This paper gives new sufficient conditions for a connected graph to be Hamiltonian and Hamiltonian connected by independence number and neighbourhood intersections of three independent vertices with distance 2.
Let G be a 3-connected graph with n vertices. The paper proves that if for each pair of vertices u and v of G, d(u,v)=2, has |N(u)∩N(v)|≤α(α is the minimum independent set number), and then max{d(u),d(v)}≥n+12,...Let G be a 3-connected graph with n vertices. The paper proves that if for each pair of vertices u and v of G, d(u,v)=2, has |N(u)∩N(v)|≤α(α is the minimum independent set number), and then max{d(u),d(v)}≥n+12, then G is a Hamilton connected graph.展开更多
文摘This paper gives new sufficient conditions for a connected graph to be Hamiltonian and Hamiltonian connected by independence number and neighbourhood intersections of three independent vertices with distance 2.
文摘Let G be a 3-connected graph with n vertices. The paper proves that if for each pair of vertices u and v of G, d(u,v)=2, has |N(u)∩N(v)|≤α(α is the minimum independent set number), and then max{d(u),d(v)}≥n+12, then G is a Hamilton connected graph.
