Title :
Estimation with random linear mixing, belief propagation and compressed sensing
Abstract :
We apply Guo and Wang´s relaxed belief propagation (BP) method to the estimation of a random vector from linear measurements followed by a componentwise probabilistic measurement channel. The relaxed BP method is a Gaussian approximation of standard BP that offers significant computational savings for dense measurement matrices. The main contribution of this paper is to extend Guo and Wang´s relaxed BP method and analysis to general (non-AWGN) output channels. Specifically, we present detailed equations for implementing relaxed BP for general channels and show that the relaxed BP has an identical asymptotic large sparse limit behavior as standard BP as predicted by the Guo and Wang´s state evolution (SE) equations. Applications are presented to compressed sensing and estimation with bounded noise.
Keywords :
Gaussian channels; Gaussian distribution; approximation theory; data compression; estimation theory; matrix algebra; Gaussian approximation; belief propagation; compressed sensing; dense measurement matrices; estimation method; linear measurements; nonAWGN output channels; probabilistic measurement channel; random linear mixing; random vector; state evolution; Additive white noise; Belief propagation; Compressed sensing; Equations; Gaussian approximation; Gaussian noise; Multiaccess communication; Parity check codes; Sparse matrices; Vectors; Non-Gaussian estimation; belief propagation; bounded noise; compressed sensing; density evolution; sparsity;
Conference_Titel :
Information Sciences and Systems (CISS), 2010 44th Annual Conference on
Conference_Location :
Princeton, NJ
Print_ISBN :
978-1-4244-7416-5
Electronic_ISBN :
978-1-4244-7417-2
DOI :
10.1109/CISS.2010.5464768
