Ore's Theorem for rainbow Hamiltonian-connected graphs

Abstract

Let G = (G1, G2, …, Gm) be a collection of m graphs on a common vertex set V. For a graph H with vertices in V, we say that G contains a rainbow H if there is an injection c: E(H) [m] such that for every edge e ∈ E(H), we have e ∈ E(Gc(e)). In this paper, we show that if G = (G1, …, Gn) is a collection of graphs on n vertices such that for every i ∈ [n], dGi(u) + dGi(v) ≥ n whenever uv E(Gi), then either G contains rainbow Hamiltonian paths between every pair of vertices, or G contains a rainbow Hamiltonian cycle. Moreover, we prove a stronger version in which we may also embed prescribed rainbow linear forests into the Hamiltonian paths.

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