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Robust Generalised Bayesian Inference for Intractable Likelihoods

Takuo Matsubara, Jeremias Knoblauch, François‐Xavier Briol, Chris J. Oates

2022Journal of the Royal Statistical Society Series B (Statistical Methodology)44 citationsDOIOpen Access PDF

Abstract

Abstract Generalised Bayesian inference updates prior beliefs using a loss function, rather than a likelihood, and can therefore be used to confer robustness against possible mis-specification of the likelihood. Here we consider generalised Bayesian inference with a Stein discrepancy as a loss function, motivated by applications in which the likelihood contains an intractable normalisation constant. In this context, the Stein discrepancy circumvents evaluation of the normalisation constant and produces generalised posteriors that are either closed form or accessible using the standard Markov chain Monte Carlo. On a theoretical level, we show consistency, asymptotic normality, and bias-robustness of the generalised posterior, highlighting how these properties are impacted by the choice of Stein discrepancy. Then, we provide numerical experiments on a range of intractable distributions, including applications to kernel-based exponential family models and non-Gaussian graphical models.

Topics & Concepts

InferenceExponential familyRobustness (evolution)Bayesian inferenceMarkov chain Monte CarloComputer scienceMathematicsBayesian probabilityLikelihood functionGraphical modelArtificial intelligenceAlgorithmApplied mathematicsEstimation theoryGeneBiochemistryChemistryStatistical Methods and Bayesian InferenceMarkov Chains and Monte Carlo MethodsBayesian Methods and Mixture Models
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