Non-hamiltonian graphs in which every edge-contracted subgraph is hamiltonian

Highlights：

• We introduce and investigate perihamiltonian graphs, a generalisation of hypohamiltonian graphs.

• We use a recent result of Wiener to show that there are infinitely many perihamiltonian graphs of connectivity k for any k ≥ 2.

• We strengthen a theorem of Thomassen by proving that every planar perihamiltonian graph of connectivity k contains a vertex of degree k.

• Thus, if in a polyhedral graph of minimum degree at least 4 the set of vertices whose removal yields a non-hamiltonian graph is independent, the graph itself must be hamiltonian.

• We prove that there are infinitely many polyhedral perihamiltonian graphs containing no adjacent cubic vertices.