On the f-vectors of flow polytopes for the complete graph

Abstract

The Chan-Robbins-Yuen polytope (CRYn) of order n is a face of the Birkhoff polytope of doubly stochastic matrices that is also a flow polytope of the directed complete graph Kn+1 with netflow (1,0,0, … , 0, -1). The volume and lattice points of this polytope have been actively studied, however its face structure has received less attention. We give generating functions and explicit formulas for computing the f-vector by using Hille's (2003) result bijecting faces of a flow polytope to certain graphs, as well as Andresen-Kjeldsen's (1976) result that enumerates certain subgraphs of the directed complete graph. We extend our results to flow polytopes of the complete graph having arbitrary (non-negative) netflow vectors and recover the f-vector of the Tesler polytope of M\'esz\'aros--Morales--Rhoades (2017).