Bipartite stable Poisson graphs on R
Abstract
Let red and blue points be distributed on according to two independent Poisson processes and and let each red (blue) point independently be equipped with a random number of half-edges according to a probability distribution (). We consider translation-invariant bipartite random graphs with vertex classes defined by the point sets of and , respectively, generated by a scheme based on the Gale-Shapley stable marriage for perfectly matching the half-edges. Our main result is that, when all vertices have degree 2 almost surely, then the resulting graph does not contain an infinite component. The two-color model is hence qualitatively different from the one-color model, where Deijfen, Holroyd and Peres have given strong evidence that there is an infinite component. We also present simulation results for other degree distributions.
Cite
@article{arxiv.1202.1136,
title = {Bipartite stable Poisson graphs on R},
author = {Maria Deijfen and Fabio Lopes},
journal= {arXiv preprint arXiv:1202.1136},
year = {2012}
}