Time-Frequency Concentration, Heisenberg Type Uncertainty Principles and Localization Operators for the Continuous Dunkl Wavelet Transform on R-d

Hatem Mejjaoli; Khalifa Trimeche

doi:10.1007/s00009-017-0925-7

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Time-Frequency Concentration, Heisenberg Type Uncertainty Principles and Localization Operators for the Continuous Dunkl Wavelet Transform on R-d

Journal article

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Time-Frequency Concentration, Heisenberg Type Uncertainty Principles and Localization Operators for the Continuous Dunkl Wavelet Transform on R-d

Hatem Mejjaoli and Khalifa Trimeche

Mediterranean journal of mathematics, Vol.14(4), pp.1-33

01/08/2017

DOI: https://doi.org/10.1007/s00009-017-0925-7

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

We consider the continuous Dunkl wavelet transform Phi(D)(h) associated with the Dunkl operators on R-d. We analyze the concentration of this transform on sets of finite measure. In particular, Donoho-Stark and Benedicks type uncertainty principles are given. Next, we prove many versions of Heisenberg type uncertainty principles for Phi(D)(h). Quantitative Shapiro's dispersion uncertainty principle and umbrella theorem are proved for the Dunkl continuous wavelet transform. Finally, we investigate the localization operators for Phi(D)(h), in particular we prove that they are in the Schatten-von Neumann class.

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Title: Time-Frequency Concentration, Heisenberg Type Uncertainty Principles and Localization Operators for the Continuous Dunkl Wavelet Transform on R-d
Creators - without role: Hatem Mejjaoli - Taibah University
Khalifa Trimeche - Tunis El Manar University
Publication Details: Mediterranean journal of mathematics, Vol.14(4), pp.1-33
Publisher: Springer Nature
Number of pages: 33
Identifiers: 9930116308331
Academic Unit: Taibah University
Language: English
Resource Type: Journal article