Mean width of random polytopes in a reasonably smooth convex body

Let K be a convex body in and let X_n=(x₁,…,x_n) be a random sample of n independent points in K chosen according to the uniform distribution. The convex hull K_n of X_n is a random polytope in K, and we consider its mean width W(K_n). In this article, we assume that K has a rolling ball of radius >0. First, we extend the asymptotic formula for the expectation of W(K)−W(K_n) which was earlier known only in the case when ∂K has positive Gaussian curvature. In addition, we determine the order of magnitude of the variance of W(K_n), and prove the strong law of large numbers for W(K_n). We note that the strong law of large numbers for any quermassintegral of K was only known earlier for the case when ∂K has positive Gaussian curvature.