The Asymmetric Simple Exclusion Process with Multiple Shocks

Abstract

We consider the one dimensional totally asymmetric simple exclusion process with initial product distribution with densities 0 ≤ 0 < 1 <...< n ≤ 1 in (-∞,c1-1), [c1-1,c2ε-1),...,[cn -1, + ∞), respectively. The initial distribution has shocks (discontinuities) at ε-1ck, k=1,...,n and we assume that in the corresponding macroscopic Burgers equation the n shocks meet in r* at time t*. The microscopic position of the shocks is represented by second class particles whose distribution in the scale ε-1/2 is shown to converge to a function of n independent Gaussian random variables representing the fluctuations of these particles ``just before the meeting''. We show that the density field at time -1t*, in the scale -1/2 and as seen from -1r* converges weakly to a random measure with piecewise constant density as 0; the points of discontinuity depend on these limiting Gaussian variables. As a corollary we show that, as ε 0, the distribution of the process at site ε-1r*+-1/2a at time ε-1t* tends to a non trivial convex combination of the product measures with densities k, the weights of the combination being explicitly computable.

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