Augmented pseudo-marginal Metropolis-Hastings for partially observed diffusion processes

Golightly, Andrew and Sherlock, Chris (2022) Augmented pseudo-marginal Metropolis-Hastings for partially observed diffusion processes. Statistics and Computing, 32: 21. ISSN 0960-3174

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Abstract

We consider the problem of inference for nonlinear, multivariate diffusion processes, satisfying Itô stochastic differential equations (SDEs), using data at discrete times that may be incomplete and subject to measurement error. Our starting point is a state-of-the-art correlated pseudo-marginal Metropolis-Hastings algorithm, that uses correlated particle filters to induce strong and positive correlation between successive likelihood estimates. However, unless the measurement error or the dimension of the SDE is small, correlation can be eroded by the resampling steps in the particle filter. We therefore propose a novel augmentation scheme, that allows for conditioning on values of the latent process at the observation times, completely avoiding the need for resampling steps. We integrate over the uncertainty at the observation times with an additional Gibbs step. Connections between the resulting pseudo-marginal scheme and existing inference schemes for diffusion processes are made, giving a unified inference framework that encompasses Gibbs sampling and pseudo marginal schemes. The methodology is applied in three examples of increasing complexity. We find that our approach offers substantial increases in overall efficiency, compared to competing methods.

Item Type:
Journal Article
Journal or Publication Title:
Statistics and Computing
Additional Information:
The final publication is available at Springer via http://dx.doi.org/10.1007/s11222-022-10083-5
Uncontrolled Keywords:
/dk/atira/pure/subjectarea/asjc/1700/1703
Subjects:
?? stochastic differential equationbayesian inferencepseudo-marginal metropolis-hastingsdata augmentationlinear noise approximationcomputational theory and mathematicstheoretical computer sciencestatistics and probabilitystatistics, probability and uncertain ??
ID Code:
165561
Deposited By:
Deposited On:
04 Feb 2022 09:20
Refereed?:
Yes
Published?:
Published
Last Modified:
09 Oct 2024 00:23