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.

@article{DMGT_2013__33_4_268105,
     author = {Lutz Volkmann},
     title = {Bounds on the {Signed} {2-Independence} {Number} in {Graphs}},
     journal = {Discussiones Mathematicae Graph Theory},
     pages = {709},
     publisher = {mathdoc},
     volume = {33},
     number = {4},
     year = {2013},
     zbl = {1295.05182},
     language = {en},
     url = {https://geodesic-test.mathdoc.fr/item/DMGT_2013__33_4_268105/}
}

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Lutz Volkmann. Bounds on the Signed 2-Independence Number in Graphs. Discussiones Mathematicae Graph Theory, Tome 33 (2013) no. 4, p. 709. https://geodesic-test.mathdoc.fr/item/DMGT_2013__33_4_268105/