AbstractThe vertex connectivity of a graph G is denoted by κ(G) and the minimum degree of G is denoted by δ(G). A finite simple graph G is said to be critically (k, k)-connected if κ(G) = κ(G) = k and for each vertex ν of G κ(G − ν) = k − 1 or κ(G − ν) = k −1, where G is the complement of G. The following result is proved: If G is acritically (k, k)-connected graphs, k ⩾ 2, δ(G) ⩾ 12(3k − 1) and δ(G) ⩾ 12(3k − 1), then |V(G)|⩽4k. Furthermore, these bounds are sharp for k ⩾ 3
A subset S of V (G) is an independent dominating set of G if S is independent and each vertex of G i...
AbstractWe prove that Kχ(G) is the only vertex critical graph G with χ(G)⩾Δ(G)⩾6 and ω(H(G))⩽⌊Δ(G)2⌋...
AbstractIt is proven that every critically n-edge-connected finite graph G contains a vertex of degr...
AbstractThe vertex connectivity of a graph G is denoted by κ(G) and the minimum degree of G is denot...
AbstractA graph G which is n-connected (but not (n + 1)-connected)is defined to be k-critical if for...
A graph G is said to be k- γc-critical if the connected domination number of G, γc(G), is k and γc(G...
AbstractThe old well-known result of Chartrand, Kaugars and Lick says that every k-connected graph G...
A graph G is said to be k-γt -critical if the total domination number γt(G)= k and γt (G + uv) < k f...
AbstractA graph is called γ-critical if the removal of any vertex from the graph decreases the domin...
AbstractWe prove that every n-connected graph G of sufficiently large order contains a connected gra...
AbstractChartrand, Kaugars and Lick proved that every critically h-connected graph contains a vertex...
A graph G is said to be k-γc-critical if the connected domination number γc(G) is equal to k and γc(...
AbstractA dominating set in a graph G is a connected dominating set of G if it induces a connected s...
A vertex subset D of G is a dominating set of G if every vertex in V(G)-D is adjacent to a vertex in...
AbstractFor k⩾0, ϱk(G) denotes the Lick-White vertex partition number of G. A graph G is called (n, ...
A subset S of V (G) is an independent dominating set of G if S is independent and each vertex of G i...
AbstractWe prove that Kχ(G) is the only vertex critical graph G with χ(G)⩾Δ(G)⩾6 and ω(H(G))⩽⌊Δ(G)2⌋...
AbstractIt is proven that every critically n-edge-connected finite graph G contains a vertex of degr...
AbstractThe vertex connectivity of a graph G is denoted by κ(G) and the minimum degree of G is denot...
AbstractA graph G which is n-connected (but not (n + 1)-connected)is defined to be k-critical if for...
A graph G is said to be k- γc-critical if the connected domination number of G, γc(G), is k and γc(G...
AbstractThe old well-known result of Chartrand, Kaugars and Lick says that every k-connected graph G...
A graph G is said to be k-γt -critical if the total domination number γt(G)= k and γt (G + uv) < k f...
AbstractA graph is called γ-critical if the removal of any vertex from the graph decreases the domin...
AbstractWe prove that every n-connected graph G of sufficiently large order contains a connected gra...
AbstractChartrand, Kaugars and Lick proved that every critically h-connected graph contains a vertex...
A graph G is said to be k-γc-critical if the connected domination number γc(G) is equal to k and γc(...
AbstractA dominating set in a graph G is a connected dominating set of G if it induces a connected s...
A vertex subset D of G is a dominating set of G if every vertex in V(G)-D is adjacent to a vertex in...
AbstractFor k⩾0, ϱk(G) denotes the Lick-White vertex partition number of G. A graph G is called (n, ...
A subset S of V (G) is an independent dominating set of G if S is independent and each vertex of G i...
AbstractWe prove that Kχ(G) is the only vertex critical graph G with χ(G)⩾Δ(G)⩾6 and ω(H(G))⩽⌊Δ(G)2⌋...
AbstractIt is proven that every critically n-edge-connected finite graph G contains a vertex of degr...
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