Local persistence in directed percolation
Abstract
We reconsider the problem of local persistence in directed site percolation. We present improved estimates of the persistence exponent in all dimensions from 1+1 to 7+1, obtained by new algorithms and by improved implementations of existing ones. We verify the strong corrections to scaling for 2+1 and 3+1 dimensions found in previous analyses, but we show that scaling is much better satisfied for very large and very small dimensions. For d > 4 (d is the spatial dimension), the persistence exponent depends non-trivially on d, in qualitative agreement with the non-universal values calculated recently by Fuchs {\it et al.} (J. Stat. Mech.: Theor. Exp. P04015 (2008)). These results are mainly based on efficient simulations of clusters evolving under the time reversed dynamics with a permanently active site and a particular survival condition discussed in Fuchs {\it et al.}. These simulations suggest also a new critical exponent which describes the growth of these clusters conditioned on survival, and which turns out to be the same as the exponent, \eta+\delta in standard notation, of surviving clusters under the standard DP evolution.
Cite
@article{arxiv.0907.4021,
title = {Local persistence in directed percolation},
author = {Peter Grassberger},
journal= {arXiv preprint arXiv:0907.4021},
year = {2015}
}
Comments
6 pages, including 4 figures; to appear in JSTAT