Induced Matchings in Graphs of Maximum Degree 4

Abstract

For a graph G, let s(G) be the induced matching number of G. We prove the sharp bound s(G)≥ n(G)9 for every graph G of maximum degree at most 4 and without isolated vertices that does not contain a certain blown up 5-cycle as a component. This result implies a consequence of the well known conjecture of Erdos and Nesetril, saying that the strong chromatic index s'(G) of a graph G is at most 54(G)2, because s(G)≥ m(G)s'(G) and n(G)≥ m(G)(G)2. Furthermore, it is shown that there is polynomial-time algorithm that computes induced matchings of size at least n(G)9.