Title :
An ALPS view of sparse recovery
Author_Institution :
Laboratory for Information and Inference Systems, Switzerland
Abstract :
We provide two compressive sensing (CS) recovery algorithms based on iterative hard-thresholding. The algorithms, collectively dubbed as algebraic pursuits (ALPS), exploit the restricted isometry properties of the CS measurement matrix within the algebra of Nesterov´s optimal gradient methods. We theoretically characterize the approximation guarantees of ALPS for signals that are sparse on ortho-bases as well as on tight-frames. Simulation results demonstrate a great potential for ALPS in terms of phase-transition, noise robustness, and CS reconstruction.
Keywords :
gradient methods; matrix algebra; signal reconstruction; ALPS view; CS recovery algorithms; Nesterov optimal gradient method; algebraic pursuits; compressive sensing recovery algorithms; matrix; noise robustness; phase-transition; sparse recovery; Approximation algorithms; Approximation methods; Compressed sensing; Convergence; Dictionaries; Discrete cosine transforms; Noise;
Conference_Titel :
Acoustics, Speech and Signal Processing (ICASSP), 2011 IEEE International Conference on
Conference_Location :
Prague
Print_ISBN :
978-1-4577-0538-0
Electronic_ISBN :
1520-6149
DOI :
10.1109/ICASSP.2011.5947681
