Concentration inequalities for Poisson U-statistics

Abstract

In this article we obtain concentration inequalities for Poisson U-statistics Fm(f,η) of order m 1 with kernels f under general assumptions on f and the intensity measure γ of underlying Poisson point process η. The main result are new concentration bounds of the form \[ P(|Fm ( f , η) -E Fm ( f , η)| t)≤ 2(-I(γ,t)), \] where I(γ,t) is of optimal order in t, namely it satisfies I(γ,t)=(t1 m t) as t∞ and γ is fixed. The function I(γ,t) is given explicitly in terms of parameters of the assumptions satisfied by f and . One of the key ingredients of the proof is bounding the centred moments of Fm(f,η). We discuss the optimality of obtained concentration bounds and consider a number of applications related to Gilbert graphs and Poisson hyperplane processes in constant curvature spaces.

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