2017
DOI: 10.1007/s00245-017-9401-9
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A Large Deviations Analysis of Certain Qualitative Properties of Parallel Tempering and Infinite Swapping Algorithms

Abstract: Parallel tempering, or replica exchange, is a popular method for simulating complex systems. The idea is to run parallel simulations at different temperatures, and at a given swap rate exchange configurations between the parallel simulations. From the perspective of large deviations it is optimal to let the swap rate tend to infinity and it is possible to construct a corresponding simulation scheme, known as infinite swapping. In this paper we propose a novel use of large deviations for empirical measures for … Show more

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Cited by 14 publications
(13 citation statements)
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“…On the other hand, Bhatnagar and Randall (2004) and Bhatnagar and Randall (2016) prove that both, the swapping algorithm and simulated tempering, are slowly mixing for the 3-state Potts model and conjecture that this is caused by the first order phase transition in the Potts model (also see our discussion in the remark following Lemma 4.3). Qualitative properties of the swapping algorithm and parallel tempering were studied in Doll et al (2018). A first rapid convergence result for the Swapping Algorithm in an disordered situation was proved in Löwe and Vermet (2009).…”
Section: Equi-energy Samplingmentioning
confidence: 99%
“…On the other hand, Bhatnagar and Randall (2004) and Bhatnagar and Randall (2016) prove that both, the swapping algorithm and simulated tempering, are slowly mixing for the 3-state Potts model and conjecture that this is caused by the first order phase transition in the Potts model (also see our discussion in the remark following Lemma 4.3). Qualitative properties of the swapping algorithm and parallel tempering were studied in Doll et al (2018). A first rapid convergence result for the Swapping Algorithm in an disordered situation was proved in Löwe and Vermet (2009).…”
Section: Equi-energy Samplingmentioning
confidence: 99%
“…However, analogous results for discrete state systems are expected. See [9] for the formulation of infinite swapping for discrete state models.…”
Section: Introductionmentioning
confidence: 99%
“…Therein empirical measure large deviations, specifically the associated rate function, was proposed as a tool for analysing parallel tempering, one of the computational workhorses of the physical sciences, leading to a new type of simulation method (infinite swapping). In the subsequent work [DDN18] empirical measure large deviations were again used, combined with associated stochastic control problems, to analyse the convergence properties of these algorithms. Similarly, in [RBS15] Rey-Bellet and Spiliopoulos use empirical measure large deviations to analyse the performance of certain non-reversible MCMC samplers.…”
Section: Introductionmentioning
confidence: 99%