Hermite normal forms and δ-vector

Abstract

Let δ() = (δ0, δ1,..., δd) be the δ-vector of an integral polytope ⊂ N of dimension d. Following the previous work of characterizing the δ-vectors with Σi=0d δi ≤ 3, the possible δ-vectors with Σi=0d δi = 4 will be classified. And each possible δ-vectors can be obtained by simplices. We get this result by studying the problem of classifying the possible integral simplices with a given δ-vector (δ0, δ1,..., δd), where Σi=0d δi ≤ 4, by means of Hermite normal forms of square matrices.