Abstract
We investigate the use of a certain class of functional inequalities known as weak Poincaré inequalities to bound convergence of Markov chains to equilibrium. We show that this enables the straightforward and transparent derivation of subgeometric convergence bounds for methods such as the Independent Metropolis–Hastings sampler and pseudo-marginal methods for intractable likelihoods, the latter being subgeometric in many practical settings. These results rely on novel quantitative comparison theorems between Markov chains. Associated proofs are simpler than those relying on drift/minorisation conditions and the tools developed allow us to recover and further extend known results as particular cases. We are then able to provide new insights into the practical use of pseudo-marginal algorithms, analyse the effect of averaging in Approximate Bayesian Computation (ABC) and the use of products of independent averages and also to study the case of log-normal weights relevant to particle marginal Metropolis–Hastings (PMMH).
Funding Statement
Research of CA, AL and AQW supported by EPSRC grant “CoSInES (COmputational Statistical INference for Engineering and Security)” (EP/R034710/1), and research of CA and SP supported by EPSRC grant Bayes4Health, “New Approaches to Bayesian Data Science: Tackling Challenges from the Health Sciences” (EP/R018561/1).
Acknowledgements
We would like to thank Gareth Roberts and Chris Sherlock, as well as the two anonymous referees and Associate Editor for useful comments which have improved the article.
Citation
Christophe Andrieu. Anthony Lee. Sam Power. Andi Q. Wang. "Comparison of Markov chains via weak Poincaré inequalities with application to pseudo-marginal MCMC." Ann. Statist. 50 (6) 3592 - 3618, December 2022. https://doi.org/10.1214/22-AOS2241
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