Exact sampling and fast mixing of Activated Random Walk

Abstract: Activated Random Walk (ARW) is an interacting particle system on the $d$-dimensional lattice $\mathbb{Z}^d$. On a finite subset $V \subset \mathbb{Z}^d$ it defines a Markov chain on ${0,1}^V$. We prove that when $V$ is a Euclidean ball intersected with $\mathbb{Z}^d$, the mixing time of the ARW Markov chain is at most $1+o(1)$ times the volume of the ball. The proof uses an exact sampling algorithm for the stationary distribution, a coupling with internal DLA, and an upper bound on the time when internal DLA fills the entire ball. We conjecture cutoff at time $\zeta$ times the volume of the ball, where $\zeta<1$ is the limiting density of the stationary state.