On Agnostic PAC Learning in the Small Error Regime
Abstract
Binary classification in the classic PAC model exhibits a curious phenomenon: Empirical Risk Minimization (ERM) learners are suboptimal in the realizable case yet optimal in the agnostic case. Roughly speaking, this owes itself to the fact that non-realizable distributions are simply more difficult to learn than realizable distributions -- even when one discounts a learner's error by , the error of the best hypothesis in for . Thus, optimal agnostic learners are permitted to incur excess error on (easier-to-learn) distributions for which is small. Recent work of Hanneke, Larsen, and Zhivotovskiy (FOCS `24) addresses this shortcoming by including itself as a parameter in the agnostic error term. In this more fine-grained model, they demonstrate tightness of the error lower bound in a regime where , and leave open the question of whether there may be a higher lower bound when , with denoting . In this work, we resolve this question by exhibiting a learner which achieves error for a constant , thus matching the lower bound when . Further, our learner is computationally efficient and is based upon careful aggregations of ERM classifiers, making progress on two other questions of Hanneke, Larsen, and Zhivotovskiy (FOCS `24). We leave open the interesting question of whether our approach can be refined to lower the constant from 2.1 to 1, which would completely settle the complexity of agnostic learning.
Cite
@article{arxiv.2502.09496,
title = {On Agnostic PAC Learning in the Small Error Regime},
author = {Julian Asilis and Mikael Møller Høgsgaard and Grigoris Velegkas},
journal= {arXiv preprint arXiv:2502.09496},
year = {2025}
}
Comments
36 pages, NeurIPS 2025