The volume of random polytopes circumscribed around a convex body

Abstract

Let K be a convex body in Rd which slides freely in a ball. Let K(n) denote the intersection of n closed half-spaces containing K whose bounding hyperplanes are independent and identically distributed according to a certain prescribed probability distribution. We prove an asymptotic formula for the expectation of the difference of the volumes of K(n) and K, and an asymptotic upper bound on the variance of the volume of K(n). We achieve these results by first proving similar statements for weighted mean width approximations of convex bodies that admit a rolling ball by inscribed random polytopes and then by polarizing these results.