Hydrodynamics of a particle model in contact with stochastic reservoirs

Abstract

We consider an exclusion process with finite-range interactions in the microscopic interval [0,N]. The process is coupled with the simple symmetric exclusion processes in the intervals [-N,-1] and [N+1,2N], which simulate reservoirs. We show that the empirical densities of the processes speeded up by the factor N2 converge to solutions of parabolic partial differential equations inside the intervals [-N,-1], [0,N], [N+1,2N]. Since the total number of particles is preserved by the evolution, we obtain the Neumann boundary conditions on the external boundaries x=-N, x=2N of the reservoirs. Finally, a system of Neumann and Dirichlet boundary conditions is derived at the interior boundaries x=0, x=N of the reservoirs.