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Bounds on the Signed 2-Independence Number in Graphs

100%
Volkmann L.
Discussiones Mathematicae Graph Theory
|
2013
|
tom 33
|
nr 4
709-715
EN
Let G be a finite and simple graph with vertex set V (G), and let f V (G) → {−1, 1} be a two-valued function. If ∑x∈N|v| f(x) ≤ 1 for each v ∈ V (G), where N[v] is the closed neighborhood of v, then f is a signed 2-independence function on G. The weight of a signed 2-independence function f is w(f) =∑v∈V (G) f(v). The maximum of weights w(f), taken over all signed 2-independence functions f on G, is the signed 2-independence number α2s(G) of G. In this work, we mainly present upper bounds on α2s(G), as for example α2s(G) ≤ n−2 [∆ (G)/2], and we prove the Nordhaus-Gaddum type inequality α2s (G) + α2s(G) ≤ n+1, where n is the order and ∆ (G) is the maximum degree of the graph G. Some of our theorems improve well-known results on the signed 2-independence number.
2
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On double domination in graphs

100%
Harant J., Henning M.
Discussiones Mathematicae Graph Theory
|
2005
|
tom 25
|
nr 1-2
29-34
EN
In a graph G, a vertex dominates itself and its neighbors. A subset S ⊆ V(G) is a double dominating set of G if S dominates every vertex of G at least twice. The minimum cardinality of a double dominating set of G is the double domination number $γ_{×2}(G)$. A function f(p) is defined, and it is shown that $γ_{×2}(G) = min f(p)$, where the minimum is taken over the n-dimensional cube $Cⁿ = {p = (p₁,...,pₙ) | p_i ∈ IR, 0 ≤ p_i ≤ 1,i = 1,...,n}$. Using this result, it is then shown that if G has order n with minimum degree δ and average degree d, then $γ_{×2}(G) ≤ ((ln(1+d) + lnδ + 1)/δ)n$.
3
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Graphs with large double domination numbers

100%
Henning M.
Discussiones Mathematicae Graph Theory
|
2005
|
tom 25
|
nr 1-2
13-28
EN
In a graph G, a vertex dominates itself and its neighbors. A subset S ⊆ V(G) is a double dominating set of G if S dominates every vertex of G at least twice. The minimum cardinality of a double dominating set of G is the double domination number $γ_{×2}(G)$. If G ≠ C₅ is a connected graph of order n with minimum degree at least 2, then we show that $γ_{×2}(G) ≤ 3n/4$ and we characterize those graphs achieving equality.
4
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Domination and leaf density in graphs

88%
Pedersen A.
Discussiones Mathematicae Graph Theory
|
2005
|
tom 25
|
nr 3
251-259
EN
The domination number γ(G) of a graph G is the minimum cardinality of a subset D of V(G) with the property that each vertex of V(G)-D is adjacent to at least one vertex of D. For a graph G with n vertices we define ε(G) to be the number of leaves in G minus the number of stems in G, and we define the leaf density ζ(G) to equal ε(G)/n. We prove that for any graph G with no isolated vertex, γ(G) ≤ n(1- ζ(G))/2 and we characterize the extremal graphs for this bound. Similar results are obtained for the total domination number and the partition domination number.
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