Distance Antimagic Labeling of Zero-Divisor Graphs

Abstract

In this paper, we prove that for all m≥ 1 and n=1, the graph m(Z9)+n(Z4), for all n≥ 1, and m=1, the graph m(Z6)+n(Z9), for all m≥1, [m(Z9)+(Z4)]× (Z9), for all prime m≥3, (Z6)×(Z2m) and (Z6)×(Zm2) are all admit distance antimagic labeling.

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