Empty Monochromatic Simplices

Abstract

Let S be a k-colored (finite) set of n points in Rd, d≥ 3, in general position, that is, no (d + 1) points of S lie in a common (d - 1)-dimensional hyperplane. We count the number of empty monochromatic d-simplices determined by S, that is, simplices which have only points from one color class of S as vertices and no points of S in their interior. For 3 ≤ k ≤ d we provide a lower bound of (nd-k+1+2-d) and strengthen this to (nd-2/3) for k=2. On the way we provide various results on triangulations of point sets in Rd. In particular, for any constant dimension d≥3, we prove that every set of n points (n sufficiently large), in general position in Rd, admits a triangulation with at least dn+( n) simplices.