English

4-Separations in Haj\'{o}s Graphs

Combinatorics 2020-04-28 v1

Abstract

As a natural extension of the Four Color Theorem, Haj\'{o}s conjectured that graphs containing no K5K_5-subdivision are 4-colorable. Any possible counterexample to this conjecture with minimum number of vertices is called a {\it Haj\'{o}s graph}. Previous results show that Haj\'{o}s graphs are 4-connected but not 5-connected. A kk-separation in a graph GG is a pair (G1,G2)(G_1,G_2) of edge-disjoint subgraphs of GG such that V(G1G2)=k|V(G_1\cap G_2)|=k, G=G1G2G=G_1\cup G_2, and Gi⊈G3iG_i\not\subseteq G_{3-i} for i=1,2i=1,2. In this paper, we show that Haj\'{o}s graphs do not admit a 4-separation (G1,G2)(G_1,G_2) such that V(G1)6|V(G_1)|\ge 6 and G1G_1 can be drawn in the plane with no edge crossings and all vertices in V(G1G2)V(G_1\cap G_2) incident with a common face. This is a step in our attempt to reduce Haj\'{o}s' conjecture to the Four Color Theorem.

Keywords

Cite

@article{arxiv.2004.12468,
  title  = {4-Separations in Haj\'{o}s Graphs},
  author = {Qiqin Xie and Shijie Xie and Xiaofan Yuan and Xingxing Yu},
  journal= {arXiv preprint arXiv:2004.12468},
  year   = {2020}
}

Comments

25 pages, 1 figure

R2 v1 2026-06-23T15:06:30.553Z