Optimal Fault-Tolerant Resolving Set of Power Paths

In a simple connected undirected graph G , an ordered set R of vertices is called a resolving set if for every pair of distinct vertices u and v , there is a vertex w ∈ R such that d ( u , w ) ≠ d ( v , w ) . A resolving set F for the graph G is a fault-tolerant resolving set if for each v ∈ F , F ∖ { v } is also a resolving set for G . In this article, we determine an optimal fault-resolving set of r -th power of any path P n when n ≥ r ( r − 1 ) + 2 . For the other values of n , we give bounds for the size of an optimal fault-resolving set. We have also presented an algorithm to construct a fault-tolerant resolving set of P m r from a fault-tolerant resolving set of P n r where m < n .