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On free energy barriers in Gaussian priors and failure of cold start MCMC for high-dimensional unimodal distributions.

Published version
Peer-reviewed

Type

Article

Change log

Authors

Bandeira, Afonso S 
Maillard, Antoine 
Wang, Sven 

Abstract

We exhibit examples of high-dimensional unimodal posterior distributions arising in nonlinear regression models with Gaussian process priors for which Markov chain Monte Carlo (MCMC) methods can take an exponential run-time to enter the regions where the bulk of the posterior measure concentrates. Our results apply to worst-case initialized ('cold start') algorithms that are local in the sense that their step sizes cannot be too large on average. The counter-examples hold for general MCMC schemes based on gradient or random walk steps, and the theory is illustrated for Metropolis-Hastings adjusted methods such as preconditioned Crank-Nicolson and Metropolis-adjusted Langevin algorithm. This article is part of the theme issue 'Bayesian inference: challenges, perspectives, and prospects'.

Description

Keywords

Bayesian inference, Gaussian processes, MCMC, computational hardness

Journal Title

Philos Trans A Math Phys Eng Sci

Conference Name

Journal ISSN

1364-503X
1471-2962

Volume Title

Publisher

The Royal Society