Covering a supermodular-like function in a mixed hypergraph

Abstract

In this paper, we solve a conjecture by Szigeti in [Matroid-rooted packing of arborescences, submitted], which characterizes a mixed hypergraph F=(V, E A) having an orientation E of E such that eE A (P) ≥ ΣX ∈ Ph(X) -b( P) for every subpartition P of V, where h is an integer-valued, intersecting supermodular function on V and b a submodular function on V. As a corollary, another conjecture in the same paper is confirmed, which characterizes a mixed hypergraph having a packing of mixed hyperarborescences such that their roots form a basis in a given matroid, each vertex v belongs to exactly k of them and is the root of at least f(v) and at most g(v) of them.