The metric dimension of strong product graphs

Abstract

For an ordered subset S = \s1, s2,… sk\ of vertices and a vertex u in a connected graph G, the metric representation of u with respect to S is the ordered k-tuple r(u|S)=(dG(v,s1), dG(v,s2),…, dG(v,sk)), where dG(x,y) represents the distance between the vertices x and y. The set S is a metric generator for G if every two different vertices of G have distinct metric representations. A minimum metric generator is called a metric basis for G and its cardinality, dim(G), the metric dimension of G. It is well known that the problem of finding the metric dimension of a graph is NP-Hard. In this paper we obtain closed formulae and tight bounds for the metric dimension of strong product graphs.