论文信息 - On a Voronoi aggregative process related to a bivariate Poisson process

On a Voronoi aggregative process related to a bivariate Poisson process

We consider two independent homogeneous Poisson processes Π0 and Π1 in the plane with intensities λ0 and λ1, respectively. We study additive functionals of the set of Π0-particles within a typical Voronoi Π1-cell. We find the first and the second moments of these variables as well as upper and lower bounds on their distribution functions, implying an exponential asymptotic behavior of their tails. Explicit formulae are given for the number and the sum of distances from Π0-particles to the nucleus within a typical Voronoi Π1-cell.

S. Foss | S. Zuyev

[1] Amir Dembo,et al. Large Deviations Techniques and Applications , 1998 .

[2] François Baccelli,et al. Géométrie aléatoire et architecture de réseaux , 1996 .

[3] Serguei Foss,et al. On a certain segment process with Voronoi clustering , 1993 .

[4] Sergei A. Zuyev,et al. Estimates for Distributions of the Voronoi Polygon's Geometric Characteristics , 1992, Random Struct. Algorithms.

[5] D. Stoyan,et al. Stochastic Geometry and Its Applications , 1989 .

[6] E. Gilbert. Random Subdivisions of Space into Crystals , 1962 .