A CLASS OF COMPACT OPERATORS ON HOMOGENEOUS SPACES

The 44th Annual Iranian Mathematics Conference , 2013-08-27

Title : ( A CLASS OF COMPACT OPERATORS ON HOMOGENEOUS SPACES )

Authors: Rajab Ali Kamyabi Gol ,

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Abstract

Abstract. Let $ be a representation of the homogeneous space G/H, where G be a locally compact group and H be a compact subgroup of G. For an admissible wavelet for $ and 2 Lp(G/H), 1 p 1, we determine a class of bounded compact operators in which each member is related to continuous wavelet transforms on homogeneous space and it is called localization operator.

Keywords

, Homogenous space, square integrable representation, admissible wavelet, localization operator

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BibTeX
EndNote

@inproceedings{paperid:1040144,
author = {Kamyabi Gol, Rajab Ali},
title = {A CLASS OF COMPACT OPERATORS ON HOMOGENEOUS SPACES},
booktitle = {The 44th Annual Iranian Mathematics Conference},
year = {2013},
location = {مشهد, IRAN},
keywords = {Homogenous space; square integrable representation; admissible wavelet; localization operator},
}

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%0 Conference Proceedings
%T A CLASS OF COMPACT OPERATORS ON HOMOGENEOUS SPACES
%A Kamyabi Gol, Rajab Ali
%J The 44th Annual Iranian Mathematics Conference
%D 2013

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