On the pancyclicity of 2-connected [5,3]-graphs
Abstract
A graph G is called an [s,t]-graph if any induced subgraph of G of order s has size at least t. In 2024, Zhan conjectured that every 2-connected [p + 2, p]-graph of order at least 2p + 3 and with minimum degree at least p is pancyclic, where p is an integer with 3 ≤ p ≤ 5. In this paper, we confirm the conjecture for the case p=3, thereby taking the first step toward a complete resolution of the conjecture.
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