Bernoulli line percolation
Abstract
We introduce a percolation model on , , in which the discrete lines of vertices that are parallel to the coordinate axis are entirely removed at random and independently of each other. In this way a vertex belongs to the vacant set if and only if none of the lines to which it belongs, is removed. We show the existence of a phase transition for as the probability of removing the lines is varied. We also establish that, in the certain region of parameters space where contains an infinite component, the truncated connectivity function has power-law decay, while inside the region where has no infinite component, there is a transition from exponential to power-law decay. In the particular case the power-law decay extends through all the region where has an infinite connected component. We also show that the number of infinite connected components of is either , or .
Keywords
Cite
@article{arxiv.1509.06204,
title = {Bernoulli line percolation},
author = {Marcelo R. Hilário and Vladas Sidoravicius},
journal= {arXiv preprint arXiv:1509.06204},
year = {2015}
}
Comments
31 pages, 6 figures