DocumentCode
1501310
Title
An Alternating
Approach to the Compressed Sensing Problem
Author
Chrétien, Stéphane
Author_Institution
Dept. of Math., Univ. of Franche Comte, Besancon, France
Volume
17
Issue
2
fYear
2010
Firstpage
181
Lastpage
184
Abstract
Compressed sensing is a new methodology for constructing sensors which allow sparse signals to be efficiently recovered using only a small number of observations. The recovery problem can often be stated as the one of finding the solution of an underdetermined system of linear equations with the smallest possible support. The most studied relaxation of this hard combinatorial problem is the l 1-relaxation consisting of searching for solutions with smallest l 1-norm. In this short note, based on the ideas of Lagrangian duality, we introduce an alternating l 1 relaxation for the recovery problem enjoying higher recovery rates in practice than the plain l 1 relaxation and some recent improvements of this relaxation.
Keywords
combinatorial mathematics; data compression; duality (mathematics); sensors; Lagrangian duality; combinatorial problem; compressed sensing problem; linear equations; recovery problem; sparse signals; $NP$ -hard optimization problems; $l_1$ relaxation; Compressed sensing; Lagrangian relaxation; exact recovery; reweighted $l_1$ relaxation;
fLanguage
English
Journal_Title
Signal Processing Letters, IEEE
Publisher
ieee
ISSN
1070-9908
Type
jour
DOI
10.1109/LSP.2009.2034554
Filename
5288577
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