Haj\'os and Ore constructions for digraphs
Abstract
The chromatic number of a digraph is the minimum number of colors needed to color the vertices of such that each color class induces an acyclic subdigraph of . A digraph is -critical if but for all proper subdigraphs of . We examine methods for creating infinite families of critical digraphs, the Dirac join and the directed and bidirected Haj\'os join. We prove that a digraph has chromatic number at least if and only if it contains a subdigraph that can be obtained from bidirected complete graphs on vertices by (directed) Haj\'os joins and identifying non-adjacent vertices. Building upon that, we show that a digraph has chromatic number at least if and only if it can be constructed from bidirected 's by using directed and bidirected Haj\'os joins and identifying non-adjacent vertices (so called Ore joins), thereby transferring a well-known result of Urquhart to digraphs. Finally, we prove a Gallai-type theorem that characterizes the structure of the low vertex subdigraph of a critical digraph, that is, the subdigraph, which is induced by the vertices that have in-degree and out-degree in .
Keywords
Cite
@article{arxiv.1908.04096,
title = {Haj\'os and Ore constructions for digraphs},
author = {Jørgen Bang-Jensen and Thomas Bellitto and Michael Stiebitz and Thomas Schweser},
journal= {arXiv preprint arXiv:1908.04096},
year = {2019}
}