Two-disjoint-cycle-cover vertex pancyclicity of split-star networks
Abstract
Let r1 and r2 be positive integers with r1 r2. A graph G is called 2-DCC vertex [r1,r2]-pancyclic if, for any two distinct vertices of G and any integer ∈ [r1,r2], there exist two vertex-disjoint cycles of lengths and |V(G)|-, respectively, containing the two vertices separately. In this paper, we investigate the two-disjoint-cycle-cover vertex pancyclicity of the split-star network Sn2. We prove that Sn2 is 2-DCC vertex [3,n!/2]-pancyclic for n4.
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