Lattice zonotopes of degree 2

Abstract

The Ehrhart polynomial ehrP (n) of a lattice polytope P gives the number of integer lattice points in the n-th dilate of P for all integers n≥ 0. The degree of P is defined as the degree of its h-polynomial, a particular transformation of the Ehrhart polynomial with many useful properties which serves as an important tool for classification questions in Ehrhart theory. A zonotope is the Minkowski (pointwise) sum of line segments. We classify all Ehrhart polynomials of lattice zonotopes of degree 2 thereby complementing results of Scott (1976), Treutlein (2010), and Henk-Tagami (2009). Our proof is constructive: by considering solid-angles and the lattice width, we provide a characterization of all 3-dimensional zonotopes of degree 2.