Slow to fast infinitely extended reservoirs for the symmetric exclusion process with long jumps

Abstract

We consider an exclusion process with long jumps in the box \N=\1, …,N-1\, for N 2, in contact with infinitely extended reservoirs on its left and on its right. The jump rate is described by a transition probability p(·) which is symmetric, with infinite support but with finite variance. The reservoirs add or remove particles with rate proportional to N-θ, where >0 and θ ∈ R. If θ>0 (resp. θ<0) the reservoirs add and fastly remove (resp. slowly remove) particles in the bulk. According to the value of θ we prove that the time evolution of the spatial density of particles is described by some reaction-diffusion equations with various boundary conditions.