Semi-reflexive polytopes

Abstract

The Ehrhart function LP(t) of a polytope P is usually defined only for integer dilation arguments t. By allowing arbitrary real numbers as arguments we may also detect integer points entering (or leaving) the polytope in fractional dilations of P, thus giving more information about the polytope. Nevertheless, there are some polytopes that only gain new integer points for integer values of t; that is, these polytopes satisfy LP(t) = LP( t ). We call those polytopes semi-reflexive. In this paper, we give a characterization of these polytopes in terms of their hyperplane description, and we use this characterization to show that a polytope is reflexive if and only if both it and its dual are semi-reflexive.