A Generalized Beurling Theorem for Some Lie Groups

M. Elloumi; A. Baklouti; S. Azaouzi

doi:10.1134/S0001434620010058

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A Generalized Beurling Theorem for Some Lie Groups

Journal article

Peer reviewed

A Generalized Beurling Theorem for Some Lie Groups

M. Elloumi, A. Baklouti and S. Azaouzi

MATHEMATICAL NOTES, Vol.107(1-2), pp.42-53

01/01/2020

DOI: https://doi.org/10.1134/S0001434620010058

Abstract

Mathematics

Physical Sciences

Science & Technology

For any real numbers p,q >= 1, we present in this paper a (p, q)-generalized version of Beurling's uncertainty principle for Double-struck capital R-n, which largely extends the classical Beurling's theorem. We then define its analog for compact extensions of Double-struck capital R-n and also for Heisenberg groups.

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Title: A Generalized Beurling Theorem for Some Lie Groups
Creators - without role: M. Elloumi - King Faisal University
A. Baklouti - University of Sfax
S. Azaouzi - University of Sfax
Publication Details: MATHEMATICAL NOTES, Vol.107(1-2), pp.42-53
Publisher: Springer Nature
Number of pages: 12
Grant note: 180098 / Deanship of Scientific Research at King Faisal University
Identifiers: 9919766408331
Academic Unit: King Faisal University; Umm Al Qura University
Language: English
Resource Type: Journal article