English

Solving Graph Coloring Problems with Abstraction and Symmetry

Artificial Intelligence 2015-03-27 v3 Discrete Mathematics

Abstract

This paper introduces a general methodology, based on abstraction and symmetry, that applies to solve hard graph edge-coloring problems and demonstrates its use to provide further evidence that the Ramsey number R(4,3,3)=30R(4,3,3)=30. The number R(4,3,3)R(4,3,3) is often presented as the unknown Ramsey number with the best chances of being found "soon". Yet, its precise value has remained unknown for more than 50 years. We illustrate our approach by showing that: (1) there are precisely 78{,}892 (3,3,3;13)(3,3,3;13) Ramsey colorings; and (2) if there exists a (4,3,3;30)(4,3,3;30) Ramsey coloring then it is (13,8,8) regular. Specifically each node has 13 edges in the first color, 8 in the second, and 8 in the third. We conjecture that these two results will help provide a proof that no (4,3,3;30)(4,3,3;30) Ramsey coloring exists implying that R(4,3,3)=30R(4,3,3)=30.

Keywords

Cite

@article{arxiv.1409.5189,
  title  = {Solving Graph Coloring Problems with Abstraction and Symmetry},
  author = {Michael Codish and Michael Frank and Avraham Itzhakov and Alice Miller},
  journal= {arXiv preprint arXiv:1409.5189},
  year   = {2015}
}
R2 v1 2026-06-22T05:59:24.610Z