Hydrodynamics of a d-dimensional long jumps symmetric exclusion with a slow barrier

Abstract

We obtain the hydrodynamic limit of symmetric long-jumps exclusion in Zd (for d ≥ 1), where the jump rate is inversely proportional to a power of the jump's length with exponent γ+1, where γ ≥ 2. Moreover, movements between Zd-1 × Z-* and Zd-1 × N are slowed down by a factor α n-β (with α>0 and β≥ 0). In the hydrodynamic limit we obtain the heat equation in Rd without boundary conditions or with Neumann boundary conditions, depending on the values of β and γ. The (rather restrictive) condition in casodif (for d=1) about the initial distribution satisfying an entropy bound with respect to a Bernoulli product measure with constant parameter is weakened or completely dropped.