Monotonicity of the Sample Range of 3-D Data: Moments of Volumes of Random Tetrahedra

Abstract

The sample range of uniform random points X1, … , Xn chosen in a given convex set is the convex hull conv[X1, …, Xn]. It is shown that in dimension three the expected volume of the sample range is not monotone with respect to set inclusion. This answers a question by Meckes in the negative. The given counterexample is the three-dimensional tetrahedron together with an infinitesimal variation of it. As side result we obtain an explicit formula for all even moments of the volume of a random simplex which is the convex hull of three uniform random points in the tetrahedron and the center of one facet.