Generalization Analysis of Machine Learning Algorithms via the Worst-Case Data-Generating Probability Measure
Abstract
In this paper, the worst-case probability measure over the data is introduced as a tool for characterizing the generalization capabilities of machine learning algorithms. More specifically, the worst-case probability measure is a Gibbs probability measure and the unique solution to the maximization of the expected loss under a relative entropy constraint with respect to a reference probability measure. Fundamental generalization metrics, such as the sensitivity of the expected loss, the sensitivity of the empirical risk, and the generalization gap are shown to have closed-form expressions involving the worst-case data-generating probability measure. Existing results for the Gibbs algorithm, such as characterizing the generalization gap as a sum of mutual information and lautum information, up to a constant factor, are recovered. A novel parallel is established between the worst-case data-generating probability measure and the Gibbs algorithm. Specifically, the Gibbs probability measure is identified as a fundamental commonality of the model space and the data space for machine learning algorithms.
Cite
@article{arxiv.2312.12236,
title = {Generalization Analysis of Machine Learning Algorithms via the Worst-Case Data-Generating Probability Measure},
author = {Xinying Zou and Samir M. Perlaza and Iñaki Esnaola and Eitan Altman},
journal= {arXiv preprint arXiv:2312.12236},
year = {2023}
}
Comments
To appear in the Proceedings of the AAAI Conference on Artificial Intelligence (7 + 2 pages)