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Monte Carlo Approximation of Bayes Factors via Mixing With Surrogate Distributions

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Version 2 2020-09-29, 17:50
Version 1 2020-08-24, 09:13
journal contribution
posted on 2020-09-29, 17:50 authored by Chenguang Dai, Jun S. Liu

By mixing the target posterior distribution with a surrogate distribution, of which the normalizing constant is tractable, we propose a method for estimating the marginal likelihood using the Wang–Landau algorithm. We show that a faster convergence of the proposed method can be achieved via the momentum acceleration. Two implementation strategies are detailed: (i) facilitating global jumps between the posterior and surrogate distributions via the multiple-try Metropolis (MTM); (ii) constructing the surrogate via the variational approximation. When a surrogate is difficult to come by, we describe a new jumping mechanism for general reversible jump Markov chain Monte Carlo algorithms, which combines the MTM and a directional sampling algorithm. We illustrate the proposed methods on several statistical models, including the log-Gaussian Cox process, the Bayesian Lasso, the logistic regression, and the g-prior Bayesian variable selection. Supplementary materials for this article are available online.

Funding

This work was partially supported by NSF DMS-1613035, DMS-1712714 and NIH funding: NIGMS R01GM122080.

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