Ehrhart quasi-polynomials of rational polytopes by real dilations

Abstract

This paper is to study the Ehrhart function L(P,t) of a rational n-polytope P, defined as the number of lattice points of dilated polytopes tP with real numbers t≥ 0. It turns out that L(P,t) is a quasi-polynomial of real variable t in the sense that \[ L(P,t)=Σk=0n ck(P,t)tk, t≥ 0, \] where ck(P,t) are periodic piecewise polynomials of degree n-k if aff\,P contains the origin, and are periodic functions vanishing almost everywhere otherwise. When P is a rational simplex σ, the coefficient functions ck(σ,t) are given explicitly in terms of vertex information of the simplex σ. Moreover, the reciprocity law still holds.