Diffusion of Finite-Sized Hard-Core Interacting Particles In a One-Dimensional Box - Tagged Particle Dynamics

Abstract

We solve a non-equilibrium statistical mechanics problem exactly, namely, the single-file dynamics of N hard-core interacting particles (the particles cannot pass each other) of size diffusing in a one dimensional system of finite length L with reflecting boundaries at the ends. We obtain an exact expression for the conditional probability density function PT(yT,t|yT,0) that a tagged particle T (T=1,...,N) is at position yT at time t given that it at time t=0 was at position yT,0. Going beyond previous studies, we consider the asymptotic limit of large N, maintaining L finite, using a non-standard asymptotic technique. We derive an exact expression for PT(yT,t|yT,0) for a a tagged particle located roughly in the middle of the system, from which we find that there are three time regimes of interest for finite-sized systems: (A) For times much smaller than the collision time t<< tcoll=1/(2D), where =N/L is the particle concentration and D the diffusion constant for each particle, the tagged particle undergoes normal diffusion; (B) for times much larger than the collision time t>> tcoll but times smaller than the equilibrium time t<< teq=L2/D we find a single-file regime where PT(yT,t|yT,0) is a Gaussian with a mean square displacement scaling as t1/2; (C) For times longer than the equilibrium time $t>> teq, PT(yT,t|yT,0) approaches a polynomial-type equilibrium probability density function.