Stable Cosparse Recovery via p-analysis Optimization

Abstract

In this paper we study the p-analysis optimization (0<p≤1) problem for cosparse signal recovery. We establish a bound for recovery error via the restricted p-isometry property over any subspace. We further prove that the nonconvex q-analysis optimization can do recovery with a lower sample complexity and in a wider range of cosparsity than its convex counterpart. In addition, we develop an iteratively reweighted method to solve the optimization problem under a variational framework. Empirical results of preliminary computational experiments illustrate that the nonconvex method outperforms its convex counterpart.