Hamiltonian Monte Carlo for efficient Gaussian sampling: long and random steps

Abstract

Hamiltonian Monte Carlo (HMC) is a Markov chain algorithm for sampling from a high-dimensional distribution with density e-f(x), given access to the gradient of f. A particular case of interest is that of a d-dimensional Gaussian distribution with covariance matrix , in which case f(x) = x -1 x. We show that HMC can sample from a distribution that is -close in total variation distance using O( d1/4 (1/)) gradient queries, where is the condition number of . Our algorithm uses long and random integration times for the Hamiltonian dynamics. This contrasts with (and was motivated by) recent results that give an ( d1/2) query lower bound for HMC with fixed integration times, even for the Gaussian case.