Iterative thresholding algorithm based on non-convex method for modified lp-norm regularization minimization

Abstract

Recently, the p-norm regularization minimization problem (Ppλ) has attracted great attention in compressed sensing. However, the p-norm \|x\|pp in problem (Ppλ) is nonconvex and non-Lipschitz for all p∈(0,1), and there are not many optimization theories and methods are proposed to solve this problem. In fact, it is NP-hard for all p∈(0,1) and λ>0. In this paper, we study two modified p regularization minimization problems to approximate the NP-hard problem (Ppλ). Inspired by the good performance of Half algorithm and 2/3 algorithm in some sparse signal recovery problems, two iterative thresholding algorithms are proposed to solve the problems (Pp,1/2,ελ) and (Pp,2/3,ελ) respectively. Numerical results show that our algorithms perform effectively in finding the sparse signal in some sparse signal recovery problems for some proper p∈(0,1).