Maximal induced matchings in triangle-free graphs

Abstract

An induced matching in a graph is a set of edges whose endpoints induce a 1-regular subgraph. It is known that any n-vertex graph has at most 10n/5 ≈ 1.5849n maximal induced matchings, and this bound is best possible. We prove that any n-vertex triangle-free graph has at most 3n/3 ≈ 1.4423n maximal induced matchings, and this bound is attained by any disjoint union of copies of the complete bipartite graph K3,3. Our result implies that all maximal induced matchings in an n-vertex triangle-free graph can be listed in time O(1.4423n), yielding the fastest known algorithm for finding a maximum induced matching in a triangle-free graph.