Gina A. Malacas scite author profile

A set S âŠ† V(G) of a (simple) undirected graph G is a locating-dominating set of G if for each v âˆˆ V(G) \ S, there exists w âˆˆ S such tha vw âˆˆ E(G) and NG(x) âˆ© S= NG(y)âˆ©S for any distinct vertices x and y in V(G) \ S. S is a stable locating-dominating set of G if it is a locating-dominating set of G and S \ {v} is a locating-dominating set of G for each v âˆˆ S. The minimum cardinality of a stable locating-dominating set of G, denoted by Î³sl(G), is called the stable locating-domination number of G. In this paper, we investigate this concept and the corresponding parameter for some graphs. Further, we introduce other related concepts and use them to characterize the stable locating-dominating sets in some graphs.

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ON k-COST EFFECTIVE DOMINATION NUMBER, COST EFFECTIVE DOMINATION INDEX AND MAXIMAL COST EFFECTIVE DOMINATION NUMBER OF SIMPLE GRAPHS

Palco¹,

Paluga²,

Malacas³

2019

FJMS

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Stable Locating-Dominating Sets in the Edge Corona and Lexicographic Product of Graphs

Malacas

Canoy²,

Chacon³

2023

Eur. J. Pure Appl. Math.

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A set S ⊆ V (G) of an undirected graph G is a locating-dominating set of G if for each v ∈ V (G) \ S, there exists w ∈ S such tha vw ∈ E(G) and NG(x) ∩ S ̸= NG(y) ∩ S for any two distinct vertices x and y in V (G) \ S. S is a stable locating-dominating set of G if it is a locating-dominating set of G and S \ {v} is a locating-dominating set of G for each v ∈ S. The minimum cardinality of a stable locating-dominating set of G, denoted by γSLD(G), is called the stable locating-domination number of G. In this paper, we investigate this concept and the corresponding parameter for edge corona and lexicographic product of graphs.

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Gina A. Malacas

Dierentiating-Dominating sets in graphs Under binary operations

Locating dominating sets in graphs

Stable Locating-Dominating Sets in Graphs

ON k-COST EFFECTIVE DOMINATION NUMBER, COST EFFECTIVE DOMINATION INDEX AND MAXIMAL COST EFFECTIVE DOMINATION NUMBER OF SIMPLE GRAPHS

Stable Locating-Dominating Sets in the Edge Corona and Lexicographic Product of Graphs

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