On k-ordered Hamiltonian Graphs
Abstract
A Hamiltonian graph G of order n is k-ordered, 2≤ k ≤ n, if for every sequence v1, v2, … ,vk of k distinct vertices of G, there exists a Hamiltonian cycle that encounters v1, v2, … , vk in this order. In this paper, answering a question of Ng and Schultz, we give a sharp bound for the minimum degree guaranteeing that a graph is a k-ordered Hamiltonian graph under some mild restrictions. More precisely, we show that there are , n0> 0 such that if G is a graph of order n≥ n0 with minimum degree at least n2 + k2 - 1 and 2≤ k ≤ n, then G is a k-ordered Hamiltonian graph. It is also shown that this bound is sharp for every 2≤ k ≤ n2 .
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