Related papers: Online-to-PAC Conversions: Generalization Bounds via Regret Analysis

Online-to-PAC Conversions: Generalization Bounds via Regret Analysis

URL: http://arxiv.org/abs/2305.19674v2
Date: Thu, 17 Oct 2024 10:51:50 GMT
Title: Online-to-PAC Conversions: Generalization Bounds via Regret Analysis
Authors: Gábor Lugosi, Gergely Neu,
Abstract summary: We construct an online learning game called the "generalization game" We show that the existence of an online learning algorithm with bounded regret in this game implies a bound on the generalization error of the statistical learning algorithm.
Score: 13.620177497267791
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Abstract: We present a new framework for deriving bounds on the generalization bound of statistical learning algorithms from the perspective of online learning. Specifically, we construct an online learning game called the "generalization game", where an online learner is trying to compete with a fixed statistical learning algorithm in predicting the sequence of generalization gaps on a training set of i.i.d. data points. We establish a connection between the online and statistical learning setting by showing that the existence of an online learning algorithm with bounded regret in this game implies a bound on the generalization error of the statistical learning algorithm, up to a martingale concentration term that is independent of the complexity of the statistical learning method. This technique allows us to recover several standard generalization bounds including a range of PAC-Bayesian and information-theoretic guarantees, as well as generalizations thereof.

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