Opuscula Mathematica (Jul 2020)

Hilbert-Schmidtness of weighted composition operators and their differences on Hardy spaces

  • Ching-on Lo,
  • Anthony Wai-keung Loh

DOI
https://doi.org/10.7494/OpMath.2020.40.4.495
Journal volume & issue
Vol. 40, no. 4
pp. 495 – 507

Abstract

Read online

Let \(u\) and \(\varphi\) be two analytic functions on the unit disk \(\mathbb{D}\) such that \(\varphi(\mathbb{D}) \subset \mathbb{D}\). A weighted composition operator \(uC_{\varphi}\) induced by \(u\) and \(\varphi\) is defined on \(H^2\), the Hardy space of \(\mathbb{D}\), by \(uC_{\varphi}f := u \cdot f \circ \varphi\) for every \(f\) in \(H^2\). We obtain sufficient conditions for Hilbert-Schmidtness of \(uC_{\varphi}\) on \(H^2\) in terms of function-theoretic properties of \(u\) and \(\varphi\). Moreover, we characterize Hilbert-Schmidt difference of two weighted composition operators on \(H^2\).

Keywords