Asymptotic Properties of Random Voronoi Cells with Arbitrary Underlying Density

Abstract

We consider the Voronoi diagram generated by n i.i.d. Rd-valued random variables with an arbitrary underlying probability density function f on Rd, and analyse the asymptotic behaviours of certain geometric properties, such as the measure, of the Voronoi cells as n tends to infinity. We adapt the methods used by Devroye et al (2017) to conduct a study of the asymptotic properties of two types of Voronoi cells: 1, Voronoi cells that have a fixed nucleus; 2, Voronoi cells that contain a fixed point. For the first type of Voronoi cells, we show that their geometric properties resemble those in the case when the Voronoi diagram is generated by a homogeneous Poisson point process. For the second type of Voronoi cells, we determine the limiting distribution, which is universal in all choices of f, of the rescaled measure of the cells. For both types, we establish the asymptotic independence of measures of disjoint cells.