Restricted $p$-isometry property and its application for nonconvex compressive sensing
Abstract
Compressed sensing is a new scheme which shows the ability to recover sparse signal from fewer measurements, using minimization. Recently, Chartrand and Staneva shown in \cite{CS1} that the minimization with recovers sparse signals from fewer linear measurements than does the minimization. They proved that minimization with recovers -sparse signals from fewer Gaussian random measurements for some smaller with probability exceeding The first aim of this paper is to show that above result is right for the case of random,Gaussian measurements with probability exceeding where is the numbers of rows of random, Gaussian measurements and is a positive constant that guarantees for smaller. The second purpose of the paper is to show that under certain weaker conditions, decoders are stable in the sense that they are instance optimal for a large class of encoder for
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Cite
@article{arxiv.1007.4396,
title = {Restricted $p$-isometry property and its application for nonconvex compressive sensing},
author = {Yi Shen and Song Li},
journal= {arXiv preprint arXiv:1007.4396},
year = {2011}
}
Comments
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