Stochastic Frank-Wolfe Methods for Nonconvex Optimization
Abstract
We study Frank-Wolfe methods for nonconvex stochastic and finite-sum optimization problems. Frank-Wolfe methods (in the convex case) have gained tremendous recent interest in machine learning and optimization communities due to their projection-free property and their ability to exploit structured constraints. However, our understanding of these algorithms in the nonconvex setting is fairly limited. In this paper, we propose nonconvex stochastic Frank-Wolfe methods and analyze their convergence properties. For objective functions that decompose into a finite-sum, we leverage ideas from variance reduction techniques for convex optimization to obtain new variance reduced nonconvex Frank-Wolfe methods that have provably faster convergence than the classical Frank-Wolfe method. Finally, we show that the faster convergence rates of our variance reduced methods also translate into improved convergence rates for the stochastic setting.
Cite
@article{arxiv.1607.08254,
title = {Stochastic Frank-Wolfe Methods for Nonconvex Optimization},
author = {Sashank J. Reddi and Suvrit Sra and Barnabas Poczos and Alex Smola},
journal= {arXiv preprint arXiv:1607.08254},
year = {2016}
}