A Coloring Algorithm for 4K1-free line graphs

Abstract

Let L be a set of graphs. Free(L) is the set of graphs that do not contain any graph in L as an induced subgraph. It is known that if L is a set of four-vertex graphs, then the complexity of the coloring problem for Free(L) is known with three exceptions: L = claw, 4K1, L = claw, 4K1, co-diamond, and L = C4, 4K1. In this paper, we study the coloring problem for Free(claw, 4K1). We solve the coloring problem for a subclass of Free(claw, 4K1) which contains the class of 4K1-free line graphs. Our result implies the chromatic index of a graph with no matching of size four can be computed in polynomial time.