Average degrees of edge-chromatic critical graphs

TL;DR

This paper improves the lower bound on the average degree of edge-$ riangle$-critical graphs for large maximum degree, surpassing previous bounds, by employing advanced recoloring techniques of Tashkinov trees to extend Vizing's methods.

Contribution

The authors establish new lower bounds on the average degree of edge-$ riangle$-critical graphs for $ riangle o ext{large}$, surpassing prior results by utilizing Tashkinov trees.

Findings

Improved bounds for $ar{d}$ when $ riangle o ext{large}$

Demonstrated limitations of previous techniques with constructed examples

Extended Vizing's adjacency lemma using Tashkinov trees

Abstract

Given a graph $G$, denote by $\Delta$, $\bar{d}$ and $\chi^\prime$ the maximum degree, the average degree and the chromatic index of $G$, respectively. A simple graph $G$ is called {\it edge-$\Delta$-critical} if $\chi^\prime(G)=\Delta+1$ and $\chi^\prime(H)\le\Delta$ for every proper subgraph $H$ of $G$. Vizing in 1968 conjectured that if $G$ is edge-$\Delta$-critical, then $\bar{d}\geq \Delta-1+ \frac{3}{n}$. We show that $$ \begin{displaystyle} \avd \ge \begin{cases} 0.69241\D-0.15658 \quad\,\: \mbox{ if } \Delta\geq 66, 0.69392\D-0.20642\quad\;\,\mbox{ if } \Delta=65, \mbox{ and } 0.68706\D+0.19815\quad\! \quad\mbox{if } 56\leq \Delta\leq64. \end{cases} \end{displaystyle} $$ This result improves the best known bound $\frac{2}{3}(\Delta +2)$ obtained by Woodall in 2007 for $\Delta \geq 56$. Additionally, Woodall constructed an infinite family of graphs showing his result cannot be improved by well-known Vizing's Adjacency Lemma and other known edge-coloring techniques. To over come the barrier, we follow the recently developed recoloring technique of Tashkinov trees to expand Vizing fans technique to a larger class of trees.