English

U-statistics in stochastic geometry

Probability 2015-03-27 v2

Abstract

This survey will appear as a chapter of the forthcoming book [19]. A U-statistic of order kk with kernel f:\XkRdf:\X^k \to \R^d over a Poisson process is defined in \cite{ReiSch11} as_x_1,,x_kηk_f(x_1,,x_k) \sum\_{x\_1, \dots , x\_k \in \eta^k\_{\neq}} f(x\_1, \dots, x\_k) under appropriate integrability assumptions on ff. U-statistics play an important role in stochastic geometry since many interesting functionals can be written as U-statistics, like intrinsic volumes of intersection processes, characteristics of random geometric graphs, volumes of random simplices, and many others, see for instance \cite{ LacPec13, LPST,ReiSch11}. It turns out that the Wiener-Ito chaos expansion of a U-statistic is finite and thus Malliavin calculus is a particularly suitable method. Variance estimates, the approximation of the covariance structure and limit theorems which have been out of reach for many years can be derived. In this chapter we state the fundamental properties of U-statistics and investigate moment formulae. The main object of the chapter is to introduce the available limit theorems.

Keywords

Cite

@article{arxiv.1503.00110,
  title  = {U-statistics in stochastic geometry},
  author = {Raphaël Lachèze-Rey and Matthias Reitzner},
  journal= {arXiv preprint arXiv:1503.00110},
  year   = {2015}
}

Comments

22pp

R2 v1 2026-06-22T08:40:28.960Z