Abstract
Consider λ to be a connected graph with a vertex set V λ that may be partitioned into any partition set S . If each vertex in λ has a separate representation with regard to S and is an ordered k partition, then the set with S is a resolving partition of λ . . A partition dimension of λ , represented by p d , is the minimal cardinality of resolving k partitions of V λ . The partition dimension of various generalised families of graphs, such as the Harary graph, Cayley graph, and Pendent graph, is given as a sharp upper bound in this article.
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