Mixing time for the asymmetric simple exclusion process in a random environment

Abstract

We consider the simple exclusion process in the integer segment [1, N] with k N/2 particles and spatially inhomogenous jumping rates. A particle at site x∈ [ 1, N] jumps to site x-1 (if x 2) at rate 1-ωx and to site x+1 (if x N-1) at rate ωx if the target site is not occupied. The sequence ω=(ωx) x ∈ Z is chosen by IID sampling from a probability law whose support is bounded away from zero and one (in other words the random environment satisfies the uniform ellipticity condition). We further assume E[ 1 ]<0 where 1:= (1-ω1)/ω1, which implies that our particles have a tendency to move to the right. We prove that the mixing time of the exclusion process in this setup grows like a power of N. More precisely, for the exclusion process with Nβ+o(1) particles where β∈ [0,1), we have in the large N asymptotic N(1, 1λ, β+ 1 2λ)+o(1) tMixN,k NC+o(1) where λ>0 is such that E[1λ]=1 (λ=∞ if the equation has no positive root) and C is a constant which depends on the distribution of ω. We conjecture that our lower bound is sharp up to sub-polynomial correction.