Black-Box Min--Max Continuous Optimization Using CMA-ES with Worst-case Ranking Approximation
Abstract
In this study, we investigate the problem of min-max continuous optimization in a black-box setting . A popular approach updates and simultaneously or alternatingly. However, two major limitations have been reported in existing approaches. (I) As the influence of the interaction term between and (e.g., ) on the Lipschitz smooth and strongly convex-concave function increases, the approaches converge to an optimal solution at a slower rate. (II) The approaches fail to converge if is not Lipschitz smooth and strongly convex-concave around the optimal solution. To address these difficulties, we propose minimizing the worst-case objective function directly using the covariance matrix adaptation evolution strategy, in which the rankings of solution candidates are approximated by our proposed worst-case ranking approximation (WRA) mechanism. Compared with existing approaches, numerical experiments show two important findings regarding our proposed method. (1) The proposed approach is efficient in terms of -calls on a Lipschitz smooth and strongly convex-concave function with a large interaction term. (2) The proposed approach can converge on functions that are not Lipschitz smooth and strongly convex-concave around the optimal solution, whereas existing approaches fail.
Keywords
Cite
@article{arxiv.2204.02646,
title = {Black-Box Min--Max Continuous Optimization Using CMA-ES with Worst-case Ranking Approximation},
author = {Atsuhiro Miyagi and Kazuto Fukuchi and Jun Sakuma and Youhei Akimoto},
journal= {arXiv preprint arXiv:2204.02646},
year = {2022}
}
Comments
accepted for GECCO 2022