Persistence properties of a system of coagulating and annihilating random walkers

Abstract

We study a d-dimensional system of diffusing particles that on contact either annihilate with probability 1/(q-1) or coagulate with probability (q-2)/(q-1). In 1-dimension, the system models the zero temperature Glauber dynamics of domain walls in the q-state Potts model. We calculate P(m,t), the probability that a randomly chosen lattice site contains a particle whose ancestors have undergone exactly (m-1) coagulations. Using perturbative renormalization group analysis for d < 2, we show that, if the number of coagulations m is much less than the typical number M(t), then P(m,t) ~ m(z/d) t(-theta), with theta=d Q + Q(Q-1/2) epsilon + O(epsilon2), z=(2Q-1) epsilon + (2 Q-1) (Q-1)(1/2+A Q) epsilon2 +O(epsilon3), where Q=(q-1)/q, epsilon =2-d and A =-0.006. M(t) is shown to scale as t(d/2-delta), where delta = d (1 -Q)+(Q-1)(Q-1/2) epsilon+ O(epsilon2). In two dimensions, we show that P(m,t) ~ ln(t)(Q(3-2Q)) ln(m)((2Q-1)2) t(-2Q) for m << t(2 Q-1). The 1-dimensional results corresponding to epsilon=1 are compared with results from Monte Carlo simulations.

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