Pancyclicity in the Cartesian Product $(K_9-C_9 )^n$

M Rajesh

Pancyclicity in the Cartesian Product (K9-C9 )n

Abstract

A graph G on m vertices is pancyclic if it contains cycles of length l, 3≤ l ≤ m as subgraphs in G. The complete graph K9 on 9 vertices with a cycle C9 of length 9 deleted from K9 is denoted by (K9-C9). In this paper, we prove that (K9-C9)n, the Cartesian product of (K9-C9) taken n times, is pancyclic.

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