The exclusion process mixes (almost) faster than independent particles

Abstract

Oliveira conjectured that the order of the mixing time of the exclusion process with k-particles on an arbitrary n-vertex graph is at most that of the mixing-time of k independent particles. We verify this up to a constant factor for d-regular graphs when each edge rings at rate 1/d in various cases: (1) when d = ( n/k n), (2) when gap:= the spectral-gap of a single walk is O ( 1/4 n) and k n(1), (3) when k na for some constant 0<a<1. In these cases our analysis yields a probabilistic proof of a weaker version of Aldous' famous spectral-gap conjecture (resolved by Caputo et al.). We also prove a general bound of O( n n / gap), which is within a n factor from Oliveira's conjecture when k n (1). As applications we get new mixing bounds: (a) O( n n) for expanders, (b) order d (dk) for the hypercube \0,1\d, (c) order (Diameter)2 k for vertex-transitive graphs of moderate growth and for supercritical percolation on a fixed dimensional torus.