Optimal Rates for Multi-pass Stochastic Gradient Methods
Abstract
We analyze the learning properties of the stochastic gradient method when multiple passes over the data and mini-batches are allowed. We study how regularization properties are controlled by the step-size, the number of passes and the mini-batch size. In particular, we consider the square loss and show that for a universal step-size choice, the number of passes acts as a regularization parameter, and optimal finite sample bounds can be achieved by early-stopping. Moreover, we show that larger step-sizes are allowed when considering mini-batches. Our analysis is based on a unifying approach, encompassing both batch and stochastic gradient methods as special cases. As a byproduct, we derive optimal convergence results for batch gradient methods (even in the non-attainable cases).
Cite
@article{arxiv.1605.08882,
title = {Optimal Rates for Multi-pass Stochastic Gradient Methods},
author = {Junhong Lin and Lorenzo Rosasco},
journal= {arXiv preprint arXiv:1605.08882},
year = {2019}
}
Comments
Fixed a typo in Eq (66)