Alternating Kinetics of Annihilating Random Walks Near a Free Interface

Abstract

The kinetics of annihilating random walks in one dimension, with the half-line x>0 initially filled, is investigated. The survival probability of the nth particle from the interface exhibits power-law decay, Sn(t)~t-alphan, with alphan approximately equal to 0.225 for n=1 and all odd values of n; for all n even, a faster decay with alphan approximately equal to 0.865 is observed. From consideration of the eventual survival probability in a finite cluster of particles, the rigorous bound alpha1<1/4 is derived, while a heuristic argument gives alpha1 approximately equal to 3 sqrt3/8 = 0.2067.... Numerically, this latter value appears to be a stringent lower bound for alpha1. The average position of the first particle moves to the right approximately as 1.7 t1/2, with a relatively sharp and asymmetric probability distribution.

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