A+A → model with a bias towards nearest neighbor

Abstract

We have studied A+A → reaction-diffusion model on a ring, with a bias ε (0 ≤ ε ≤ 0.5) of the random walkers A to hop towards their nearest neighbor. Though the bias is local in space and time, we show that it alters the universality class of the problem. The z exponent, which describes the growth of average spacings between the walkers with time, changes from the value 2 at ε=0 to the mean-field value of unity for any non-zero ε. We study the problem analytically using independent interval approximation and compare the scaling results with that obtained from simulation. The distribution P(k,t) of the spacing k between two walkers (per site) is given by t-2/z f(k/t1/z) as expected; however, the scaling function shows different behaviour in the two approaches.