Clustering in the three and four color cyclic particle systems in one dimension

Abstract

We study the -color cyclic particle system on the one-dimensional integer lattice Z, first introduced by Bramson and Griffeath in bramson1989flux. In that paper they show that almost surely, every site changes its color infinitely often if ∈ \3,4\ and only finitely many times if 5. In addition, they conjecture that for ∈ \3,4\ the system clusters, that is, for any pair of sites x,y, with probability tending to 1 as t∞, x and y have the same color at time t. Here we prove that conjecture.