Enriched chain polytopes

Abstract

Stanley introduced a lattice polytope CP arising from a finite poset P, which is called the chain polytope of P. The geometric structure of CP has good relations with the combinatorial structure of P. In particular, the Ehrhart polynomial of CP is given by the order polynomial of P. In the present paper, associated to P, we introduce a lattice polytope EP, which is called the enriched chain polytope of P, and investigate geometric and combinatorial properties of this polytope. By virtue of the algebraic technique on Gr\"obner bases, we see that EP is a reflexive polytope with a flag regular unimodular triangulation. Moreover, the h*-polynomial of EP is equal to the h-polynomial of a flag triangulation of a sphere. On the other hand, by showing that the Ehrhart polynomial of EP coincides with the left enriched order polynomial of P, it follows from works of Stembridge and Petersen that the h*-polynomial of EP is γ-positive. Stronger, we prove that the γ-polynomial of EP is equal to the f-polynomial of a flag simplicial complex.