The support function of the high-dimensional Poisson polytope
Abstract
Let Kλd be the convex hull of the intersection of the homogeneous Poisson point process of intensity λ in Rd, d 2, with the Euclidean unit ball Bd. In this paper, we study the asymptotic behavior as d∞ of the support function hλ(d)(u) :=x∈ Kλd u,x in an arbitrary direction u ∈ Sd-1 of the Poisson polytope Kλd. We identify three different regimes (subcritical, critical, and supercritical) in terms of the intensity λ:=λ(d) and derive in each regime the precise distributional convergence of hλ(d) after suitable scaling. We especially treat this question when the support function is considered over multiple directions at once. We finally deduce partial counterparts for the radius-vector function of the polytope.
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