Edge metric dimension of some graph operations
Abstract
Let G=(V, E) be a connected graph. Given a vertex v∈ V and an edge e=uw∈ E, the distance between v and e is defined as dG(e,v)=\dG(u,v),dG(w,v)\. A nonempty set S⊂ V is an edge metric generator for G if for any two edges e1,e2∈ E there is a vertex w∈ S such that dG(w,e1) dG(w,e2). The minimum cardinality of any edge metric generator for a graph G is the edge metric dimension of G. The edge metric dimension of the join, lexicographic and corona product of graphs is studied in this article.
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