Logarithmic speed-up of relaxation in A-B annihilation with exclusion

Abstract

We show that the decay of the density of active particles in the reaction A+B → 0 in one dimension, with exclusion interaction, results in logarithmic corrections to the expected power law decay, when the starting initial condition (i.c.) is periodic. It is well-known that the late-time density of surviving particles goes as t-1/4 with random initial conditions, and as t-1/2 with alternating initial conditions (ABABAB...). We show that the decay for periodic i.c.s made of longer blocks (AnBnAnBn...) do not show a pure power-law decay when n is even. By means of first-passage Monte Carlo simulations, and a mapping to a q-state coarsening model which can be solved in the Independent Interval Approximation (IIA), we show that the late-time decay of the density of surviving particles goes as t-1/2((t))-1 for n even, but as t-1/2 when n is odd. We relate this kinetic symmetry breaking in the Glauber Ising model. We also see a very slow crossover from a t-1/2((t))-1 regime to eventual t-1/2 behaviour for i.c.s made of mixtures of odd- and even-length blocks.