English

The Price of Robustness: Stable Classifiers Need Overparameterization

Machine Learning 2026-03-04 v1

Abstract

The relationship between overparameterization, stability, and generalization remains incompletely understood in the setting of discontinuous classifiers. We address this gap by establishing a generalization bound for finite function classes that improves inversely with class stability, defined as the expected distance to the decision boundary in the input domain (margin). Interpreting class stability as a quantifiable notion of robustness, we derive as a corollary a law of robustness for classification that extends the results of Bubeck and Sellke beyond smoothness assumptions to discontinuous functions. In particular, any interpolating model with pnp \approx n parameters on nn data points must be unstable, implying that substantial overparameterization is necessary to achieve high stability. We obtain analogous results for parameterized infinite function classes by analyzing a stronger robustness measure derived from the margin in the codomain, which we refer to as the normalized co-stability. Experiments support our theory: stability increases with model size and correlates with test performance, while traditional norm-based measures remain largely uninformative.

Keywords

Cite

@article{arxiv.2603.02806,
  title  = {The Price of Robustness: Stable Classifiers Need Overparameterization},
  author = {Jonas von Berg and Adalbert Fono and Massimiliano Datres and Sohir Maskey and Gitta Kutyniok},
  journal= {arXiv preprint arXiv:2603.02806},
  year   = {2026}
}

Comments

29 pages, 9 figures. Accepted at ICLR 2026

R2 v1 2026-07-01T11:00:45.104Z