English

Colored graphs without colorful cycles

Combinatorics 2015-09-21 v1

Abstract

A colored graph is a complete graph in which a color has been assigned to each edge, and a colorful cycle is a cycle in which each edge has a different color. We first show that a colored graph lacks colorful cycles iff it is Gallai, i.e., lacks colorful triangles. We then show that, under the operation mnm+n2m\circ n\equiv m+n-2, the omitted lengths of colorful cycles in a colored graph form a monoid isomorphic to a submonoid of the natural numbers which contains all integers past some point. We prove that several but not all such monoids are realized. We then characterize exact Gallai graphs, i.e., graphs in which every triangle has edges of exactly two colors. We show that these are precisely the graphs which can be iteratively built up from three simple colored graphs, having 22, 44, and 55 vertices, respectively. We then characterize in two different ways the monochromes, i.e., the connected components of maximal monochromatic subgraphs, of exact Gallai graphs. The first characterization is in terms of their reduced form, a notion which hinges on the important idea of a full homomorphism. The second characterization is by means of a homomorphism duality.

Keywords

Cite

@article{arxiv.1509.05621,
  title  = {Colored graphs without colorful cycles},
  author = {Richard N. Ball and Aleš Pultr and Petr Vojtěchovský},
  journal= {arXiv preprint arXiv:1509.05621},
  year   = {2015}
}
R2 v1 2026-06-22T10:59:48.993Z