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arxiv: 2410.23003 · v1 · pith:QWHRSDCRnew · submitted 2024-10-30 · 🧮 math.PR

Poisson-Delaunay approximation

classification 🧮 math.PR
keywords lambdaapproximationpoisson-delaunayasymptoticbehaviourborelboundscells
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For a Borel set $A$ and a stationary Poisson point process $\eta_t$ in $\mathbb R^d$ of intensity $t>0$, the Poisson-Delaunay approximation $ A_{\eta_t}$ of $A$ is the union of all Delaunay cells generated by $\eta_t$ with center in $A$. It is shown that $\lambda_d(A_{\eta_t})$ is an unbiased estimator for $\lambda_d(A)$, variance bounds and a quantitative central limit theorem are given. The asymptotic behaviour of the symmetric difference $\lambda_d(A\Delta A_{\eta_t})$ is derived as $t \to\infty$.

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  1. Face volume densities of positive-intensity and ideal Poisson--Voronoi tessellations in hyperbolic spaces

    math.PR 2026-06 unverdicted novelty 7.0

    Analytic k-volume densities are obtained for Poisson-Voronoi tessellations in hyperbolic d-space together with their ideal low-intensity limit using a new integral formula.