Hamilton transversals in tournaments

Abstract

It is well-known that every tournament contains a Hamilton path, and every strongly connected tournament contains a Hamilton cycle. This paper establishes transversal generalizations of these classical results. For a collection T=\T1,…,Tm\ of not-necessarily distinct tournaments on a common vertex set V, an m-edge directed graph D with vertices in V is called a T-transversal if there exists a bijection φ E(D) [m] such that e∈ E(Tφ(e)) for all e∈ E(D). We prove that for sufficiently large m with m=|V|-1, there exists a T-transversal Hamilton path. Moreover, if m=|V| and at least m-1 of the tournaments T1,…,Tm are assumed to be strongly connected, then there is a T-transversal Hamilton cycle. In our proof, we utilize a novel way of partitioning tournaments which we dub H-partition.