Vertex Posets, Monotone Path Polytopes, and Chow Polynomials

Abstract

Let P⊂ Rn be a convex polytope and let be a linear functional which is nonconstant on every edge of P. The induced acyclic orientation determines positive and negative Biaynicki-Birula type partitions of P into unions of relative interiors of faces. Our first result establishes a duality: the positive partition is a stratification if and only if the negative one is a stratification. Our second result connects poset invariants with monotone path polytopes. Assuming the induced vertex relation admits the structure of a graded poset, we prove that the Chow polynomial of the resulting vertex poset agrees with the h-polynomial of a (dual) monotone path polytope.