Paper Info
Title
Impulsive Noise Robust Sparse Recovery via Continuous Mixed Norm.
Abstract
This paper investigates the problem of sparse signal recovery in the presence of additive impulsive noise. The heavytailed impulsive noise is well modelled with stable distributions. Since there is no explicit formulation for the probability density function of $Salpha S$ distribution, alternative approximations like Generalized Gaussian Distribution (GGD) are used which impose $ell_p$-norm fidelity on the residual error. In this paper, we exploit a Continuous Mixed Norm (CMN) for robust sparse recovery instead of $ell_p$-norm. We show that in blind conditions, i.e., in case where the parameters of noise distribution are unknown, incorporating CMN can lead to near optimal recovery. We apply Alternating Direction Method of Multipliers (ADMM) for solving the problem induced by utilizing CMN for robust sparse recovery. In this approach, CMN is replaced with a surrogate function and Majorization-Minimization technique is incorporated to solve the problem. Simulation results confirm the efficiency of the proposed method compared to some recent algorithms in the literature for impulsive noise robust sparse recovery.
Year
Venue
Field
2018
arXiv: Signal Processing
Applied mathematics,Residual,Fidelity,Signal recovery,Probability density function,Mathematics,Generalized normal distribution
DocType
Volume
Citations 
Journal
abs/1804.04614
0
PageRank 
References 
Authors
0.34
0
4
Name
Order
Citations
PageRank
Amirhossein Javaheri101.01
Hadi. Zayyani29615.51
Mário A. T. Figueiredo37203561.50
Farrokh Marvasti411313.55