Rainbow paths and large rainbow matchings

Abstract

A conjecture of the first two authors is that n matchings of size n in any graph have a rainbow matching of size n-1. We prove a lower bound of 23n-1, improving on the trivial 12n, and an analogous result for hypergraphs. For \C3,C5\-free graphs and for disjoint matchings we obtain a lower bound of 3n4-O(1). We also discuss a conjecture on rainbow alternating paths, that if true would yield a lower bound of n-2n. We prove the non-alternating (ordinary paths) version of this conjecture.