Markov chain Monte Carlo algorithms with sequential proposals
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We explore a general framework in Markov chain Monte Carlo (MCMC) sampling where sequential proposals are tried as a candidate for the next state of the Markov chain. This sequential-proposal framework can be applied to various existing MCMC methods, including Metropolis-Hastings algorithms using random proposals and methods that use deterministic proposals such as Hamiltonian Monte Carlo or the bouncy particle sampler. Sequential-proposal MCMC methods construct the same Markov chains as those constructed by the delayed rejection method under certain circumstances. We demonstrate that applications of the sequential-proposal framework to Hamiltonian Monte Carlo (HMC) methods can lead to improved numerical efficiency compared to standard HMC methods and the No-U-Turn sampler. Finally, we show that the sequential-proposal bouncy particle sampler enables the constructed Markov chain to pass through regions of low target density and thus facilitates better mixing of the chain when the target density is multimodal.
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