Let G be a graph of order n and X V(G). G is called X-cyclable if G has an X-cycle, i.e., a cycle containing all vertices of X. Define the parameters a(X) = max{|S| S is an independent vertex set in G[X] induced by X...Let G be a graph of order n and X V(G). G is called X-cyclable if G has an X-cycle, i.e., a cycle containing all vertices of X. Define the parameters a(X) = max{|S| S is an independent vertex set in G[X] induced by X}, σk(X) = min{∑ki=1dG(x.i| {x1, x1…, xk} is an independent vertex set in G[X]} and NCk(X) = min{|∪ki=1 NG(xi)| | {x1, x2…,xk} is an independent vertex set in G[X] }. Our main result is as follows: If G is a 1-tough graph and X V(G) with σ3(X)≥ n, then for every integer t ≥ 1, G has a cycle C containing at least min{|X|, (2|X| - n + 3δ + 1 - t), |X| + NCt(X) - a(X)} venices of X, where δ(X) = [σ3(X)]. This result further extends previous results in H.J. Broersma et al. in terms of X-cyclability. We also obtain that if G is a 1-tough graph with σ3 (X) ≥ n, then for every integer t ≥ 1, G has a cycle containing at least min{|X|, (4|X|- 2n+4δ(X) + 1 - 2t), NCt (X) +NCt (X)} vertices of X, where NCt (X) = min{|N(I) ∩X|| I is an independent set of t vertices of X}. Analogous results are established for 2-connected graphs.展开更多
For a vertex set{u<sub>1</sub>,u<sub>2</sub>,…,u<sub>k</sub>}of a graph G with n vertices,let s(G;{u<sub>1</sub>,u<sub>2</sub>,…,u<sub>k</sub>...For a vertex set{u<sub>1</sub>,u<sub>2</sub>,…,u<sub>k</sub>}of a graph G with n vertices,let s(G;{u<sub>1</sub>,u<sub>2</sub>,…,u<sub>k</sub>})=Σ<sub>1</sub>≤i≤j≤k<sup>|N(u<sub>i</sub>)UN(u<sub>j</sub>)|</sup>, NC<sub>k</sub>.=min{s(G;{x<sub>1</sub>,…,x<sub>k</sub>}):{x<sub>1</sub>,…,x<sub>k</sub>}is an independent set}. In this paper,we shall prove that if G is 3-connected and NC<sub>4</sub>≥3n,then G is either a hamiltonian or Petersen graph.This generalizes some results on the neighborhood union conditions for hamiltonian graphs.展开更多
基金the Natural Science Foundation of Yunnan Province.
文摘Let G be a graph of order n and X V(G). G is called X-cyclable if G has an X-cycle, i.e., a cycle containing all vertices of X. Define the parameters a(X) = max{|S| S is an independent vertex set in G[X] induced by X}, σk(X) = min{∑ki=1dG(x.i| {x1, x1…, xk} is an independent vertex set in G[X]} and NCk(X) = min{|∪ki=1 NG(xi)| | {x1, x2…,xk} is an independent vertex set in G[X] }. Our main result is as follows: If G is a 1-tough graph and X V(G) with σ3(X)≥ n, then for every integer t ≥ 1, G has a cycle C containing at least min{|X|, (2|X| - n + 3δ + 1 - t), |X| + NCt(X) - a(X)} venices of X, where δ(X) = [σ3(X)]. This result further extends previous results in H.J. Broersma et al. in terms of X-cyclability. We also obtain that if G is a 1-tough graph with σ3 (X) ≥ n, then for every integer t ≥ 1, G has a cycle containing at least min{|X|, (4|X|- 2n+4δ(X) + 1 - 2t), NCt (X) +NCt (X)} vertices of X, where NCt (X) = min{|N(I) ∩X|| I is an independent set of t vertices of X}. Analogous results are established for 2-connected graphs.
基金Supported by the National Natural Science Foundation of ChinaSupported also by the Post-doctoral Foundation of China
文摘For a vertex set{u<sub>1</sub>,u<sub>2</sub>,…,u<sub>k</sub>}of a graph G with n vertices,let s(G;{u<sub>1</sub>,u<sub>2</sub>,…,u<sub>k</sub>})=Σ<sub>1</sub>≤i≤j≤k<sup>|N(u<sub>i</sub>)UN(u<sub>j</sub>)|</sup>, NC<sub>k</sub>.=min{s(G;{x<sub>1</sub>,…,x<sub>k</sub>}):{x<sub>1</sub>,…,x<sub>k</sub>}is an independent set}. In this paper,we shall prove that if G is 3-connected and NC<sub>4</sub>≥3n,then G is either a hamiltonian or Petersen graph.This generalizes some results on the neighborhood union conditions for hamiltonian graphs.
