Localization in random geometric graphs with too many edges
Abstract
We consider a random geometric graph , given by connecting two vertices of a Poisson point process of intensity on the unit torus whenever their distance is smaller than the parameter . The model is conditioned on the rare event that the number of edges observed, , is greater than , for some fixed . This article proves that upon conditioning, with high probability there exists a ball of diameter which contains a clique of at least vertices, for any given . Intuitively, this region contains all the "excess" edges the graph is forced to contain by the conditioning event, up to lower order corrections. As a consequence of this result, we prove a large deviations principle for the upper tail of the edge count of the random geometric graph. The rate function of this large deviation principle turns out to be non-convex.
Cite
@article{arxiv.1401.7577,
title = {Localization in random geometric graphs with too many edges},
author = {Sourav Chatterjee and Matan Harel},
journal= {arXiv preprint arXiv:1401.7577},
year = {2019}
}
Comments
56 pages, 1 figure