Ehrhart series of fractional stable set polytopes of finite graphs

Abstract

The fractional stable set polytope FRAC(G) of a simple graph G with d vertices is a rational polytope that is the set of nonnegative vectors (x1,…,xd) satisfying xi+xj 1 for every edge (i,j) of G. In this paper we show that (i) The δ-vector of a lattice polytope 2 FRAC(G) is alternatingly increasing; (ii) The Ehrhart ring of FRAC(G) is Gorenstein; (iii) The coefficients of the numerator of the Ehrhart series of FRAC(G) are symmetric, unimodal and computed by the δ-vector of 2 FRAC(G).