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Fast Rates for General Unbounded Loss Functions: From ERM to Generalized Bayes

Peter Grünwald, Nishant A. Mehta

2020Centrum Wiskunde & Informatica (CWI), the national research institute for mathematics and computer science in the Netherlands52 citationsOpen Access PDF

Abstract

We present new excess risk bounds for general unbounded loss functions including log loss and squared loss, where the distribution of the losses may be heavy-tailed. The bounds hold for general estimators, but they are optimized when applied to η-generalized Bayesian, MDL, and empirical risk minimization estimators. In the case of log loss, the bounds imply convergence rates for generalized Bayesian inference under misspecification in terms of a generalization of the Hellinger metric as long as the learning rate η is set correctly. For general loss functions, our bounds rely on two separate conditions: the v-GRIP (generalized reversed information projection) conditions, which control the lower tail of the excess loss; and the newly introduced witness condition, which controls the upper tail. The parameter v in the v-GRIP conditions determines the achievable rate and is akin to the exponent in the Tsybakov margin condition and the Bernstein condition for bounded losses, which the v-GRIP conditions generalize; favorable v in combination with small model complexity leads to Õ(1/n) rates. The witness condition allows us to connect the excess risk to an “annealed” version thereof, by which we generalize several previous results connecting Hellinger and Rényi divergence to KL divergence.

Topics & Concepts

MathematicsMinimaxApplied mathematicsEstimatorDivergence (linguistics)Bounded functionUniform boundednessUpper and lower boundsRate of convergenceStatisticsMathematical optimizationMathematical analysisComputer scienceChannel (broadcasting)Computer networkPhilosophyLinguisticsAdversarial Robustness in Machine LearningBayesian Modeling and Causal InferenceStatistical Methods and Inference
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