On the Metric Dimension of Generalized Petersen Graphs P(n,3)

Abstract

The metric dimension of a graph G is defined as the minimum number of vertices in a subset S⊂ V(G) such that all other vertices are uniquely determined by their distances to the vertices in S, and is denoted by (G). In this paper, we study the metric dimension of generalized Petersen graphs P(n,3). The notions of good and bad vertices, which are introduced in Imran et al. (2014, Ars. Combinatoria 117, 113-130), are instrumental in determining the lower bound of the metric dimension for certain types of graphs. We propose an approach, based on these notions, to determine the lower bound of (P(n,3)). Moreover, we shall prove that (P(n,3))=4, where n2,3,4,5 \,\,(mod\,\, 6) and is sufficiently large.