Two-Scale Annihilation
Abstract
The kinetics of single-species annihilation, A+A 0, is investigated in which each particle has a fixed velocity which may be either v with equal probability, and a finite diffusivity. In one dimension, the interplay between convection and diffusion leads to a decay of the density which is proportional to t-3/4. At long times, the reactants organize into domains of right- and left-moving particles, with the typical distance between particles in a single domain growing as t3/4, and the distance between domains growing as t. The probability that an arbitrary particle reacts with its n th neighbor is found to decay as n-5/2 for same-velocity pairs and as n-7/4 for +- pairs. These kinetic and spatial exponents and their interrelations are obtained by scaling arguments. Our predictions are in excellent agreement with numerical simulations.
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