A+ A reaction for particles with a dynamic bias to move away from their nearest neighbour in one dimension

Abstract

We consider the dynamics of particles undergoing the reaction A+A in one dimension with a dynamic bias. Here the particles move towards their nearest neighbour with probability 0.5+ε where -0.5 ≤ ε < 0. εc = -0.5 is the deterministic limit where the nearest neighbour interaction is strictly repulsive. We show that the negative bias changes drastically the behaviour of the fraction of surviving particles (t) and persistence probability P(t) with time t. (t) decays as a/ ( t)b where b increases with ε - εc. P(t) shows a stretched exponential decay with non-universal decay parameters. The probability (x,t) that a tagged particle is at position x from its origin is found to be Gaussian for all ε<0; the associated scaling variable is x/tα where α approaches the known limiting value 1/4 as ε εc, in a power law manner. Some additional features of the dynamics by tagging the particles are also studied. The results are compared to the case of positive bias, a well studied problem.