Group sparse optimization via p,q regularization

Abstract

In this paper, we investigate a group sparse optimization problem via p,q regularization in three aspects: theory, algorithm and application. In the theoretical aspect, by introducing a notion of group restricted eigenvalue condition, we establish some oracle property and a global recovery bound of order O(λ22-q) for any point in a level set of the p,q regularization problem, and by virtue of modern variational analysis techniques, we also provide a local analysis of recovery bound of order O(λ2) for a path of local minima. In the algorithmic aspect, we apply the well-known proximal gradient method to solve the p,q regularization problems, either by analytically solving some specific p,q regularization subproblems, or by using the Newton method to solve general p,q regularization subproblems. In particular, we establish the linear convergence rate of the proximal gradient method for solving the 1,q regularization problem under some mild conditions. As a consequence, the linear convergence rate of proximal gradient method for solving the usual q regularization problem (0<q<1) is obtained. Finally in the aspect of application, we present some numerical results on both the simulated data and the real data in gene transcriptional regulation.