Non-equilibrium steady state of the symmetric exclusion process with reservoirs

Abstract

Consider the open symmetric exclusion process on a connected graph with vertexes in [N-1]:=\1,…, N-1\ where points 1 and N-1 are connected, respectively, to a left reservoir and a right reservoir with densities L,R∈(0,1). We prove that the non-equilibrium steady state of such system is μstat = ΣI⊂ P([N-1]) F(I)(x∈ IBernoulli(R)y∈ [N-1] IBernoulli(L) ). In the formula above P([N-1]) denotes the power set of [N-1] while the numbers F(I)> 0 are such that ΣI⊂ P([N-1]) F(I)=1 and given in terms of absorption probabilities of the absorbing stochastic dual process. Via probabilistic arguments we compute explicitly the factors F(I) when the graph is a homogeneous segment.