--Lax theorem, and matrices of analytic functions.