Exponents appearing in heterogeneous reaction-diffusion models in one dimension
Abstract
We study the following 1D two-species reaction diffusion model : there is a small concentration of B-particles with diffusion constant in an homogenous background of W-particles with diffusion constant ; two W-particles of the majority species either coagulate () or annihilate () with the respective probabilities and ; a B-particle and a W-particle annihilate () with probability 1. The exponent describing the asymptotic time decay of the minority B-species concentration can be viewed as a generalization of the exponent of persistent spins in the zero-temperature Glauber dynamics of the 1D -state Potts model starting from a random initial condition : the W-particles represent domain walls, and the exponent characterizes the time decay of the probability that a diffusive "spectator" does not meet a domain wall up to time . We extend the methods introduced by Derrida, Hakim and Pasquier ({\em Phys. Rev. Lett.} {\bf 75} 751 (1995); Saclay preprint T96/013, to appear in {\em J. Stat. Phys.} (1996)) for the problem of persistent spins, to compute the exponent in perturbation at first order in for arbitrary and at first order in for arbitrary .
Cite
@article{arxiv.cond-mat/9607030,
title = {Exponents appearing in heterogeneous reaction-diffusion models in one dimension},
author = {Cécile Monthus},
journal= {arXiv preprint arXiv:cond-mat/9607030},
year = {2009}
}
Comments
29 pages. The three figures are not included, but are available upon request