In 1980 Bondy [2] proved that a (k+s)-connected graph of order n ≥ 3 is traceable (s = −1) or Hamiltonian (s = 0) or Hamiltonian-connected (s = 1) if the degree sum of every set of k+1 pairwise nonadjacent vertices is at least ((k+1)(n+s−1)+1)/2. It is shown in [1] that one can allow exceptional (k+ 1)-sets violating this condition and still implying the considered Hamiltonian property. In this note we generalize this result for s = −1 and s = 0 and graphs that fulfill a certain connectivity condition
AbstractIn 2005, Rahman and Kaykobad introduced the Rahman-Kaykobad condition for the research of Ha...
The Chvátal-Erdős theorems imply that if G is a graph of order n ≥ 3 with κ(G) ≥ α(G), then G is ha...
Clark proved that L(G) is hamiltonian if G is a connected graph of order n ≥ 6 such that deg u + deg...
设 G是一个n阶k连通图(k 2). 于1980年 J. A. Bondy证明: 若σk+1 > (k+1) (n-1) / 2, 则G是Hamilton图.本文证明对于坚韧图G, 若σk+1 ...
AbstractIn 1980, Bondy proved that for an integer k≥2 a (k+s)-connected graph of order n≥3 is tracea...
AbstractIn 1960 Ore proved the following theorem: Let G be a graph of order n. If d(u)+d(v)⩾n for ev...
We show that in any graph G on n vertices with d(x) + d(y) ≥ n for any two nonadjacent vertices x a...
AbstractWe prove that a k-connected graph (k⩾2) is Hamiltonian if it is not contractible to one of a...
We prove that a k-connected graph (k>2) is Hamiltonian if it is not contractible to one of a specifi...
AbstractIn 1980, Bondy generalized known Ore’s theorem by proving that a k-connected graph of order ...
AbstractLet G be a graph, and δ(G) and α(G) be the minimum degree and the independence number of G, ...
Let G be a simple graph of order n >= 3. Ore's classical theorem states that if d(x) + d(y) ...
AbstractLet G be a k-connected (k ⩾ 2) graph on n vertices. Let S be an independent set of G. S is c...
AbstractIn this paper, we derive some results giving sufficient conditions for a graph G containing ...
AbstractLet G be a simple k-connected graph of order ν ≥ 3 with minimum degree δ and independence nu...
AbstractIn 2005, Rahman and Kaykobad introduced the Rahman-Kaykobad condition for the research of Ha...
The Chvátal-Erdős theorems imply that if G is a graph of order n ≥ 3 with κ(G) ≥ α(G), then G is ha...
Clark proved that L(G) is hamiltonian if G is a connected graph of order n ≥ 6 such that deg u + deg...
设 G是一个n阶k连通图(k 2). 于1980年 J. A. Bondy证明: 若σk+1 > (k+1) (n-1) / 2, 则G是Hamilton图.本文证明对于坚韧图G, 若σk+1 ...
AbstractIn 1980, Bondy proved that for an integer k≥2 a (k+s)-connected graph of order n≥3 is tracea...
AbstractIn 1960 Ore proved the following theorem: Let G be a graph of order n. If d(u)+d(v)⩾n for ev...
We show that in any graph G on n vertices with d(x) + d(y) ≥ n for any two nonadjacent vertices x a...
AbstractWe prove that a k-connected graph (k⩾2) is Hamiltonian if it is not contractible to one of a...
We prove that a k-connected graph (k>2) is Hamiltonian if it is not contractible to one of a specifi...
AbstractIn 1980, Bondy generalized known Ore’s theorem by proving that a k-connected graph of order ...
AbstractLet G be a graph, and δ(G) and α(G) be the minimum degree and the independence number of G, ...
Let G be a simple graph of order n >= 3. Ore's classical theorem states that if d(x) + d(y) ...
AbstractLet G be a k-connected (k ⩾ 2) graph on n vertices. Let S be an independent set of G. S is c...
AbstractIn this paper, we derive some results giving sufficient conditions for a graph G containing ...
AbstractLet G be a simple k-connected graph of order ν ≥ 3 with minimum degree δ and independence nu...
AbstractIn 2005, Rahman and Kaykobad introduced the Rahman-Kaykobad condition for the research of Ha...
The Chvátal-Erdős theorems imply that if G is a graph of order n ≥ 3 with κ(G) ≥ α(G), then G is ha...
Clark proved that L(G) is hamiltonian if G is a connected graph of order n ≥ 6 such that deg u + deg...