A generalization of Miyachi's theorem

Radouan Daher; Takeshi Kawazoe; Hatem Mejjaoli

doi:10.2969/jmsj/06120551

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A generalization of Miyachi's theorem

Radouan Daher, Takeshi Kawazoe and Hatem Mejjaoli

Journal of the Mathematical Society of Japan, Vol.61(2), pp.551-558

01/04/2009

DOI: https://doi.org/10.2969/jmsj/06120551

Abstract

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Physical Sciences

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The classical Hardy theorem on R; which asserts f and the Fourier transform of f cannot both be very small, was generalized by Miyachi in terms of L-1+L-infinity and log(+)-functions. In this paper we generalize Miyachi's theorem for R-d and then for other generalized Fourier transforms such as the Chebli-Trimeche and the Dunkl transforms.

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Title: A generalization of Miyachi's theorem
Creators - without role: Radouan Daher - University of Hassan II Casablanca
Takeshi Kawazoe - Keio University Shonan Fujisawa
Hatem Mejjaoli - Tunis University
Publication Details: Journal of the Mathematical Society of Japan, Vol.61(2), pp.551-558
Publisher: Math Soc Japan
Number of pages: 8
Grant note: 20540188 / Japan Society for the Promotion of Science; Ministry of Education, Culture, Sports, Science and Technology, Japan (MEXT)
Identifiers: 9930340608331
Academic Unit: Taibah University
Language: English
Resource Type: Journal article