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Let G be an (m+2)-graph on n vertices, and F be a linear forest in G with |E(F)|=m and ω1(F)=s, where ω1(F) is the number of components of order one in F. We denote by σ3(G) the minimum value of the degree sum of three vertices which are pairwise non-adjacent. In this paper, we give several σ3 conditions for a dominating cycle or a hamiltonian cycle passing through a linear forest. We first prove...
Let G be a graph and S ⊂ V(G). We denote by α(S) the maximum number of pairwise nonadjacent vertices in S. For x, y ∈ V(G), the local connectivity κ(x, y) is defined to be the maximum number of internally-disjoint paths connecting x and y in G. We define $$\kappa(S)=\min\{\kappa(x,y) : x,y \in S,x\not=y\}$$ . In this paper, we show that if κ(S) ≥ 3 and $$\sum_{i=1}^4 d_{G}{(x_i)} \ge |V(G)|+\kappa(S)+\alpha...
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