Maximum -edge-colorable subgraphs of class II graphs

Abstract

A graph G is class II, if its chromatic index is at least +1. Let H be a maximum -edge-colorable subgraph of G. The paper proves best possible lower bounds for |E(H)||E(G)|, and structural properties of maximum -edge-colorable subgraphs. It is shown that every set of vertex-disjoint cycles of a class II graph with ≥3 can be extended to a maximum -edge-colorable subgraph. Simple graphs have a maximum -edge-colorable subgraph such that the complement is a matching. Furthermore, a maximum -edge-colorable subgraph of a simple graph is always class I.