New First-Order Algorithms for Stochastic Variational Inequalities
提出两种新算法求解随机强单调变分不等式问题,分别基于额外点序列和动量方向,在适当控制方差时达到最优迭代复杂度,并应用于随机极小极大鞍点问题。
In this paper, we propose two new solution schemes to solve the stochastic strongly monotone variational inequality (VI) problems: the stochastic extra-point solution scheme and the stochastic extra-momentum solution scheme. The first one is a general scheme based on updating the iterative sequence and an auxiliary extra-point sequence. In the case of a deterministic VI model, this approach includes several state-of-the-art first-order methods as its special cases. The second scheme combines two momentum-based directions: the so-called heavy-ball direction and the optimism direction, where only one projection per iteration is required in its updating process. We show that if the variance of the stochastic oracle is appropriately controlled, then both schemes can be made to achieve optimal iteration complexity of $\mathcal{O}\left(\kappa\ln\left(\frac{1}{\epsilon}\right)\right)$ to reach an $\epsilon$-solution for a strongly monotone VI problem with condition number $\kappa$. As a specific application to stochastic VI, we demonstrate how to incorporate a zeroth-order approach for solving stochastic minimax saddle-point problems in our schemes, where only noisy and biased samples of the objective can be obtained, with a total sample complexity of $\mathcal{O}\left(\frac{\kappa}{\epsilon}\right)$.