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Stochastic Convergence Rates and Applications of Adaptive Quadrature in Bayesian Inference

Blair Bilodeau, Alex Stringer, Yanbo Tang

2022Journal of the American Statistical Association15 citationsDOI

Abstract

We provide the first stochastic convergence rates for a family of adaptive quadrature rules used to normalize the posterior distribution in Bayesian models. Our results apply to the uniform relative error in the approximate posterior density, the coverage probabilities of approximate credible sets, and approximate moments and quantiles, therefore, guaranteeing fast asymptotic convergence of approximate summary statistics used in practice. The family of quadrature rules includes adaptive Gauss-Hermite quadrature, and we apply this rule in two challenging low-dimensional examples. Further, we demonstrate how adaptive quadrature can be used as a crucial component of a modern approximate Bayesian inference procedure for high-dimensional additive models. The method is implemented and made publicly available in the aghq package for the R language, available on CRAN. Supplementary materials for this article are available online.

Topics & Concepts

Adaptive quadratureQuadrature (astronomy)QuantileApplied mathematicsMathematicsBayesian probabilityBayesian inferenceMathematical optimizationGaussian quadratureRate of convergenceInferenceGauss–Hermite quadratureComputer scienceStatistical inferenceAlgorithmStatisticsNyström methodArtificial intelligenceMathematical analysisIntegral equationControl theory (sociology)Control (management)EngineeringComputer networkElectrical engineeringChannel (broadcasting)Statistical Methods and Bayesian InferenceGaussian Processes and Bayesian InferenceStatistical Methods and Inference
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