Gumbel laws in the symmetric exclusion process

Abstract

We consider the symmetric exclusion particle system on Z starting from an infinite particle step configuration in which there are no particles to the right of a maximal one. We show that the scaled position Xt/(σ bt) - at of the right-most particle at time t converges to a Gumbel limit law, where bt = t/ t, at = (t/(2π t)), and σ is the standard deviation of the random walk jump probabilities. This work solves a problem left open in Arratia (1983). Moreover, to investigate the influence of the mass of particles behind the leading one, we consider initial profiles consisting of a block of L particles, where L ∞ as t ∞. Gumbel limit laws, under appropriate scaling, are obtained for Xt when L diverges in t. In particular, there is a transition when L is of order bt, above which the displacement of Xt is similar to that under a infinite particle step profile, and below which it is of order t L. Proofs are based on recently developed negative dependence properties of the symmetric exclusion system. Remarks are also made on the behavior of the right-most particle starting from a step profile in asymmetric nearest-neighbor exclusion, which complement known results.