Large-n conditional facedness mn of 3D Poisson-Voronoi cells

Abstract

We consider the three-dimensional Poisson-Voronoi tessellation and study the average facedness mn of a cell known to neighbor an n-faced cell. Whereas Aboav's law states that mn=A+B/n, theoretical arguments indicate an asymptotic expansion mn = 8 + k1 n-1/6 +.... Recent new Monte Carlo data due to Lazar et al., based on a very large data set, now clearly rule out Aboav's law. In this work we determine the numerical value of k1 and compare the expansion to the Monte Carlo data. The calculation of k1 involves an auxiliary planar cellular structure composed of circular arcs, that we will call the Poisson-Moebius diagram. It is a special case of more general Moebius diagrams (or multiplicatively weighted power diagrams) and is of interest for its own sake. We obtain exact results for the total edge length per unit area, which is a prerequisite for the coefficient k1, and a few other quantities in this diagram.