English

Concentration for Poisson U-Statistics: Subgraph Counts in Random Geometric Graphs

Probability 2015-04-29 v1

Abstract

Concentration inequalities for subgraph counts in random geometric graphs built over Poisson point processes are proved. The estimates give upper bounds for the probabilities P(NM+r)\mathbb{P}(N\geq M +r) and P(NMr)\mathbb{P}(N\leq M - r) where MM is either a median or the expectation of a subgraph count NN. The bounds for the lower tail have a fast Gaussian decay and the bounds for the upper tail satisfy an optimality condition. A special feature of the presented inequalities is that the underlying Poisson process does not need to have finite intensity measure. The tail estimates for subgraph counts follow from concentration inequalities for more general local Poisson U-statistics. These bounds are proved using recent general concentration results for Poisson U-statistics and techniques based on the convex distance for Poisson point processes.

Keywords

Cite

@article{arxiv.1504.07404,
  title  = {Concentration for Poisson U-Statistics: Subgraph Counts in Random Geometric Graphs},
  author = {Sascha Bachmann and Matthias Reitzner},
  journal= {arXiv preprint arXiv:1504.07404},
  year   = {2015}
}

Comments

27 pages, 1 figure

R2 v1 2026-06-22T09:24:04.032Z