On locating independent domination number of amalgamation graphs
Date
2018-02-28Author
Wardani, Dwi Agustin Retno
Dafik, Dafik
Agustin, Ika Hesti
Kurniawati, Elsa Yuli
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An independent set or stable set is a set of vertices in a graph in which no two
of vertices are adjacent. A set D of vertices of graph G is called a dominating set if every
vertex u 2 V (G) ¡ D is adjacent to some vertex v 2 D. A set S of vertices in a graph G is
an independent dominating set of G if D is an independent set and every vertex not in D is
adjacent to a vertex in D. By locating independent dominating set of graph G, we mean that
an independent dominating set D of G with the additional properties that for u; v 2 (V ¡ D)
satis¯es N(u) \ D 6 = N(v) \ D. A minimum locating independent dominating set is a locating
independent dominating set of smallest possible size for a given graph G. This size is called the
locating independent dominating number of G and denoted °
(G). In this paper, we analyze
the locating independent domination number of graph operations.
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- LSP-Jurnal Ilmiah Dosen [7309]