Pancyclic zero divisor graph over the ring Zn[i]
Abstract
Let (Zn[i]) be the zero divisor graph over the ring Zn[i]. In this article, we study pancyclic properties of (Zn[i]) and (Zn[i]) for different n. Also, we prove some results in which L((Zn[i])) and L((Zn[i])) to be pancyclic for different values of n.
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