Lower Bounds for Non-Convex Stochastic Optimization
Abstract
We lower bound the complexity of finding -stationary points (with gradient norm at most ) using stochastic first-order methods. In a well-studied model where algorithms access smooth, potentially non-convex functions through queries to an unbiased stochastic gradient oracle with bounded variance, we prove that (in the worst case) any algorithm requires at least queries to find an stationary point. The lower bound is tight, and establishes that stochastic gradient descent is minimax optimal in this model. In a more restrictive model where the noisy gradient estimates satisfy a mean-squared smoothness property, we prove a lower bound of queries, establishing the optimality of recently proposed variance reduction techniques.
Cite
@article{arxiv.1912.02365,
title = {Lower Bounds for Non-Convex Stochastic Optimization},
author = {Yossi Arjevani and Yair Carmon and John C. Duchi and Dylan J. Foster and Nathan Srebro and Blake Woodworth},
journal= {arXiv preprint arXiv:1912.02365},
year = {2022}
}
Comments
Correction to hard instance dimensions in Theorem 3