Beurling type invariant subspaces of composition operators

Abstract

Let D be the open unit disk in C, let H2 denote the Hardy space on D and let : D → D be a holomorphic self map of D. The composition operator C on H2 is defined by \[ (C f)(z)=f((z)) (f ∈ H2,\, z ∈ D). \] Denote by S(D) the set of all functions that are holomorphic and bounded by one in modulus on D, that is \[ S(D) = \ ∈ H∞(D): \|\|∞ := z ∈ D |(z)| ≤ 1\. \] The elements of S(D) are called Schur functions. The aim of this paper is to answer the following question concerning invariant subspaces of composition operators: Characterize , holomorphic self maps of D, and inner functions θ ∈ H∞(D) such that the Beurling type invariant subspace θ H2 is an invariant subspace for C. We prove the following result: C (θ H2) ⊂eq θ H2 if and only if \[ θ θ ∈ S(D). \] This classification also allows us to recover or improve some known results on Beurling type invariant subspaces of composition operators.