Elegant Labeling Of Some Graphs
Date
2020-12-01Author
PRIHANDINI, Rafiantika Megahnia
DAFIK, Dafik
ADAWIYAH, Robiatul
ALFARISI, Ridho
AGUSTIN, Ika Hesti
M VENKATACHALAM, M Venkatachalam
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In this paper, we introduce a new notion of graph theory study, namely a local
edge metric dimension. It is a natural extension of metric dimension concept. dG(e, v) =
min{d(x, v), d(y, v)} is the distance between the vertex v and the edge xy in graph G. A non
empty set S ⊂ V is an edge metric generator for G if for any two edges e1, e2 ∈ E there is a vertex
k ∈ S such that dG(k, e1 6= dG(k, e2)). The minimum cardinality of edge metric generator for G
is called as edge metric dimension of G, denoted by dimE(G). The local edge metric dimension
of G, denoted by dimlE(G), is a local edge metric generator of G if r(xk|S) 6= r(yk|S) for every
pair xk, ky of adjacent edges of G. Our concern in this paper is investigating some results of
local edge metric dimension on some graphs
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- LSP-Jurnal Ilmiah Dosen [7301]