Crossover to the stochastic Burgers equation for the WASEP with a slow bond

Abstract

We consider the weakly asymmetric simple exclusion process in the presence of a slow bond and starting from the invariant state, namely the Bernoulli product measure of parameter ∈(0,1). The rate of passage of particles to the right (resp. left) is 1nβ2+a2nβγ (resp. 1nβ2-a2nβγ) except at the bond of vertices \-1,0\ where the rate to the right (resp. left) is given by α2nβ+a2nβγ (resp. α2nβ-a2nβγ). Above, α>0, γ≥ β≥ 0, a≥ 0. For β<1, we show that the limit density fluctuation field is an Ornstein-Uhlenbeck process defined on the Schwartz space if γ>12, while for γ = 12 it is an energy solution of the stochastic Burgers equation. For γ≥β=1, it is an Ornstein-Uhlenbeck process associated to the heat equation with Robin's boundary conditions. For γ≥β> 1, the limit density fluctuation field is an Ornstein-Uhlenbeck process associated to the heat equation with Neumann's boundary conditions.