Constructing graphs with no immersion of large complete graphs
Abstract
In 1989, Lescure and Meyniel proved, for , that every -chromatic graph contains an immersion of , and in 2003 Abu-Khzam and Langston conjectured that this holds for all . In 2010, DeVos, Kawarabayashi, Mohar, and Okamura proved this conjecture for . In each proof, the -chromatic assumption was not fully utilized, as the proofs only use the fact that a -critical graph has minimum degree at least . DeVos, Dvo\v{r}\'ak, Fox, McDonald, Mohar, and Scheide show the stronger conjecture that a graph with minimum degree has an immersion of fails for and with a finite number of examples for each value of , and small chromatic number relative to , but it is shown that a minimum degree of does guarantee an immersion of . In this paper we show that the stronger conjecture is false for and give infinite families of examples with minimum degree and chromatic number or that do not contain an immersion of . Our examples can be up to -edge-connected. We show, using Haj\'os' Construction, that there is an infinite class of non--colorable graphs that contain an immersion of . We conclude with some open questions, and the conjecture that a graph with minimum degree and more than vertices of degree at least has an immersion of .
Cite
@article{arxiv.1206.1545,
title = {Constructing graphs with no immersion of large complete graphs},
author = {Karen L. Collins and Megan E. Heenehan},
journal= {arXiv preprint arXiv:1206.1545},
year = {2012}
}