Strongly connected orientations and integer lattices
Abstract
Let be a digraph whose underlying undirected graph is -edge-connected, and let be the polytope whose vertices are the incidence vectors of arc sets whose reversal makes strongly connected. We study the lattice theoretic properties of the integer points contained in a proper face of not contained in for any . We prove under a mild necessary condition that contains an integral basis , i.e., is linearly independent, and any integral vector in the linear hull of is an integral linear combination of . This result is surprising as the integer points in do not necessarily form a Hilbert basis. In proving the result, we develop a theory similar to Matching Theory for degree-constrained dijoins in bipartite digraphs. Our result has consequences for head-disjoint strong orientations in hypergraphs, and also to a famous conjecture by Woodall that the minimum size of a dicut of , say , is equal to the maximum number of disjoint dijoins. We prove a relaxation of this conjecture, by finding for any prime number , a -adic packing of dijoins of value and of support size at most . We also prove that the all-ones vector belongs to the lattice generated by , where is the face of satisfying for every dicut with minimum size.
Keywords
Cite
@article{arxiv.2410.13665,
title = {Strongly connected orientations and integer lattices},
author = {Ahmad Abdi and Gérard Cornuéjols and Siyue Liu and Olha Silina},
journal= {arXiv preprint arXiv:2410.13665},
year = {2026}
}
Comments
34 pages, 7 figures