The H-force sets of the graphs satisfying the condition of Ore's theorem

Abstract

Let G be a Hamiltonian graph with n vertices. A nonempty vertex set X⊂eq V(G) is called a Hamiltonian cycle enforcing set (in short, an H-force set) of G if every X-cycle of G (i.e., a cycle of G containing all vertices of X) is a Hamiltonian cycle. For the graph G, h(G) is the smallest cardinality of an H-force set of G and call it the H-force number of G. Ore's theorem states that the graph G is Hamiltonian if d(u)+d(v)≥ n for every pair of nonadjacent vertices u,v of G. In this paper, we study the H-force sets of the graphs satisfying the condition of Ore's theorem, show that the H-force number of these graphs is possibly n, or n-2, or n2 and give a classification of these graphs due to the H-force number.