On a rainbow version of Dirac's theorem
Abstract
For a collection G=\G1,…, Gs\ of not necessarily distinct graphs on the same vertex set V, a graph H with vertices in V is a G-transversal if there exists a bijection φ:E(H)→ [s] such that e∈ E(Gφ(e)) for all e∈ E(H). We prove that for |V|=s≥ 3 and δ(Gi)≥ s/2 for each i∈ [s], there exists a G-transversal that is a Hamilton cycle. This confirms a conjecture of Aharoni. We also prove an analogous result for perfect matchings.
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