English

Certified Multi-Fidelity Zeroth-Order Optimization

Machine Learning 2024-10-14 v2 Optimization and Control Statistics Theory Machine Learning Statistics Theory

Abstract

We consider the problem of multi-fidelity zeroth-order optimization, where one can evaluate a function ff at various approximation levels (of varying costs), and the goal is to optimize ff with the cheapest evaluations possible. In this paper, we study certified algorithms, which are additionally required to output a data-driven upper bound on the optimization error. We first formalize the problem in terms of a min-max game between an algorithm and an evaluation environment. We then propose a certified variant of the MFDOO algorithm and derive a bound on its cost complexity for any Lipschitz function ff. We also prove an ff-dependent lower bound showing that this algorithm has a near-optimal cost complexity. As a direct example, we close the paper by addressing the special case of noisy (stochastic) evaluations, which corresponds to \eps\eps-best arm identification in Lipschitz bandits with continuously many arms.

Keywords

Cite

@article{arxiv.2308.00978,
  title  = {Certified Multi-Fidelity Zeroth-Order Optimization},
  author = {Étienne de Montbrun and Sébastien Gerchinovitz},
  journal= {arXiv preprint arXiv:2308.00978},
  year   = {2024}
}
R2 v1 2026-06-28T11:46:11.696Z