An Iteratively Reweighted Method for Sparse Optimization on Nonconvex p Ball

Abstract

This paper is intended to solve the nonconvex p-ball constrained nonlinear optimization problems. An iteratively reweighted method is proposed, which solves a sequence of weighted 1-ball projection subproblems. At each iteration, the next iterate is obtained by moving along the negative gradient with a stepsize and then projecting the resulted point onto the weighted 1 ball to approximate the p ball. Specifically, if the current iterate is in the interior of the feasible set, then the weighted 1 ball is formed by linearizing the p norm at the current iterate. If the current iterate is on the boundary of the feasible set, then the weighted 1 ball is formed differently by keeping those zero components in the current iterate still zero. In our analysis, we prove that the generated iterates converge to a first-order stationary point. Numerical experiments demonstrate the effectiveness of the proposed method.