Ore's Theorem for rainbow Hamiltonian-connected graphs

Yupei Li; Ruth Luo

Paper

Ore's Theorem for rainbow Hamiltonian-connected graphs

Abstract

Let

be a collection of

graphs on a common vertex set

. For a graph

with vertices in

, we say that

contains a rainbow

if there is an injection

such that for every edge

, we have

. In this paper, we show that if

is a collection of graphs on

vertices such that for every

whenever

, then either

contains rainbow Hamiltonian paths between every pair of vertices, or

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.