Poisson-Delaunay approximation

Abstract

For a Borel set A and a stationary Poisson point process ηt in Rd of intensity t>0, the Poisson-Delaunay approximation Aηt of A is the union of all Delaunay cells generated by ηt with center in A. It is shown that λd(Aηt) is an unbiased estimator for λd(A), variance bounds and a quantitative central limit theorem are given. The asymptotic behaviour of the symmetric difference λd(A Aηt) is derived as t ∞.

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