A Novel Two-Parameter Penalty: Relaxation Degree Analysis and Sparse Signal Recovery

Abstract

In this article, we introduce a nonconvex two-parameter penalty function Pa,p, parameterized by a∈(0,∞) and p∈(0,1], and the relaxation degree RDP for a separable nonconvex penalty function P. Based on Pa,p, we further propose the Pa,p minimization framework for sparse signal recovery. This framework generalizes the TL1 minimization model established by S. Zhang and J. Xin (corresponding to the special case p=1) and provides a unified and flexible family of nonconvex penalty functions for sparse signal recovery. Using the sparse convex-combination technique, we establish both exact and stable sparse signal recovery under the restricted isometry property (RIP). To efficiently solve the resulting nonconvex optimization problem, we apply a modified iteratively re-weighted least squares method and the difference of convex functions algorithm (DCA) to develop the IRLSTLp algorithm for unconstrained Pa,p minimization and prove some convergence results. Finally, some numerical experiments are conducted to show the flexibility of the Pa,p minimization framework, the robustness of the IRLSTLp, and also the utility of the relaxation degree.