We study the problem of finding a near-stationary point for smooth minimax optimization. The recent proposed extra anchored gradient (EAG) methods achieve the optimal convergence rate for the convex-concave minimax problem in deterministic setting. However, the direct extension of EAG to stochastic optimization is not efficient.In this paper, we design a novel stochastic algorithm called Recursive Anchored IteratioN (RAIN). We show that the RAIN achieves near-optimal stochastic first-order oracle (SFO) complexity for stochastic minimax optimization in both convex-concave and strongly-convex-strongly-concave cases. In addition, we extend the idea of RAIN to solve structured nonconvex-nonconcave minimax problem and it also achieves near-optim...
We consider the stochastic optimization problem with smooth but not necessarily convex objectives in...
We analyze the convergence rates of stochastic gradient algorithms for smooth finite-sum minimax opt...
Recently, convex nested stochastic composite optimization (NSCO) has received considerable attention...
The problem of minimax optimization arises in a wide range of applications. When the objective funct...
Large scale convex-concave minimax problems arise in numerous applications, including game theory, r...
This paper deals with minimax problems in which the "inner" problem of maximization is not concave. ...
This paper studies the uniform convergence and generalization bounds for nonconvex-(strongly)-concav...
In this paper, we revisit the smooth and strongly-convex-strongly-concave minimax optimization probl...
Nonconvex-concave minimax optimization has received intense interest in machine learning, including ...
We study the smooth minimax optimization problem $\min_{\bf x}\max_{\bf y} f({\bf x},{\bf y})$, wher...
In this thesis we investigate the design and complexity analysis of the algorithms to solve convex p...
Standard gradient descent-ascent (GDA)-type algorithms can only find stationary points in nonconvex ...
This thesis aims at developing efficient algorithms for solving complex and constrained convex optim...
We consider a step search method for continuous optimization under a stochastic setting where the fu...
Many fundamental machine learning tasks can be formulated as min-max optimization. This motivates us...
We consider the stochastic optimization problem with smooth but not necessarily convex objectives in...
We analyze the convergence rates of stochastic gradient algorithms for smooth finite-sum minimax opt...
Recently, convex nested stochastic composite optimization (NSCO) has received considerable attention...
The problem of minimax optimization arises in a wide range of applications. When the objective funct...
Large scale convex-concave minimax problems arise in numerous applications, including game theory, r...
This paper deals with minimax problems in which the "inner" problem of maximization is not concave. ...
This paper studies the uniform convergence and generalization bounds for nonconvex-(strongly)-concav...
In this paper, we revisit the smooth and strongly-convex-strongly-concave minimax optimization probl...
Nonconvex-concave minimax optimization has received intense interest in machine learning, including ...
We study the smooth minimax optimization problem $\min_{\bf x}\max_{\bf y} f({\bf x},{\bf y})$, wher...
In this thesis we investigate the design and complexity analysis of the algorithms to solve convex p...
Standard gradient descent-ascent (GDA)-type algorithms can only find stationary points in nonconvex ...
This thesis aims at developing efficient algorithms for solving complex and constrained convex optim...
We consider a step search method for continuous optimization under a stochastic setting where the fu...
Many fundamental machine learning tasks can be formulated as min-max optimization. This motivates us...
We consider the stochastic optimization problem with smooth but not necessarily convex objectives in...
We analyze the convergence rates of stochastic gradient algorithms for smooth finite-sum minimax opt...
Recently, convex nested stochastic composite optimization (NSCO) has received considerable attention...