The 2d-Directed Spanning Forest is almost surely a tree
Probability
2012-11-27 v3
Abstract
We consider the Directed Spanning Forest (DSF) constructed as follows: given a Poisson point process N on the plane, the ancestor of each point is the nearest vertex of N having a strictly larger abscissa. We prove that the DSF is actually a tree. Contrary to other directed forests of the literature, no Markovian process can be introduced to study the paths in our DSF. Our proof is based on a comparison argument between surface and perimeter from percolation theory. We then show that this result still holds when the points of N belonging to an auxiliary Boolean model are removed. Using these results, we prove that there is no bi-infinite paths in the DSF.
Keywords
Cite
@article{arxiv.1010.0773,
title = {The 2d-Directed Spanning Forest is almost surely a tree},
author = {David Coupier and Viet Chi Tran},
journal= {arXiv preprint arXiv:1010.0773},
year = {2012}
}
Comments
6 figures