English

Directed hypergraph connectivity augmentation by hyperarc reorientations

Combinatorics 2023-05-01 v1 Discrete Mathematics

Abstract

The orientation theorem of Nash-Williams states that an undirected graph admits a kk-arc-connected orientation if and only if it is 2k2k-edge-connected. Recently, Ito et al. showed that any orientation of an undirected 2k2k-edge-connected graph can be transformed into a kk-arc-connected orientation by reorienting one arc at a time without decreasing the arc-connectivity at any step, thus providing an algorithmic proof of Nash-Williams' theorem. We generalize their result to hypergraphs and therefore provide an algorithmic proof of the characterization of hypergraphs with a kk-hyperarc-connected orientation originally given by Frank et al. We prove that any orientation of an undirected (k,k)(k,k)-partition-connected hypergraph can be transformed into a kk-hyperarc-connected orientation by reorienting one hyperarc at a time without decreasing the hyperarc-connectivity in any step. Furthermore, we provide a simple combinatorial algorithm for computing such a transformation in polynomial time.

Keywords

Cite

@article{arxiv.2304.14868,
  title  = {Directed hypergraph connectivity augmentation by hyperarc reorientations},
  author = {Moritz Mühlenthaler and Benjamin Peyrille and Zoltán Szigeti},
  journal= {arXiv preprint arXiv:2304.14868},
  year   = {2023}
}

Comments

18 pages, 3 figures, 3 algorithms

R2 v1 2026-06-28T10:20:47.462Z