Samenvatting
In this article we obtain concentration inequalities for Poisson $U$-statistics $F_m(f,\eta)$ of order $m\ge 1$ with kernels $f$ under general assumptions on $f$ and the intensity measure $\gamma \Lambda$ of underlying Poisson point process $\eta$. The main result are new concentration bounds of the form \[ \mathbb{P}(|F_m ( f , \eta) -\mathbb{E} F_m ( f , \eta)| \ge t)\leq 2\exp(-I(\gamma,t)), \] where $I(\gamma,t)$ satisfies $I(\gamma,t)=\Theta(t^{1\over m}\log t)$ as $t\to\infty$ and $\gamma$ is fixed. The function $I(\gamma,t)$ is given explicitly in terms of parameters of the assumptions satisfied by $f$ and $\Lambda$. One of the key ingredients of the proof are fine bounds for the centred moments of $F_m(f,\eta)$. We discuss the optimality of obtained bounds and consider a number of applications related to Gilbert graphs and Poisson hyperplane processes in constant curvature spaces.
Originele taal-2 | English |
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Uitgever | arXiv |
Aantal pagina's | 48 |
DOI's | |
Status | Submitted - 25-apr.-2024 |