A model for anomalous directed percolation
arXiv:cond-mat/9809005 · doi:10.1007/s100510050656
Abstract
We introduce a model for the spreading of epidemics by long-range infections and investigate the critical behaviour at the spreading transition. The model generalizes directed bond percolation and is characterized by a probability distribution for long-range infections which decays in $d$ spatial dimensions as $1/r^{d+Ï}$. Extensive numerical simulations are performed in order to determine the density exponent $β$ and the correlation length exponents $ν_{||}$ and $ν_\perp$ for various values of $Ï$. We observe that these exponents vary continuously with $Ï$, in agreement with recent field-theoretic predictions. We also study a model for pairwise annihilation of particles with algebraically distributed long-range interactions.
RevTeX, 9 pages, including 6 eps-figures