English

Beurling type invariant subspaces of composition operators

Functional Analysis 2020-08-31 v3 Complex Variables Operator Algebras

Abstract

Let D\mathbb{D} be the open unit disk in C\mathbb{C}, let H2H^2 denote the Hardy space on D\mathbb{D} and let φ:DD\varphi : \mathbb{D} \rightarrow \mathbb{D} be a holomorphic self map of D\mathbb{D}. The composition operator CφC_{\varphi} on H2H^2 is defined by (Cφf)(z)=f(φ(z))(fH2,zD). (C_{\varphi} f)(z)=f(\varphi(z)) \quad \quad (f \in H^2,\, z \in \mathbb{D}). Denote by S(D)\mathcal{S}(\mathbb{D}) the set of all functions that are holomorphic and bounded by one in modulus on D\mathbb{D}, that is S(D)={ψH(D):ψ:=supzDψ(z)1}. \mathcal{S}(\mathbb{D}) = \{\psi \in H^\infty(\mathbb{D}): \|\psi\|_{\infty} := \sup_{z \in \mathbb{D}} |\psi(z)| \leq 1\}. The elements of S(D)\mathcal{S}(\mathbb{D}) are called Schur functions. The aim of this paper is to answer the following question concerning invariant subspaces of composition operators: Characterize φ\varphi, holomorphic self maps of D\mathbb{D}, and inner functions θH(D)\theta \in H^\infty(\mathbb{D}) such that the Beurling type invariant subspace θH2\theta H^2 is an invariant subspace for CφC_{\varphi}. We prove the following result: Cφ(θH2)θH2C_{\varphi} (\theta H^2) \subseteq \theta H^2 if and only if θφθS(D). \frac{\theta \circ \varphi}{\theta} \in \mathcal{S}(\mathbb{D}). This classification also allows us to recover or improve some known results on Beurling type invariant subspaces of composition operators.

Keywords

Cite

@article{arxiv.2004.00264,
  title  = {Beurling type invariant subspaces of composition operators},
  author = {Snehasish Bose and P. Muthukumar and Jaydeb Sarkar},
  journal= {arXiv preprint arXiv:2004.00264},
  year   = {2020}
}

Comments

13 pages, revised. To appear in Journal of Operator Theory

R2 v1 2026-06-23T14:34:54.508Z