Triangulations and a discrete Brunn-Minkowski inequality in the plane

Abstract

For a set A of points in the plane, not all collinear, we denote by tr(A) the number of triangles in any triangulation of A; that is, tr(A) = 2i+b-2 where b and i are the numbers of points of A in the boundary and the interior of [A] (we use [A] to denote "convex hull of A"). We conjecture the following analogue of the Brunn-Minkowski inequality: for any two point sets A,B ⊂ R2 one has \[ tr(A+B)12≥ tr(A)12+ tr(B)12. \] We prove this conjecture in several cases: if [A]=[B], if B=A\b\, if |B|=3, or if none of A or B has interior points.