Proximal Point Methods for Optimization with Nonconvex Functional Constraints

Nonconvex optimization is becoming more and more important in machine learning and operations research. In spite of recent progresses, the development of provably efficient algorithm for optimization with nonconvex functional constraints remains open. Such problems have potential applications in risk-averse machine learning, semisupervised learning and robust optimization among others. In this paper, we introduce a new proximal point type method for solving this important class of nonconvex problems by transforming them into a sequence of convex constrained subproblems. We establish the convergence and rate of convergence of this algorithm to the KKT point under different types of constraint qualifications. In particular, we prove that our algorithm will converge to an $\epsilon$-KKT point in $O(1/\epsilon)$ iterations under a properly defined condition. For practical use, we present inexact variants of this approach, in which approximate solutions of the subproblems are computed by either primal or primal-dual type algorithms, and establish their associated rate of convergence. To the best of our knowledge, this is the first time that proximal point type method is developed for nonlinear programing with nonconvex functional constraints, and most of the convergence and complexity results seem to be new in the literature.