Title : ( Determination of Subrepresentations of the Standard Higher Dimensional Shearlet Group )
Authors: masoumeh zare , Rajab Ali Kamyabi Gol , Zahra Amirihafshejani ,
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Abstract
This paper is devoted to definition standard higher dimension shearlet group $ \mathbb{S} = \mathbb{R}^{+} \times \mathbb{R}^{n-1} \times\mathbb{R}^{n} $ and determination of square- integrable subrepresentations of this group. Also we give a char- acterisation of admissible vectors associated with the Hilbert spaces corresponding to each subrepresentation.
Keywords
, Semi direct product, Orbit, Shearlet transform.
@article{paperid:1069050,
author = {Zare, Masoumeh and Kamyabi Gol, Rajab Ali and Amirihafshejani, Zahra},
title = {Determination of Subrepresentations of the Standard Higher Dimensional Shearlet Group},
journal = {Wavelets and Linear Algebra},
year = {2017},
volume = {4},
number = {1},
month = {July},
issn = {2383-1936},
pages = {11--21},
numpages = {10},
keywords = {Semi direct product; Orbit; Shearlet transform.},
}
%0 Journal Article
%T Determination of Subrepresentations of the Standard Higher Dimensional Shearlet Group
%A Zare, Masoumeh
%A Kamyabi Gol, Rajab Ali
%A Amirihafshejani, Zahra
%J Wavelets and Linear Algebra
%@ 2383-1936
%D 2017
