Holes and islands in random point sets

Abstract

For d∈N, let S be a set of points in Rd in general position. A set I of k points from S is a k-island in S if the convex hull conv(I) of I satisfies conv(I) S = I. A k-island in S in convex position is a k-hole in S. For d,k∈N and a convex body K⊂eqRd of volume 1, let S be a set of n points chosen uniformly and independently at random from K. We show that the expected number of k-holes in S is in O(nd). Our estimate improves and generalizes all previous bounds. In particular, we estimate the expected number of empty simplices in S by 2d-1· d!·nd. This is tight in the plane up to a lower-order term. Our method gives an asymptotically tight upper bound O(nd) even in the much more general setting, where we estimate the expected number of k-islands in S.