Generalized Volterra-type integral operators between Bloch-type spaces
Functional Analysis
2024-05-29 v2
Abstract
The Volterra-type integral operator plays an essential role in modern complex analysis and operator theory. Recently, Chalmoukis \cite{Cn} introduced a generalized integral operator, say , defined by where and . is the th iteration of the integral operator . In this paper, we introduce a more generalized integral operators that cover on the Bloch-type space , defined by We show the rigidity of the operator and further the sum , where . Specifically, the boundedness and compactness of are equal to those of each . Moreover, the boundedness and compactness of are independent of when .
Keywords
Cite
@article{arxiv.2405.16228,
title = {Generalized Volterra-type integral operators between Bloch-type spaces},
author = {Cezhong Tong and Xin He and Zicong Yang},
journal= {arXiv preprint arXiv:2405.16228},
year = {2024}
}