Single-site approximation for reaction-diffusion processes
arXiv:cond-mat/0605254 · doi:10.1007/s10955-006-9206-8
Abstract
We consider the branching and annihilating random walk $A\to 2A$ and $2A\to 0$ with reaction rates $Ï$ and $λ$, respectively, and hopping rate $D$, and study the phase diagram in the $(λ/D,Ï/D)$ plane. According to standard mean-field theory, this system is in an active state for all $Ï/D>0$, and perturbative renormalization suggests that this mean-field result is valid for $d >2$; however, nonperturbative renormalization predicts that for all $d$ there is a phase transition line to an absorbing state in the $(λ/D,Ï/D)$ plane. We show here that a simple single-site approximation reproduces with minimal effort the nonperturbative phase diagram both qualitatively and quantitatively for all dimensions $d>2$. We expect the approach to be useful for other reaction-diffusion processes involving absorbing state transitions.
15 pages, 2 figures, published version