-critical graphs with a vertex of degree 2

Abstract

Let G be a simple graph with maximum degree . A classic result of Vizing shows that '(G), the chromatic index of G, is either or +1. We say G is of Class 1 if '(G)=, and is of Class 2 otherwise. A graph G is -critical if '(G)=+1 and '(H)<+1 for every proper subgraph H of G, and is overfull if |E(G)|> (|V(G)|-1)/2 . Clearly, overfull graphs are Class 2. Hilton and Zhao in 1997 conjectured that if G is obtained from an n-vertex -regular Class 1 graph with maximum degree greater than n/3 by splitting a vertex, then being overfull is the only reason for G to be Class 2. This conjecture was only confirmed when n2(7-1)≈ 0.82n. In this paper, we improve the bound on from n2(7-1) to 0.75n. Considering the structure of -critical graphs with a vertex of degree 2, we also show that for an n-vertex -critical graph with 3n4, if it contains a vertex of degree 2, then it is overfull. We actually obtain a more general form of this result, which partially supports the overfull conjecture of Chetwynd and Hilton from 1986, which states that if G is an n-vertex -critical graph with >n/3, then G contains an overfull subgraph H with (H)=. Our proof techniques are new and might shed some light on attacking both of the conjectures when is large.