M-convexity of the minimum-cost packings of arborescences

Abstract

The aim of this paper is to reveal the discrete convexity of the minimum-cost packings of arborescences and branchings. We first prove that the minimum-cost packings of disjoint k branchings (minimum-cost k-branchings) induce an M-convex function defined on the integer vectors on the vertex set. The proof is based on a theorem on packing disjoint k-branchings, which extends Edmonds' disjoint branchings theorem and is of independent interest. We then show the M-convexity of the minimum-cost k-arborescences, which provides a short proof for a theorem of Bern\'ath and Kir\'aly (SODA 2016) stating that the root vectors of the minimum-cost k-arborescences form a base polyhedron of a submodular function. Finally, building upon the M-convexity of k-branchings, we present a new problem of minimum-cost root location of a k-branching, and show that it can be solved in polynomial time if the opening cost function is M-convex.