Title :
A fast reconstruction algorithm for deterministic compressive sensing using second order reed-muller codes
Author :
Howard, S.D. ; Calderbank, A.R. ; Searle, S.J.
Author_Institution :
Defence Sci.&Technol. Organ., Edinburgh, SA
Abstract :
This paper proposes a deterministic compressed sensing matrix that comes by design with a very fast reconstruction algorithm, in the sense that its complexity depends only on the number of measurements n and not on the signal dimension N. The matrix construction is based on the second order Reed- Muller codes and associated functions. This matrix does not have RIP uniformly with respect to all k-sparse vectors, but it acts as a near isometry on k-sparse vectors with very high probability.
Keywords :
Reed-Muller codes; matrix algebra; signal reconstruction; compressed sensing matrix; deterministic compressive sensing; fast reconstruction algorithm; matrix construction; second order Reed-Muller codes; Algorithm design and analysis; Australia; Codes; Compressed sensing; Decoding; Geometry; Null space; Reconstruction algorithms; Signal design; Vectors;
Conference_Titel :
Information Sciences and Systems, 2008. CISS 2008. 42nd Annual Conference on
Conference_Location :
Princeton, NJ
Print_ISBN :
978-1-4244-2246-3
Electronic_ISBN :
978-1-4244-2247-0
DOI :
10.1109/CISS.2008.4558486
