Riemannian Stochastic Recursive Momentum Method for non-Convex Optimization

Andi Han; Junbin Gao

2021 IJCAI IJCAI 2021

Riemannian Stochastic Recursive Momentum Method for non-Convex Optimization

Abstract

We propose a stochastic recursive momentum method for Riemannian non-convex optimization that achieves a nearly-optimal complexity to find epsilon-approximate solution with one sample. The new algorithm requires one-sample gradient evaluations per iteration and does not require restarting with a large batch gradient, which is commonly used to obtain a faster rate. Extensive experiment results demonstrate the superiority of the proposed algorithm. Extensions to nonsmooth and constrained optimization settings are also discussed.

🐣 Hot Topic Early Bird — non-convex optimization

🐝 Cross-Pollinator — Artificial Intelligence, Computer Vision, Data Science & Analytics, Deep Learning, Knowledge & Reasoning, Machine Learning, Mathematics & Optimization, Reinforcement Learning

🌉 Interdisciplinary Bridge — Machine Learning and Mathematics & Optimization

Authors

Andi Han , Junbin Gao

Topics

Machine Learning > Optimization & Theory > Optimization Mathematics & Optimization > Optimization > Continuous Optimization Mathematics & Optimization > Optimization > Stochastic Methods Mathematics & Optimization > Optimization > Optimization

Keywords

riemannian optimization stochastic gradient non-convex optimization complexity bound momentum method

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