Distance from the Nucleus to a Uniformly Random Point in the 0-cell and the Typical Cell of the Poisson-Voronoi Tessellation

Abstract

Consider the distances Ro and Ro from the nucleus to a uniformly random point in the 0-cell and the typical cell, respectively, of the d-dimensional Poisson-Voronoi (PV) tessellation. The main objective of this paper is to characterize the exact distributions of Ro and Ro. First, using the well-known relationship between the 0-cell and the typical cell, we show that the random variable Ro is equivalent in distribution to the contact distance of the Poisson point process. Next, we derive a multi-integral expression for the exact distribution of Ro. Further, we derive a closed-form approximate expression for the distribution of Ro, which is the contact distribution with a mean corrected by a factor equal to the ratio of the mean volumes of the 0-cell and the typical cell. An additional outcome of our analysis is a direct proof of the well-known spherical property of the PV cells having a large inball.