Efficient q Minimization Algorithms for Compressive Sensing Based on Proximity Operator

Abstract

This paper considers solving the unconstrained q-norm (0≤ q<1) regularized least squares (q-LS) problem for recovering sparse signals in compressive sensing. We propose two highly efficient first-order algorithms via incorporating the proximity operator for nonconvex q-norm functions into the fast iterative shrinkage/thresholding (FISTA) and the alternative direction method of multipliers (ADMM) frameworks, respectively. Furthermore, in solving the nonconvex q-LS problem, a sequential minimization strategy is adopted in the new algorithms to gain better global convergence performance. Unlike most existing q-minimization algorithms, the new algorithms solve the q-minimization problem without smoothing (approximating) the q-norm. Meanwhile, the new algorithms scale well for large-scale problems, as often encountered in image processing. We show that the proposed algorithms are the fastest methods in solving the nonconvex q-minimization problem, while offering competent performance in recovering sparse signals and compressible images compared with several state-of-the-art algorithms.