Volumes of convex lattice polytopes and a question of V. I. Arnold

Abstract

We show by a direct construction that there are at least \cV(d-1)/(d+1)\ convex lattice polytopes in Rd of volume V that are different in the sense that none of them can be carried to an other one by a lattice preserving affine transformation. This is achieved by considering the family Pd(r) (to be defined in the text) of convex lattice polytopes whose volumes are between 0 and rd/d!. Namely we prove that for P ∈ Pd(r), d!vol\; P takes all possible integer values between crd-1 and rd where c>0 is a constant depending only on d.