Quadratic Gr\"obner bases of twinned order polytopes

Abstract

Let P and Q be finite partially ordered sets on [d] = \1, …, d\, and O(P) ⊂ Rd and O(Q) ⊂ Rd their order polytopes. The twinned order polytope of P and Q is the convex polytope (P,-Q) ⊂ Rd which is the convex hull of O(P) (- O(Q)). It follows that the origin of Rd belongs to the interior of (P,-Q) if and only if P and Q possess a common linear extension. It will be proved that, when the origin of Rd belongs to the interior of (P,-Q), the toric ideal of (P,-Q) possesses a quadratic Gr\"obner basis with respect to a reverse lexicographic order for which the variable corresponding to the origin is smallest. Thus in particular if P and Q possess a common linear extension, then the twinned order polytope (P,-Q) is a normal Gorenstein Fano polytope.