A new class of uncertainty principles for the k-Hankel wavelet transform

Hatem Mejjaoli; Firdous A. Shah

doi:10.1515/forum-2022-0137

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A new class of uncertainty principles for the k-Hankel wavelet transform

Journal article

Peer reviewed

A new class of uncertainty principles for the k-Hankel wavelet transform

Hatem Mejjaoli and Firdous A. Shah

Forum mathematicum, Vol.35(3), pp.739-762

01/05/2023

DOI: https://doi.org/10.1515/forum-2022-0137

Abstract

42A38

42B10

42C40

43A32

44A15

47G10

Benedick–Amrein–Berthier inequality

Heisenberg’s uncertainty principle

local uncertainty inequality

Shapiro’s dispersion theorem

umbrella theorem

The -Hankel wavelet transform is a novel addition to the class of wavelet transforms which relies on a pair of generalized translation and dilation operators governed by the well-known -Hankel transform. The aim of this paper is to explore a class of new uncertainty principles associated with the -Hankel wavelet transform, including the Benedick–Amrein–Berthier and Shapiro’s uncertainty inequalities. Nevertheless, we shall also establish certain local-type uncertainty principles abreast of the mean dispersion theorems for the -Hankel wavelet transform.

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Title: A new class of uncertainty principles for the k-Hankel wavelet transform
Creators - without role: Hatem Mejjaoli - Taibah University
Firdous A. Shah - University of Kashmir
Publication Details: Forum mathematicum, Vol.35(3), pp.739-762
Publisher: De Gruyter
Number of pages: 24
Identifiers: 9930153308331
Academic Unit: Taibah University
Language: English
Resource Type: Journal article