Optimal rates for zero-order convex optimization: the power of two function evaluations
Abstract
We consider derivative-free algorithms for stochastic and non-stochastic convex optimization problems that use only function values rather than gradients. Focusing on non-asymptotic bounds on convergence rates, we show that if pairs of function values are available, algorithms for -dimensional optimization that use gradient estimates based on random perturbations suffer a factor of at most in convergence rate over traditional stochastic gradient methods. We establish such results for both smooth and non-smooth cases, sharpening previous analyses that suggested a worse dimension dependence, and extend our results to the case of multiple () evaluations. We complement our algorithmic development with information-theoretic lower bounds on the minimax convergence rate of such problems, establishing the sharpness of our achievable results up to constant (sometimes logarithmic) factors.
Cite
@article{arxiv.1312.2139,
title = {Optimal rates for zero-order convex optimization: the power of two function evaluations},
author = {John C. Duchi and Michael I. Jordan and Martin J. Wainwright and Andre Wibisono},
journal= {arXiv preprint arXiv:1312.2139},
year = {2014}
}
Comments
34 pages