Variance asymptotics for random polytopes in smooth convex bodies
Abstract
Let K ⊂ d be a smooth convex set and let be a Poisson point process on d of intensity . The convex hull of K is a random convex polytope K. As ∞, we show that the variance of the number of k-dimensional faces of K, when properly scaled, converges to a scalar multiple of the affine surface area of K. Similar asymptotics hold for the variance of the number of k-dimensional faces for the convex hull of a binomial process in K.
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