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Main Authors: Betsakos, Dimitrios, Cruz-Zamorano, Francisco J.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2504.04207
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author Betsakos, Dimitrios
Cruz-Zamorano, Francisco J.
author_facet Betsakos, Dimitrios
Cruz-Zamorano, Francisco J.
contents This article deals with functions with a prefixed range and their inclusions in Hardy and weighted Bergman spaces. This idea was originally introduced by Hansen for Hardy spaces, and it was recently taken into weighted Bergman spaces by Karafyllia and Karamanlis. We provide a new characterization for the Hardy number of a domain in terms of its Green function. Based on this, we present a class of domains for which the Hardy number and the Bergman number coincide. However, in general, we show that the Hardy number and the Bergman number of a domain are not equal; even for domains which are regular for the Dirichlet problem.
format Preprint
id arxiv_https___arxiv_org_abs_2504_04207
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On the Hardy number and the Bergman number of a planar domain
Betsakos, Dimitrios
Cruz-Zamorano, Francisco J.
Complex Variables
Functional Analysis
Primary: 30H10, 30H20, Secondary: 31A15
This article deals with functions with a prefixed range and their inclusions in Hardy and weighted Bergman spaces. This idea was originally introduced by Hansen for Hardy spaces, and it was recently taken into weighted Bergman spaces by Karafyllia and Karamanlis. We provide a new characterization for the Hardy number of a domain in terms of its Green function. Based on this, we present a class of domains for which the Hardy number and the Bergman number coincide. However, in general, we show that the Hardy number and the Bergman number of a domain are not equal; even for domains which are regular for the Dirichlet problem.
title On the Hardy number and the Bergman number of a planar domain
topic Complex Variables
Functional Analysis
Primary: 30H10, 30H20, Secondary: 31A15
url https://arxiv.org/abs/2504.04207