Time-frequency concentration and localization operators associated with the directional short-time fourier transform

Saifallah Ghobber; Hatem Mejjaoli

doi:10.1007/s11868-022-00465-8

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Journal article

Time-frequency concentration and localization operators associated with the directional short-time fourier transform

Saifallah Ghobber and Hatem Mejjaoli

Journal of pseudo-differential operators and applications, Vol.13(3)

01/09/2022

DOI: https://doi.org/10.1007/s11868-022-00465-8

Abstract

Algebra

Analysis

Applications of Mathematics

Article

Functional Analysis

Mathematics

Mathematics and Statistics

Operator Theory

Partial Differential Equations

In the present article, we prove new quantitative uncertainty principles for the directional short-time Fourier transform. Next, we introduce the notion of the generalized wavelet multipliers associated with the inverse of the directional short-time Fourier transform. We study the boundedness, Schatten class properties of these operator and give a trace formula. In particular we prove that the generalized Landau-Pollak-Slepian operator is a generalized wavelet multiplier. Finally, we investigate the boundedness and compactness of the generalized wavelet multipliers in the L p -spaces.

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Title: Time-frequency concentration and localization operators associated with the directional short-time fourier transform
Creators - without role: Saifallah Ghobber - King Faisal University
Hatem Mejjaoli - Taibah University
Publication Details: Journal of pseudo-differential operators and applications, Vol.13(3)
Publisher: Springer International Publishing
Identifiers: 9920337908331
Academic Unit: King Faisal University; Taibah University
Language: English
Resource Type: Journal article