Open AccessBayesian computation for statistical models with intractable normalizing constants
Author(s) -
Yves F. Atchadé,
Nicolas Lartillot,
Christian P. Robert
Publication year - 2013
Publication title -
brazilian journal of probability and statistics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.441
H-Index - 18
eISSN - 2317-6199
pISSN - 0103-0752
DOI - 10.1214/11-bjps174
Subject(s) - mathematics , approximate bayesian computation , bayesian probability , computation , markov chain monte carlo , constant (computer programming) , algorithm , statistics , artificial intelligence , computer science , inference , programming language
This paper deals with some computational aspects in the Bayesian analysis of statistical models with intractable normalizing constants. In the presence of intractable normalizing constants in the likelihood function, traditional MCMC methods cannot be applied. We propose an approach to sample from such posterior distributions. The method can be thought as a Bayesian version of the MCMC-MLE approach of Geyer and Thompson (1992). To the best of our knowledge, this is the first general and asymptotically consistent Monte Carlo method for such problems. We illustrate the method with examples from image segmentation and social network modeling. We study as well the asymptotic behavior of the algorithm and obtain a strong law of large numbers for empirical averages.
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