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Convergence of a Stochastic Gradient Method with Momentum for Non-Smooth Non-Convex Optimization

Vien Van, Mikael Johansson

2020International Conference on Machine Learning10 citations

Abstract

Stochastic gradient methods with momentum are widely used in applications and at the core of optimization subroutines in many popular machine learning libraries. However, their sample complexities have not been obtained for problems beyond those that are convex or smooth. This paper establishes the convergence rate of a stochastic subgradient method with a momentum term of Polyak type for a broad class of non-smooth, non-convex, and constrained optimization problems. Our key innovation is the construction of a special Lyapunov function for which the proven complexity can be achieved without any tuning of the momentum parameter. For smooth problems, we extend the known complexity bound to the constrained case and demonstrate how the unconstrained case can be analyzed under weaker assumptions than the state-of-the-art. Numerical results confirm our theoretical developments.

Topics & Concepts

Subgradient methodMomentum (technical analysis)Convex functionMathematical optimizationConvergence (economics)Stochastic optimizationConvex optimizationMathematicsLyapunov functionApplied mathematicsComputer scienceOptimization problemRegular polygonPhysicsEconomicsEconomic growthGeometryQuantum mechanicsFinanceNonlinear systemStochastic Gradient Optimization TechniquesSparse and Compressive Sensing TechniquesMarkov Chains and Monte Carlo Methods
Convergence of a Stochastic Gradient Method with Momentum for Non-Smooth Non-Convex Optimization | Litcius