Sharp Convergence to Equilibrium for the SSEP with Reservoirs

Abstract

We consider the symmetric simple exclusion process evolving on the interval of length n-1 in contact with reservoirs of density ∈ (0,1) at the boundary. We use Yau's relative entropy method to show that if the initial measure is associated with a profile u0:[0,1] (0,1), then at explicit times tn(b) that depend on u0, the distance to equilibrium, in total variation distance, converges, as n ∞, to a profile G(γ e-b). The parameter γ also depends on the initial profile u0 and G(m) stands for the total variation distance \| N (m,1) - N(0,1)\|TV.

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