English

Fast Rate Generalization Error Bounds: Variations on a Theme

Information Theory 2022-05-16 v2 Machine Learning math.IT

Abstract

A recent line of works, initiated by Russo and Xu, has shown that the generalization error of a learning algorithm can be upper bounded by information measures. In most of the relevant works, the convergence rate of the expected generalization error is in the form of O(sqrt{lambda/n}) where lambda is some information-theoretic quantities such as the mutual information between the data sample and the learned hypothesis. However, such a learning rate is typically considered to be "slow", compared to a "fast rate" of O(1/n) in many learning scenarios. In this work, we first show that the square root does not necessarily imply a slow rate, and a fast rate (O(1/n)) result can still be obtained using this bound under appropriate assumptions. Furthermore, we identify the key conditions needed for the fast rate generalization error, which we call the (eta,c)-central condition. Under this condition, we give information-theoretic bounds on the generalization error and excess risk, with a convergence rate of O(\lambda/{n}) for specific learning algorithms such as empirical risk minimization. Finally, analytical examples are given to show the effectiveness of the bounds.

Keywords

Cite

@article{arxiv.2205.03131,
  title  = {Fast Rate Generalization Error Bounds: Variations on a Theme},
  author = {Xuetong Wu and Jonathan H. Manton and Uwe Aickelin and Jingge Zhu},
  journal= {arXiv preprint arXiv:2205.03131},
  year   = {2022}
}

Comments

15 pages, 1 figure

R2 v1 2026-06-24T11:09:10.059Z