The partition dimension and k-domination number of a family of non-distance regular graph

Abstract

A partition = \S1, S2, …, Sk\ of the vertex set V(G) is a resolving partition if every pair of distinct vertices in G has a unique representation relative to . The partition dimension, pd(G), is the minimum cardinality of such a partition. Additionally, a subset D ⊂eq V(G) is a k-dominating set if every vertex in V(G) D has at least k neighbors in D; the k-domination number, γk(G), denotes the minimum size of such a set. Determining these parameters is NP-complete and particularly challenging for non-distance-regular graphs. This paper consider the Toeplitz graph T2n(W), a family of non-distance-regular graphs. While some resolving parameters for this family have been established, its partition dimension and k-domination number remain unknown. We close this gap by computing both parameters for T2n(W).