Bayesian Parameter Inference for Partially Observed Stopped Processes

TL;DR

This paper develops a Bayesian inference method for partially observed stopped stochastic processes using particle MCMC with adaptive multi-level SMC, improving efficiency in complex posterior distributions.

Contribution

It introduces an adaptive multi-level SMC approach within PMCMC for better inference in stopped processes, with a novel strategy for selecting level sets.

Findings

Enhanced inference efficiency demonstrated on coalescent model with migration.

Adaptive level set strategy improves sampling performance.

Applicable to a wide range of partially observed stopped processes.

Abstract

In this article we consider Bayesian parameter inference associated to partially-observed stochastic processes that start from a set B0 and are stopped or killed at the first hitting time of a known set A. Such processes occur naturally within the context of a wide variety of applications. The associated posterior distributions are highly complex and posterior parameter inference requires the use of advanced Markov chain Monte Carlo (MCMC) techniques. Our approach uses a recently introduced simulation methodology, particle Markov chain Monte Carlo (PMCMC) (Andrieu et. al. 2010 [1]), where sequential Monte Carlo (SMC) approximations (see Doucet et. al. 2001 [18] and Liu 2001 [27]) are embedded within MCMC. However, when the parameter of interest is fixed, standard SMC algorithms are not always appropriate for many stopped processes. In Chen et. al. [11] and Del Moral 2004 [15] the authors introduce SMC approximations of multi-level Feynman-Kac formulae, which can lead to more efficient algorithms. This is achieved by devising a sequence of nested sets from B0 to A and then perform the resampling step only when the samples of the process reach intermediate level sets in the sequence. Naturally, the choice of the intermediate level sets is critical to the performance of such a scheme. In this paper, we demonstrate that multi-level SMC algorithms can be used as a proposal in PMCMC. In addition, we propose a flexible strategy that adapts the level sets for different parameter proposals. Our methodology is illustrated on the coalescent model with migration.