Translator Disclaimer
August 2013 MCMC Methods for Functions: Modifying Old Algorithms to Make Them Faster
S. L. Cotter, G. O. Roberts, A. M. Stuart, D. White
Statist. Sci. 28(3): 424-446 (August 2013). DOI: 10.1214/13-STS421

Abstract

Many problems arising in applications result in the need to probe a probability distribution for functions. Examples include Bayesian nonparametric statistics and conditioned diffusion processes. Standard MCMC algorithms typically become arbitrarily slow under the mesh refinement dictated by nonparametric description of the unknown function. We describe an approach to modifying a whole range of MCMC methods, applicable whenever the target measure has density with respect to a Gaussian process or Gaussian random field reference measure, which ensures that their speed of convergence is robust under mesh refinement.

Gaussian processes or random fields are fields whose marginal distributions, when evaluated at any finite set of $N$ points, are $\mathbb{R}^{N}$-valued Gaussians. The algorithmic approach that we describe is applicable not only when the desired probability measure has density with respect to a Gaussian process or Gaussian random field reference measure, but also to some useful non-Gaussian reference measures constructed through random truncation. In the applications of interest the data is often sparse and the prior specification is an essential part of the overall modelling strategy. These Gaussian-based reference measures are a very flexible modelling tool, finding wide-ranging application. Examples are shown in density estimation, data assimilation in fluid mechanics, subsurface geophysics and image registration.

The key design principle is to formulate the MCMC method so that it is, in principle, applicable for functions; this may be achieved by use of proposals based on carefully chosen time-discretizations of stochastic dynamical systems which exactly preserve the Gaussian reference measure. Taking this approach leads to many new algorithms which can be implemented via minor modification of existing algorithms, yet which show enormous speed-up on a wide range of applied problems.

Citation

Download Citation

S. L. Cotter. G. O. Roberts. A. M. Stuart. D. White. "MCMC Methods for Functions: Modifying Old Algorithms to Make Them Faster." Statist. Sci. 28 (3) 424 - 446, August 2013. https://doi.org/10.1214/13-STS421

Information

Published: August 2013
First available in Project Euclid: 28 August 2013

zbMATH: 1297.62217
MathSciNet: MR3135540
Digital Object Identifier: 10.1214/13-STS421

Rights: Copyright © 2013 Institute of Mathematical Statistics

JOURNAL ARTICLE
23 PAGES


SHARE
Vol.28 • No. 3 • August 2013
Back to Top