Variance Reduction and Low Sample Complexity in Stochastic Optimization via Proximal Point Method
Optimization and Control
2025-12-23 v3 Machine Learning
Machine Learning
Abstract
High-probability guarantees in stochastic optimization are often obtained only under strong noise assumptions such as sub-Gaussian tails. We show that such guarantees can also be achieved under the weaker assumption of bounded variance by developing a stochastic proximal point method. This method combines a proximal subproblem solver, which inherently reduces variance, with a probability booster that amplifies per-iteration reliability into high-confidence results. The analysis demonstrates convergence with low sample complexity, without restrictive noise assumptions or reliance on mini-batching.
Cite
@article{arxiv.2402.08992,
title = {Variance Reduction and Low Sample Complexity in Stochastic Optimization via Proximal Point Method},
author = {Jiaming Liang},
journal= {arXiv preprint arXiv:2402.08992},
year = {2025}
}
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23 pages