Enumerative problems for arborescences and monotone paths on polytope graphs

Abstract

Every generic linear functional f on a convex polytope P induces an orientation on the graph of P. From the resulting directed graph one can define a notion of f-arborescence and f-monotone path on P, as well as a natural graph structure on the vertex set of f-monotone paths. These concepts are important in geometric combinatorics and optimization. This paper bounds the number of f-arborescences, the number of f-monotone paths, and the diameter of the graph of f-monotone paths for polytopes P in terms of their dimension and number of vertices or facets.