Overfullness of critical class 2 graphs with a small core degree

Abstract

Let G be a simple graph, and let n, (G) and ' (G) be the order, the maximum degree and the chromatic index of G, respectively. We call G overfull if |E(G)|/ n/2 > (G), and critical if '(H) < '(G) for every proper subgraph H of G. Clearly, if G is overfull then '(G) = (G)+1. The core of G, denoted by G, is the subgraph of G induced by all its maximum degree vertices. Hilton and Zhao conjectured that for any critical class 2 graph G with (G) 4, if the maximum degree of G is at most two, then G is overfull, which in turn gives (G) > n/2 +1. We show that for any critical class 2 graph G, if the minimum degree of G is at most two and (G) > n/2 +1, then G is overfull.