Flat δ-vectors and their Ehrhart polynomials

Abstract

We call the δ-vector of an integral convex polytope of dimension d flat if the δ-vector is of the form (1,0,…,0,a,…,a,0,…,0), where a ≥ 1. In this paper, we give the complete characterization of possible flat δ-vectors. Moreover, for an integral convex polytope P ⊂ RN of dimension d, we let i(P,n)=|nP ZN| and \ i*(P,n)=|n(P ∂ P) ZN|. By this characterization, we show that for any d ≥ 1 and for any k, ≥ 0 with k+ ≤ d-1, there exist integral convex polytopes P and Q of dimension d such that (i) For t=1,…,k, we have i(P,t)=i(Q,t), (ii) For t=1,…,, we have i*(P,t)=i*(Q,t) and (iii) i(P,k+1) ≠ i(Q,k+1) and i*(P,+1)≠ i*(Q,+1).