Exact time-dependent correlation functions for the symmetric exclusion process with open boundary

Abstract

As a simple model for single-file diffusion of hard core particles we investigate the one-dimensional symmetric exclusion process. We consider an open semi-infinite system where one end is coupled to an external reservoir of constant density and which initially is in an non-equilibrium state with bulk density 0. We calculate the exact time-dependent two-point density correlation function Ck,l(t) <nk(t)nl(t)>- <nk(t)><nl(t)> and the mean and variance of the integrated average net flux of particles N(t)-N(0) that have entered (or left) the system up to time t. We find that the boundary region of the semi-infinite relaxing system is in a state similar to the bulk state of a finite stationary system driven by a boundary gradient. The symmetric exclusion model provides a rare example where such behavior can be proved rigorously on the level of equal-time two-point correlation functions. Some implications for the relaxational dynamics of entangled polymers and for single-file diffusion in colloidal systems are discussed.

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