The Simultaneous Metric Dimension of Families Composed by Lexicographic Product Graphs

Abstract

Let G be a graph family defined on a common (labeled) vertex set V. A set S⊂eq V is said to be a simultaneous metric generator for G if for every G∈ G and every pair of different vertices u,v∈ V there exists s∈ S such that dG(s,u) dG(s,v), where dG denotes the geodesic distance. A simultaneous adjacency generator for G is a simultaneous metric generator under the metric dG,2(x,y)=\dG(x,y),2\. A minimum cardinality simultaneous metric (adjacency) generator for G is a simultaneous metric (adjacency) basis, and its cardinality the simultaneous metric (adjacency) dimension of G. Based on the simultaneous adjacency dimension, we study the simultaneous metric dimension of families composed by lexicographic product graphs.