Computing Minimal Doubly Resolving Sets and the Strong Metric Dimension of the Layer Sun Graph and the Line Graph of Layer Sun Graph

Abstract

Let G be a finite, connected graph of order of at least 2, with vertex set V(G) and edge set E (G). A set S of vertices of the graph G is a doubly resolving set for G if every two distinct vertices of G are doubly resolved by some two vertices of S. The minimal doubly resolving set of vertices of graph G is a doubly resolving set with minimum cardinality and is denoted by (G). In this paper, first, we construct a class of graphs of order 2n+ r=1k-2nmr, denoted by LSG(n,m, k), and call these graphs as the layer Sun graphs with parameters n, m and k. Moreover, we compute minimal doubly resolving sets and the strong metric dimension of layer Sun graph LSG(n,m, k) and the line graph of the layer Sun graph LSG(n,m, k).