English

Difference of weighted composition operators between Bergman spaces

Functional Analysis 2025-07-29 v1 Complex Variables

Abstract

We first obtain a simpler proof of the main results in [IEOT, {\bf 93}(2021), 17], which characterized the bounded and compact differences Cu,φCv,ψC_{u,\varphi}-C_{v,\psi} of two weighted composition operators acting from Aαp(D)A_{\alpha}^p(\mathbb{D}) to Aαq(D)A_{\alpha}^q(\mathbb{D}). Then we get some characterizations for the difference of weighted composition operator belonging to Schatten class. Moreover, compact difference of a weighted composition operator and a unweighted composition operator on Hardy space is also studied. It shows a rigidity, i.e. Cu,φCψC_{u,\varphi}-C_{\psi} is compact on H2(D)H^{2}(\mathbb{D}) if and only if both Cu,φ:H2(D)A12(D)C_{u',\varphi}:H^2(\mathbb{D})\to A_{1}^2(\mathbb{D}) and Cuφ,φCψ,ψ:A12(D)A12(D)C_{u\varphi',\varphi}-C_{\psi',\psi}:A_{1}^2(\mathbb{D})\to A_{1}^2(\mathbb{D}) are compact, which generalize a result in [JFA, {\bf 278}(2020), 108401].

Keywords

Cite

@article{arxiv.2507.19735,
  title  = {Difference of weighted composition operators between Bergman spaces},
  author = {Jiaoye Du and Cezhong Tong and Zicong Yang},
  journal= {arXiv preprint arXiv:2507.19735},
  year   = {2025}
}
R2 v1 2026-07-01T04:19:45.928Z