Caldern's reproducing formula and uncertainty principle for the continuous wavelet transform associated with the q-Bessel operator

Bochra Nefzi; Kamel Brahim

doi:10.1007/s11868-017-0209-9

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Journal article

Caldern's reproducing formula and uncertainty principle for the continuous wavelet transform associated with the q-Bessel operator

Bochra Nefzi and Kamel Brahim

Journal of pseudo-differential operators and applications, Vol.9(3), pp.495-522

01/09/2018

DOI: https://doi.org/10.1007/s11868-017-0209-9

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

In this paper, we present some new elements of harmonic analysis related to the q-Bessel Fourier transform introduced earlier in Dhaouadi (Bull Math Anal Appl 5(2):42-60, 2013), Dhaouadi et al. (J Inequal Pure Appl Math 7(5):171, 2006), we define and study the q-wavelet and the continuous q-wavelet transform associated with this harmonic analysis. Thus, some results (Plancherel's formula, inversion formula, etc.) are established. Next, we prove a Caldern's formula and an analogue of Heisenberg's inequality for the continuous q-wavelet transform.

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Title: Caldern's reproducing formula and uncertainty principle for the continuous wavelet transform associated with the q-Bessel operator
Creators - without role: Bochra Nefzi - Tunis El Manar University
Kamel Brahim - Tunis El Manar University
Publication Details: Journal of pseudo-differential operators and applications, Vol.9(3), pp.495-522
Publisher: Springer Nature
Number of pages: 28
Identifiers: 9913273208331
Academic Unit: Al Jouf University
Language: English
Resource Type: Journal article