English

Acceleration by Stepsize Hedging II: Silver Stepsize Schedule for Smooth Convex Optimization

Optimization and Control 2024-11-26 v1

Abstract

We provide a concise, self-contained proof that the Silver Stepsize Schedule proposed in Part I directly applies to smooth (non-strongly) convex optimization. Specifically, we show that with these stepsizes, gradient descent computes an ϵ\epsilon-minimizer in O(ϵlogρ2)=O(ϵ0.7864)O(\epsilon^{-\log_{\rho} 2}) = O(\epsilon^{-0.7864}) iterations, where ρ=1+2\rho = 1+\sqrt{2} is the silver ratio. This is intermediate between the textbook unaccelerated rate O(ϵ1)O(\epsilon^{-1}) and the accelerated rate O(ϵ1/2)O(\epsilon^{-1/2}) due to Nesterov in 1983. The Silver Stepsize Schedule is a simple explicit fractal: the ii-th stepsize is 1+ρv(i)11+\rho^{v(i)-1} where v(i)v(i) is the 22-adic valuation of ii. The design and analysis are conceptually identical to the strongly convex setting in Part I, but simplify remarkably in this specific setting.

Keywords

Cite

@article{arxiv.2309.16530,
  title  = {Acceleration by Stepsize Hedging II: Silver Stepsize Schedule for Smooth Convex Optimization},
  author = {Jason M. Altschuler and Pablo A. Parrilo},
  journal= {arXiv preprint arXiv:2309.16530},
  year   = {2024}
}

Comments

10 pages, 3 figures

R2 v1 2026-06-28T12:35:04.125Z