Riemannian stochastic recursive momentum method for non-convex optimization

Junbin Gao

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 near-optimal complexity of O(ε-3) to find ε-approximate solution with one sample. That is, our method requires O(1) gradient evaluations per iteration and does not require restarting with a large batch gradient, which is commonly used to obtain the faster rate. Extensive experiment results demonstrate the superiority of our proposed algorithm.

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