Irregular labeling on Abelian groups of digraphs
Abstract
Let G be a directed graph of order n with no component of order less than 4, and let be a finite Abelian group such that ||≥ n+6. We show that there exists a mapping from the arc set E(G) of G to an Abelian group such that if we define a mapping from the vertex set V(G) of G to by (x)=Σy∈ N+(x)(xy)-Σy∈ N-(x)(yx),\;\;\;(x∈ V(G)), then is injective. Such a labeling is called irregular.
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