DocumentCode
997951
Title
On sparse representations in arbitrary redundant bases
Author
Fuchs, Jean-Jacques
Author_Institution
IRISA/Univ. de Rennes, France
Volume
50
Issue
6
fYear
2004
fDate
6/1/2004 12:00:00 AM
Firstpage
1341
Lastpage
1344
Abstract
The purpose of this contribution is to generalize some recent results on sparse representations of signals in redundant bases. The question that is considered is the following: given a matrix A of dimension (n,m) with m>n and a vector b=Ax, find a sufficient condition for b to have a unique sparsest representation x as a linear combination of columns of A. Answers to this question are known when A is the concatenation of two unitary matrices and either an extensive combinatorial search is performed or a linear program is solved. We consider arbitrary A matrices and give a sufficient condition for the unique sparsest solution to be the unique solution to both a linear program or a parametrized quadratic program. The proof is elementary and the possibility of using a quadratic program opens perspectives to the case where b=Ax+e with e a vector of noise or modeling errors.
Keywords
combinatorial mathematics; linear programming; matrix algebra; quadratic programming; signal representation; combinatorial search; global matched filter; linear program; modeling error; noise; parametrized quadratic program; redundant dictionaries; sparse signal representation; unitary matrix; Dictionaries; Matched filters; Parameter estimation; Quadratic programming; Sparse matrices; Sufficient conditions; System testing; Vectors; Basis pursuit; global matched filter; linear program; quadratic program; redundant dictionaries; sparse representations;
fLanguage
English
Journal_Title
Information Theory, IEEE Transactions on
Publisher
ieee
ISSN
0018-9448
Type
jour
DOI
10.1109/TIT.2004.828141
Filename
1302316
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