Quasi-Newton Methods for Saddle Point Problems and Beyond

Abstract

This paper studies quasi-Newton methods for solving strongly-convex-strongly-concave saddle point problems (SPP). We propose greedy and random Broyden family updates for SPP, which have explicit local superlinear convergence rate of O((1-1n2)k(k-1)/2), where n is dimensions of the problem, is the condition number and k is the number of iterations. The design and analysis of proposed algorithm are based on estimating the square of indefinite Hessian matrix, which is different from classical quasi-Newton methods in convex optimization. We also present two specific Broyden family algorithms with BFGS-type and SR1-type updates, which enjoy the faster local convergence rate of O((1-1n)k(k-1)/2). Additionally, we extend our algorithms to solve general nonlinear equations and prove it enjoys the similar convergence rate.