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Gibbs posterior concentration rates under sub-exponential type losses

Nicholas Syring, Ryan Martin

2023Bernoulli25 citationsDOIOpen Access PDF

Abstract

Bayesian posterior distributions are widely used for inference, but their dependence on a statistical model creates some challenges. In particular, there may be lots of nuisance parameters that require prior distributions and posterior computations, plus a potentially serious risk of model misspecification bias. Gibbs posterior distributions, on the other hand, offer direct, principled, probabilistic inference on quantities of interest through a loss function, not a model-based likelihood. Here we provide simple sufficient conditions for establishing Gibbs posterior concentration rates when the loss function is of a sub-exponential type. We apply these general results in a range of practically relevant examples, including mean regression, quantile regression, and sparse high-dimensional classification. We also apply these techniques in an important problem in medical statistics, namely, estimation of a personalized minimum clinically important difference.

Topics & Concepts

MathematicsGibbs samplingPosterior probabilityStatisticsBayesian inferenceQuantileQuantile regressionInferenceExponential functionBayesian probabilityStatistical inferenceApproximate Bayesian computationPrior probabilityExponential familyEconometricsApplied mathematicsRange (aeronautics)Computer scienceArtificial intelligenceMathematical analysisMaterials scienceComposite materialStatistical Methods and InferenceStatistical Methods and Bayesian InferenceBayesian Methods and Mixture Models