Persistence in the One-Dimensional A+B -> 0 Reaction-Diffusion Model
摘要
The persistence properties of a set of random walkers obeying the A+B -> 0 reaction, with equal initial density of particles and homogeneous initial conditions, is studied using two definitions of persistence. The probability, P(t), that an annihilation process has not occurred at a given site has the asymptotic form , where is the persistence exponent (``type I persistence''). We argue that, for a density of particles , this non-trivial exponent is identical to that governing the persistence properties of the one-dimensional diffusion equation, where . In the case of an initially low density, , we find asymptotically. The probability that a site remains unvisited by any random walker (``type II persistence'') is also investigated and found to decay with a stretched exponential form, , provided . A heuristic argument for this behavior, based on an exactly solvable toy model, is presented.
引用
@article{arxiv.cond-mat/0105074,
title = {Persistence in the One-Dimensional A+B -> 0 Reaction-Diffusion Model},
author = {S. J. O'Donoghue and A. J. Bray},
journal= {arXiv preprint arXiv:cond-mat/0105074},
year = {2009}
}
备注
11 RevTeX pages, 19 EPS figures