Mixing and perfect sampling in one-dimensional particle systems

Abstract

We study the approach to equilibrium of the event-chain Monte Carlo (ECMC) algorithm for the one-dimensional hard-sphere model. Using the connection to the coupon-collector problem, we prove that a specific version of this local irreversible Markov chain realizes perfect sampling in O(N2 log N) events, whereas the reversible local Metropolis algorithm requires O(N3 log N) time steps for mixing. This confirms a special case of an earlier conjecture about O(N2 log N) scaling of mixing times of ECMC and of the forward Metropolis algorithm, its discretized variant. We furthermore prove that sequential ECMC (with swaps) realizes perfect sampling in O(N2) events. Numerical simulations indicate a cross-over towards O(N2 log N) mixing for the sequential forward swap Metropolis algorithm, that we introduce here. We point out open mathematical questions and possible applications of our findings to higher-dimensional statistical-physics models.