Every 2-connected [4, 2]-graph of order at least seven contains a pancyclic edge

Abstract

A graph G is called an [s,t]-graph if any induced subgraph of G of order s has size at least t. An edge e in a graph G of order n is called pancyclic if for every integer k with 3 k n, e lies in a k-cycle. We prove that every 2-connected [4, 2]-graph of order at least seven contains a pancyclic edge. This strengthens an existing result. We also determine the minimum size of a [4, 2]-graph of a given order and show that any [4, 2]-graph of order at least eight is not uniquely hamiltonian.

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