Stability and Sharper Risk Bounds with Convergence Rate O(1/n)

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Bowei Zhu, Shaojie Li, Yong Liu

Published: 2024, Last Modified: 25 Jan 2026CoRR 2024EveryoneRevisionsBibTeXCC BY-SA 4.0
Abstract: Prior work (Klochkov $\&$ Zhivotovskiy, 2021) establishes at most $O\left(\log (n)/n\right)$ excess risk bounds via algorithmic stability for strongly-convex learners with high probability. We show that under the similar common assumptions -- - Polyak-Lojasiewicz condition, smoothness, and Lipschitz continous for losses -- - rates of $O\left(\log^2(n)/n^2\right)$ are at most achievable. To our knowledge, our analysis also provides the tightest high-probability bounds for gradient-based generalization gaps in nonconvex settings.