On k-connected vertex-pancyclic graphs without pancyclic edges
Abstract
An edge of a graph of order n is pancyclic if it lies in a cycle of every length 3,…,n. A graph of order n is vertex-pancyclic if every vertex lies in a cycle of every length 3,…,n. Recently, Li and Zhan proved that every 2-connected [4,2]-graph of order at least seven contains a pancyclic edge. Zhan asked whether there exists a positive integer k such that every k-connected vertex-pancyclic graph contains a pancyclic edge. We answer this question by showing that for every positive integer k, there is a k-connected vertex-pancyclic graph containing no pancyclic edge.
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