English

Sub-Bergman Hilbert spaces on the unit disk III

Complex Variables 2024-11-20 v1 Functional Analysis

Abstract

For a bounded analytic function φ\varphi on the unit disk \D\D with φ1\|\varphi\|_\infty\le1 we consider the defect operators DφD_\varphi and DφD_{\overline\varphi} of the Toeplitz operators TφT_\varphi and TφT_{\overline\varphi}, respectively, on the weighted Bergman space Aα2A^2_\alpha. The ranges of DφD_\varphi and DφD_{\overline\varphi}, written as H(φ)H(\varphi) and H(φ)H(\overline\varphi) and equipped with appropriate inner products, are called sub-Bergman spaces. We prove the following three results in the paper: for 1<α0-1<\alpha\le0 the space H(φ)H(\varphi) has a complete Nevanlinna-Pick kernel if and only if φ\varphi is a M\"{o}bius map; for α>1\alpha>-1 we have H(φ)=H(φ)=Aα12H(\varphi)=H(\overline\varphi)=A^2_{\alpha-1} if and only if the defect operators DφD_\varphi and DφD_{\overline\varphi} are compact; and for α>1\alpha>-1 we have Dφ2(Aα2)=Dφ2(Aα2)=Aα22D^2_\varphi(A^2_\alpha)= D^2_{\overline\varphi}(A^2_\alpha)=A^2_{\alpha-2} if and only if φ\varphi is a finite Blaschke product. In some sense our restrictions on α\alpha here are best possible.

Keywords

Cite

@article{arxiv.2302.01980,
  title  = {Sub-Bergman Hilbert spaces on the unit disk III},
  author = {Shuaibing Luo and Kehe Zhu},
  journal= {arXiv preprint arXiv:2302.01980},
  year   = {2024}
}

Comments

19 pages

R2 v1 2026-06-28T08:31:43.438Z