English

Composition operators on Hardy-Sobolev spaces with bounded reproducing kernels

Complex Variables 2022-07-29 v3 Functional Analysis

Abstract

For any real β\beta let Hβ2H^2_\beta be the Hardy-Sobolev space on the unit disc D\mathbb{D}. Hβ2H^2_\beta is a reproducing kernel Hilbert space and its reproducing kernel is bounded when β>1/2\beta>1/2. In this paper, we characterize that for a non-constant analytic function φ:DD\varphi:\mathbb{D}\to\mathbb{D}, when the composition operator CφC_{\varphi } on Hβ2H^{2}_{\beta } is Fredholm. For 1/2<β<11/2<\beta<1, we also prove that CφC_{\varphi } has dense range in Hβ2H_{\beta }^{2} if and only if the polynomials are dense in a certain Dirichlet space of the domain φ(D)\varphi(\mathbb{D}). It follows that if the range of CφC_{\varphi } is dense in Hβ2H_{\beta }^{2}, then φ\varphi is a weak-star generator of HH^{\infty}, although the conclusion is false for the classical Dirichlet space D\mathfrak{D}. Moreover, we study the relation between the density of the rang of CφC_{\varphi } and the cyclic vector of the multiplier Mφβ.M_{\varphi}^{\beta}.

Keywords

Cite

@article{arxiv.2101.03659,
  title  = {Composition operators on Hardy-Sobolev spaces with bounded reproducing kernels},
  author = {Guangfu Cao and Li He and Sui Huang},
  journal= {arXiv preprint arXiv:2101.03659},
  year   = {2022}
}

Comments

there are some gaps in the paper

R2 v1 2026-06-23T21:58:20.530Z