Exploring the world of edge-chromatic 3-critical graphs

Abstract

A graph G with maximum degree Δ is Δ-critical if it is connected, satisfies χ'(G)=Δ+1, and the deletion of any edge reduces its chromatic index to Δ. A Δ-critical graph G is called nontrivial if it contains no Δ-overfull subgraph; that is, no H ⊂eq G such that |E(H)| > Δ |V(H)| /2 . There are no 1-critical graphs, and the 2-critical graphs are exactly the odd cycles. By work of Chetwynd and Yap from 1983, there is a unique nontrivial 3-critical graph of order 9, and exactly two nontrivial 3-critical graphs of order 11. In 2005, Bokal, Brinkmann, and Grünewald showed that there are exactly fourteen nontrivial 3-critical graphs of order 13. For even orders, Brinkmann and Steffen proved in 1997 that no 3-critical graphs of even order exist below order 22, there is exactly one 3-critical graph of order 22, and that there are exactly nine 3-critical graphs of order 24. To the best of our knowledge, there has been no further progress on the existence of nontrivial 3-critical graphs of odd orders beyond the cases established two decades ago. In this paper, using computer-assisted search techniques, we determine the exact numbers of nontrivial 3-critical graphs of odd orders from 15 to 21. The same data pipeline also reproduces the known order-22 count of Brinkmann and Steffen, with one nontrivial 3-critical graph. Beyond enumeration, we prove a characterization theorem for all nontrivial 3-critical graphs, with one case based on snarks. We also provide an analysis of our search algorithm.