Hydrodynamic behavior of long-range symmetric exclusion with a slow barrier: diffusive regime

Abstract

In this article we analyse the hydrodynamical behavior of the symmetric exclusion process with long jumps and in the presence of a slow barrier. The jump rates for fast bonds are given by a transition probability p(·) which is symmetric and has finite variance, while for slow bonds the jump rates are given p(·)α n-β (with α>0 and β≥ 0), and correspond to jumps from Z-* to N. We prove that: if there is a fast bond from Z-* and N, then the hydrodynamic limit is given by the heat equation with no boundary conditions; otherwise, it is given by the previous equation if 0≤ β<1, but for β≥ 1 boundary conditions appear, namely, we get Robin (linear) boundary conditions if β=1 and Neumann boundary conditions if β>1.