Pseudo-multifan and Lollipop

Abstract

A simple graph G with maximum degree is overfull if |E(G)|> |V(G)|/2. The core of G, denoted G, is the subgraph of G induced by its vertices of degree . Clearly, the chromatic index of G equals +1 if G is overfull. Conversely, Hilton and Zhao in 1996 conjectured that if G is a simple connected graph with 3 and (G) 2, then '(G)=+1 implies that G is overfull or G=P*, where P* is obtained from the Petersen graph by deleting a vertex (Core Conjecture). The goal of this paper is to develop the concepts of ``pseudo-multifan'' and ``lollipop'' and study their properties in an edge colored graph. These concepts turn out to be powerful tools in edge coloring graphs with a small core degree.