Universal Scaling Limits for Generalized Gamma Polytopes

Abstract

Fix a space dimension d 2, parameters α > -1 and β 1, and let γd,α, β be the probability measure of an isotropic random vector in Rd with density proportional to align* ||x||α\, (-\|x\|ββ), x∈ Rd. align* By Kλ, we denote the Generalized Gamma Polytope arising as the random convex hull of a Poisson point process in Rd with intensity measure λγd,α,β, λ>0. We establish that the scaling limit of the boundary of Kλ, as λ → ∞, is given by a universal `festoon' of piecewise parabolic surfaces, independent of α and β. Moreover, we state a list of other large scale asymptotic results, including expectation and variance asymptotics, central limit theorems, concentration inequalities, Marcinkiewicz-Zygmund-type strong laws of large numbers, as well as moderate deviation principles for the intrinsic volumes and face numbers of Kλ.