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Activity Number: 444 - Recent Advances in Statistical Methodology for Big Data
Type: Contributed
Date/Time: Thursday, August 12, 2021 : 4:00 PM to 5:50 PM
Sponsor: IMS
Abstract #319096
Title: Convergence Rates of Two-Component MCMC Samplers
Author(s): Qian Qin* and Galin Jones
Companies: University of Minnesota and University of Minnesota
Keywords: data augmentation; deterministic-scan; geometric ergodicity; Gibbs; Metropolis-within-Gibbs; random-scan
Abstract:

Component-wise MCMC algorithms, including Gibbs and conditional Metropolis-Hastings samplers, are commonly used for sampling from multivariate probability distributions. A long-standing question regarding Gibbs algorithms is whether a deterministic-scan (systematic-scan) sampler converges faster than its random-scan counterpart. We answer this question when the samplers involve two components by establishing an exact quantitative relationship between the L2 convergence rates of the two samplers. The relationship shows that the deterministic-scan sampler converges faster. We also establish qualitative relations among the convergence rates of two-component Gibbs samplers and some conditional Metropolis-Hastings variants. For instance, it is shown that if some two-component conditional Metropolis-Hastings samplers are geometrically ergodic, then so are the associated Gibbs samplers.


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