Critical behavior and the limit distribution for long-range oriented percolation. II: Spatial correlation
Probability
2008-08-11 v3 Mathematical Physics
math.MP
Abstract
We prove that the Fourier transform of the properly-scaled normalized two-point function for sufficiently spread-out long-range oriented percolation with index \alpha>0 converges to e^{-C|k|^{\alpha\wedge2}} for some C\in(0,\infty) above the upper-critical dimension 2(\alpha\wedge2). This answers the open question remained in the previous paper [arXiv:math/0703455]. Moreover, we show that the constant C exhibits crossover at \alpha=2, which is a result of interactions among occupied paths. The proof is based on a new method of estimating fractional moments for the spatial variable of the lace-expansion coefficients.
Cite
@article{arxiv.0804.2039,
title = {Critical behavior and the limit distribution for long-range oriented percolation. II: Spatial correlation},
author = {Lung-Chi Chen and Akira Sakai},
journal= {arXiv preprint arXiv:0804.2039},
year = {2008}
}
Comments
20 pages, 1 figure