Data-Driven Minimax Optimization with Expectation Constraints
Abstract
Attention to data-driven optimization approaches, including the well-known stochastic gradient descent method, has grown significantly over recent decades, but data-driven constraints have rarely been studied, because of the computational challenges of projections onto the feasible set defined by these hard constraints. In this paper, we focus on the non-smooth convex-concave stochastic minimax regime and formulate the data-driven constraints as expectation constraints. The minimax expectation constrained problem subsumes a broad class of real-world applications, including two-player zero-sum game and data-driven robust optimization. We propose a class of efficient primal-dual algorithms to tackle the minimax expectation-constrained problem, and show that our algorithms converge at the optimal rate of . We demonstrate the practical efficiency of our algorithms by conducting numerical experiments on large-scale real-world applications.
Cite
@article{arxiv.2202.07868,
title = {Data-Driven Minimax Optimization with Expectation Constraints},
author = {Shuoguang Yang and Xudong Li and Guanghui Lan},
journal= {arXiv preprint arXiv:2202.07868},
year = {2023}
}