Double-critical graph conjecture for claw-free graphs
Abstract
A connected graph with chromatic number is double-critical if is -colorable for each edge . The complete graphs are the only known examples of double-critical graphs. A long-standing conjecture of Erd\H os and Lov\'asz from 1966, which is referred to as the Double-Critical Graph Conjecture, states that there are no other double-critical graphs. That is, if a graph with chromatic number is double-critical, then is the complete graph on vertices. This has been verified for , but remains open for . In this paper, we first prove that if is a non-complete, double-critical graph with chromatic number , then no vertex of degree is adjacent to a vertex of degree , , or in . We then use this result to show that the Double-Critical Graph Conjecture is true for double-critical graphs with chromatic number if is claw-free.
Cite
@article{arxiv.1610.00636,
title = {Double-critical graph conjecture for claw-free graphs},
author = {Martin Rolek and Zi-Xia Song},
journal= {arXiv preprint arXiv:1610.00636},
year = {2017}
}