Title :
Sparse Expander-like Real-valued Projection (SERP) matrices for compressed sensing
Author :
Abdolhosseini Moghadam, Abdolreza ; Radha, Hayder
Author_Institution :
Dept. of Electr. & Comput. Eng., Michigan State Univ., East Lansing, MI, USA
Abstract :
Sparse binary projection matrices are arguably the most commonly used sensing matrices in combinatorial approaches to Compressed Sensing (CS). In this paper, we are interested in properties of Sparse Expander-like Real-valued Projection (SERP) matrices that are constructed by replacing the non-zero entries of sparse binary projection matrices by Gaussian random variables. We prove that these sparse real-valued matrices have a “weak” form of Restricted Isometery Property (RIP). We show that such weak RIP enables this class of matrices to be utilized in all three approaches to the problem of Compressed Sensing, i.e. greedy, geometrical and combinatorial.
Keywords :
Gaussian processes; combinatorial mathematics; compressed sensing; geometry; greedy algorithms; Gaussian random variables; SERP matrices; combinatorial approach; combinatorial approaches; compressed sensing; geometrical approach; greedy approach; restricted isometery property; sensing matrices; sparse binary projection matrices; sparse expander-like real-valued projection; sparse real-valued matrices; Compressed sensing; Computers; Decoding; Educational institutions; Sensors; Sparse matrices; Tensile stress; Compressed sensing; combinatorial approaches;
Conference_Titel :
Global Conference on Signal and Information Processing (GlobalSIP), 2013 IEEE
Conference_Location :
Austin, TX
DOI :
10.1109/GlobalSIP.2013.6736956
