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This paper develops a new technique for bounding the mixing rate of a Markov chain by decomposing the state space into factors. The first application is an efficient Monte Carlo Markov chain algorithm for generating random three-colorings of 2-dimensional lattice regions. This provides a rigorous tool for studying some properties of the 3-state Potts model and the ice model from statistical mechanics. As a second application, we develop similar techniques to bound the mixing rate of a Metropolis sampling algorithm by a type of “temperature factorization”. Both factorization theorems work by using known mixing properties of related Markov chains to establish the efficiency of a new sampling algorithm
Published in:
Foundations of Computer Science, 1996. Proceedings., 37th Annual Symposium on
Date of Conference: 14-16 Oct 1996
- Page(s):
- 194 - 203
- Meeting Date :
- 14 Oct 1996-16 Oct 1996
- ISSN :
- 0272-5428
- Print ISBN:
- 0-8186-7594-2
- INSPEC Accession Number:
- 5444266
- Conference Location :
- Burlington, VT
- Digital Object Identifier :
- 10.1109/SFCS.1996.548478
- Product Type:
- Conference Publications
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