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Main Authors: Atanasova, Sanja, Jakšić, Smiljana, Maksimović, Snježana, Pilipović, Stevan
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2504.20614
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_version_ 1866914155049517056
author Atanasova, Sanja
Jakšić, Smiljana
Maksimović, Snježana
Pilipović, Stevan
author_facet Atanasova, Sanja
Jakšić, Smiljana
Maksimović, Snježana
Pilipović, Stevan
contents In this paper, we first present an Abelian-type theorem for the fractional Hankel transform (FrHT) within Zemanian generalized function spaces. To prove this, we show that these spaces have the Montel property. Next, we construct a new Zemanian-type space as a projective limit of suitable Banach spaces. Its dual is the largest known distribution space admitting the FrHT. Finally, within this extended setting, we establish new Abelian and Tauberian-type results for the FrHT.
format Preprint
id arxiv_https___arxiv_org_abs_2504_20614
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Abelian and Tauberian results for the fractional Hankel transform in Zemanian-type spaces
Atanasova, Sanja
Jakšić, Smiljana
Maksimović, Snježana
Pilipović, Stevan
Functional Analysis
In this paper, we first present an Abelian-type theorem for the fractional Hankel transform (FrHT) within Zemanian generalized function spaces. To prove this, we show that these spaces have the Montel property. Next, we construct a new Zemanian-type space as a projective limit of suitable Banach spaces. Its dual is the largest known distribution space admitting the FrHT. Finally, within this extended setting, we establish new Abelian and Tauberian-type results for the FrHT.
title Abelian and Tauberian results for the fractional Hankel transform in Zemanian-type spaces
topic Functional Analysis
url https://arxiv.org/abs/2504.20614