English

Which Connected Spatial Networks on Random Points have Linear Route-Lengths?

Probability 2009-11-30 v1 Discrete Mathematics

Abstract

In a model of a connected network on random points in the plane, one expects that the mean length of the shortest route between vertices at distance rr apart should grow only as O(r)O(r) as rr \to \infty, but this is not always easy to verify. We give a general sufficient condition for such linearity, in the setting of a Poisson point process. In a L×LL \times L square, define a subnetwork \GGL\GG_L to have the edges which are present regardless of the configuration outside the square; the condition is that the largest component of \GGL\GG_L should contain a proportion 1o(1)1 - o(1) of the vertices, as LL \to \infty. The proof is by comparison with oriented percolation. We show that the general result applies to the relative neighborhood graph, and establishing the linearity property for this network immediately implies it for a large family of proximity graphs.

Keywords

Cite

@article{arxiv.0911.5296,
  title  = {Which Connected Spatial Networks on Random Points have Linear Route-Lengths?},
  author = {David J. Aldous},
  journal= {arXiv preprint arXiv:0911.5296},
  year   = {2009}
}
R2 v1 2026-06-21T14:16:58.700Z