Badges and rainbow matchings

Abstract

Drisko proved that 2n-1 matchings of size n in a bipartite graph have a rainbow matching of size n. For general graphs it is conjectured that 2n matchings suffice for this purpose (and that 2n-1 matchings suffice when n is even). The known graphs showing sharpness of this conjecture for n even are called badges. We improve the previously best known bound from 3n-2 to 3n-3, using a new line of proof that involves analysis of the appearance of badges. We also prove a "cooperative" generalization: for t>0 and n ≥ 3, any 3n-4+t sets of edges, the union of every t of which contains a matching of size n, have a rainbow matching of size n.