Meta-Uncertainty in Bayesian Model Comparison
Abstract
Bayesian model comparison (BMC) offers a principled probabilistic approach to study and rank competing models. In standard BMC, we construct a discrete probability distribution over the set of possible models, conditional on the observed data of interest. These posterior model probabilities (PMPs) are measures of uncertainty, but -- when derived from a finite number of observations -- are also uncertain themselves. In this paper, we conceptualize distinct levels of uncertainty which arise in BMC. We explore a fully probabilistic framework for quantifying meta-uncertainty, resulting in an applied method to enhance any BMC workflow. Drawing on both Bayesian and frequentist techniques, we represent the uncertainty over the uncertain PMPs via meta-models which combine simulated and observed data into a predictive distribution for PMPs on new data. We demonstrate the utility of the proposed method in the context of conjugate Bayesian regression, likelihood-based inference with Markov chain Monte Carlo, and simulation-based inference with neural networks.
Cite
@article{arxiv.2210.07278,
title = {Meta-Uncertainty in Bayesian Model Comparison},
author = {Marvin Schmitt and Stefan T. Radev and Paul-Christian Bürkner},
journal= {arXiv preprint arXiv:2210.07278},
year = {2023}
}
Comments
accepted at AISTATS 2023