Intrinsic volumes of random polytopes with vertices on the boundary of a convex body

Abstract

Let K be a convex body in d, let j∈\1, ..., d-1\, and let be a positive and continuous probability density function with respect to the (d-1)-dimensional Hausdorff measure on the boundary ∂ K of K. Denote by Kn the convex hull of n points chosen randomly and independently from ∂ K according to the probability distribution determined by . For the case when ∂ K is a C2 submanifold of d with everywhere positive Gauss curvature, M. Reitzner proved an asymptotic formula for the expectation of the difference of the jth intrinsic volumes of K and Kn, as n∞. In this article, we extend this result to the case when the only condition on K is that a ball rolls freely in K.