A Blichfeldt-type inequality for the surface area

Abstract

In 1921 Blichfeldt gave an upper bound on the number of integral points contained in a convex body in terms of the volume of the body. More precisely, he showed that #(Kn)≤ n! (K)+n, whenever K⊂n is a convex body containing n+1 affinely independent integral points. Here we prove an analogous inequality with respect to the surface area (K), namely #(Kn) < (K) + ((n+1)/2) (n-1)! (K). The proof is based on a slight improvement of Blichfeldt's bound in the case when K is a non-lattice translate of a lattice polytope, i.e., K=t+P, where t∈nn and P is an n-dimensional polytope with integral vertices. Then we have #((t+P)n)≤ n! (P). Moreover, in the 3-dimensional case we prove a stronger inequality, namely #(Kn) < (K) + 2 (K).