Poisson-Laguerre tessellations

Abstract

In this paper we introduce a family of Poisson-Laguerre tessellations in Rd generated by a Poisson point process in Rd× R, whose intensity measure has a density of the form (v,h) f(h) d h d v, where v∈Rd and h∈R, with respect to the Lebesgue measure. We study its sectional properties and show that the -dimensional section of a Poisson-Laguerre tessellation corresponding to f is an -dimensional Poisson-Laguerre tessellation corresponding to f, which is up to a constant a fractional integral of f of order (d-)/2. Further we derive an explicit representation for the distribution of the volume weighted typical cell of the dual Poisson-Laguerre tessellation in terms of fractional integrals and derivatives of f.

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