Complexity Lower Bounds for Nonconvex-Strongly-Concave Min-Max Optimization

Abstract

We provide a first-order oracle complexity lower bound for finding stationary points of min-max optimization problems where the objective function is smooth, nonconvex in the minimization variable, and strongly concave in the maximization variable. We establish a lower bound of (ε-2) for deterministic oracles, where ε defines the level of approximate stationarity and is the condition number. Our analysis shows that the upper bound achieved in (Lin et al., 2020b) is optimal in the ε and dependence up to logarithmic factors. For stochastic oracles, we provide a lower bound of (ε-2 + 1/3ε-4). It suggests that there is a significant gap between the upper bound O(3 ε-4) in (Lin et al., 2020a) and our lower bound in the condition number dependence.