The diameter of lattice zonotopes

Abstract

We establish sharp asymptotic estimates for the diameter of primitive zonotopes when their dimension is fixed. We also prove that, for infinitely many integers k, the largest possible diameter of a lattice zonotope contained in the hypercube [0,k]d is uniquely achieved by a primitive zonotope. As a consequence, we obtain that this largest diameter grows like kd/(d+1) up to an explicit multiplicative constant, when d is fixed and k goes to infinity, providing a new lower bound on the largest possible diameter of a lattice polytope contained in [0,k]d.