Group distance magic cubic graphs

Abstract

A -distance magic labeling of a graph G = (V, E) with |V| = n is a bijection from V to an Abelian group of order n, for which there exists μ ∈ , such that the weight w(x) =Σy∈ N(x)(y) of every vertex x ∈ V is equal to μ. In this case, the element μ is called the magic constant of G. A graph G is called a group distance magic if there exists a -distance magic labeling of G for every Abelian group of order n. In this paper, we focused on cubic -distance magic graphs as well as some properties of such graphs.

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