Face numbers of high-dimensional Poisson zero cells

Abstract

Let Zd be the zero cell of a d-dimensional, isotropic and stationary Poisson hyperplane tessellation. We study the asymptotic behavior of the expected number of k-dimensional faces of Zd, as d∞. For example, we show that the expected number of hyperfaces of Zd is asymptotically equivalent to 2π/3\, d3/2, as d∞. We also prove that the expected solid angle of a random cone spanned by d random vectors that are independent and uniformly distributed on the unit upper half-sphere in Rd is asymptotic to 3 π-d, as d∞.

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