Flat simplices and kissing polytopes

Abstract

We consider how flat a lattice simplex contained in the hypercube [0,k]d can be. This question is related to the notion of kissing polytopes: two lattice polytopes contained in the hypercube [0,k]d are kissing when they are disjoint but their distance is as small as possible. We show that the smallest possible distance of a lattice point P contained in the cube [0,k]3 to a lattice triangle in the same cube that does not contain P is 13k4-4k3+4k2-2k+1 when k is at least 2. We also improve the known lower bounds on the distance of kissing polytopes for d at least 4 and k at least 2.