Ellipses Percolation
Abstract
We define a continuum percolation model that provides a collection of random ellipses on the plane and study the behavior of the covered set and the vacant set, the one obtained by removing all ellipses. Our model generalizes a construction that appears implicitly in the Poisson cylinder model of Tykesson and Windisch. The ellipses model has a parameter associated with the tail decay of the major axis distribution; we only consider distributions satisfying . We prove that this model presents a double phase transition in . For the plane is completely covered by the ellipses, almost surely. For the vacant set is not empty but does not percolate for any positive density of ellipses, while the covered set always percolates. For the vacant set percolates for small densities of ellipses and the covered set percolates for large densities. Moreover, we prove for the critical parameter that there is a non-degenerate interval of density for which the probability of crossing boxes of a fixed proportion is bounded away from zero and one, a rather unusual phenomenon. In this interval neither the covered set nor the vacant set percolate, a behavior that is similar to critical independent percolation on .
Cite
@article{arxiv.1605.07598,
title = {Ellipses Percolation},
author = {Augusto Teixeira and Daniel Ungaretti},
journal= {arXiv preprint arXiv:1605.07598},
year = {2017}
}
Comments
29 pages, 5 figures