2010 Mathematics Subject Classification: 05C38, 05C45.In 1952, Dirac introduced the degree type condition and proved that if G is a connected graph of order n і 3 such that its minimum degree satisfies d(G) і n/2, then G is Hamiltonian. In this paper we investigate a further condition and prove that if G is a connected graph of order n і 3 such that d(G) і (n-2)/2, then G is Hamiltonian or G belongs to four classes of well-structured exceptional graphs
AbstractFor a nontrivial connected graph G, its Harary index H(G) is defined as ∑{u,v}⊆V(G)1dG(u,v),...
AbstractD. Bauer, H. J. Broersma, R. Li, and H. J. Veldman proved that ifGis a 2-connected graph wit...
Abstract Using the energy of graphs, we present sufficient conditions for some Hamiltonian propertie...
AbstractFor a simple graph G, let NCD(G)=min{|N(u)∪N(v)|+d(w):u,v,w∈V(G),uv⁄∈E(G),wvorwu⁄∈E(G)}. In ...
AbstractIn 1960 Ore proved the following theorem: Let G be a graph of order n. If d(u)+d(v)⩾n for ev...
AbstractIn 2005, Rahman and Kaykobad introduced the Rahman-Kaykobad condition for the research of Ha...
AbstractAssume that n and δ are positive integers with 3≤δ<n. Let hc(n,δ) be the minimum number of e...
In this paper we prove that if G is a (k + 2)-connected graph on n > 3 vertices satisfying P(n + ...
AbstractLet G be a 2-connected graph with n vertices such that d(u)+d(v)+d(w)-|N(u)∩N(v)∩N(w)| ⩾n + ...
AbstractLet G=(V,E) be a 2-connected simple graph and let dG(u,v) denote the distance between two ve...
AbstractWe prove a conjecture of Horak that can be thought of as an extension of classical results i...
AbstractTheorems on the localization of the conditions of G. A. Dirac (Proc. London Math. Soc. (3), ...
AbstractA graph G of order p ⩾ 3 is called n-hamiltonian, 0 ⩽ n ⩽ p − 3, if the removal of any m ver...
AbstractA graph G on n vertices is called a Dirac graph if it has a minimum degree of at least n/2. ...
AbstractSince finding whether a graph has a Hamiltonian path or Hamiltonian cycle are both NP-comple...
AbstractFor a nontrivial connected graph G, its Harary index H(G) is defined as ∑{u,v}⊆V(G)1dG(u,v),...
AbstractD. Bauer, H. J. Broersma, R. Li, and H. J. Veldman proved that ifGis a 2-connected graph wit...
Abstract Using the energy of graphs, we present sufficient conditions for some Hamiltonian propertie...
AbstractFor a simple graph G, let NCD(G)=min{|N(u)∪N(v)|+d(w):u,v,w∈V(G),uv⁄∈E(G),wvorwu⁄∈E(G)}. In ...
AbstractIn 1960 Ore proved the following theorem: Let G be a graph of order n. If d(u)+d(v)⩾n for ev...
AbstractIn 2005, Rahman and Kaykobad introduced the Rahman-Kaykobad condition for the research of Ha...
AbstractAssume that n and δ are positive integers with 3≤δ<n. Let hc(n,δ) be the minimum number of e...
In this paper we prove that if G is a (k + 2)-connected graph on n > 3 vertices satisfying P(n + ...
AbstractLet G be a 2-connected graph with n vertices such that d(u)+d(v)+d(w)-|N(u)∩N(v)∩N(w)| ⩾n + ...
AbstractLet G=(V,E) be a 2-connected simple graph and let dG(u,v) denote the distance between two ve...
AbstractWe prove a conjecture of Horak that can be thought of as an extension of classical results i...
AbstractTheorems on the localization of the conditions of G. A. Dirac (Proc. London Math. Soc. (3), ...
AbstractA graph G of order p ⩾ 3 is called n-hamiltonian, 0 ⩽ n ⩽ p − 3, if the removal of any m ver...
AbstractA graph G on n vertices is called a Dirac graph if it has a minimum degree of at least n/2. ...
AbstractSince finding whether a graph has a Hamiltonian path or Hamiltonian cycle are both NP-comple...
AbstractFor a nontrivial connected graph G, its Harary index H(G) is defined as ∑{u,v}⊆V(G)1dG(u,v),...
AbstractD. Bauer, H. J. Broersma, R. Li, and H. J. Veldman proved that ifGis a 2-connected graph wit...
Abstract Using the energy of graphs, we present sufficient conditions for some Hamiltonian propertie...
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