Pancyclicity of 4-connected \(\{K_{1,3},Z_8\}\)-free graphs (Q1733851)
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scientific article; zbMATH DE number 7040457
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Pancyclicity of 4-connected \(\{K_{1,3},Z_8\}\)-free graphs |
scientific article; zbMATH DE number 7040457 |
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Pancyclicity of 4-connected \(\{K_{1,3},Z_8\}\)-free graphs (English)
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21 March 2019
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It is shown that every 4-connected claw-free \(Z_8\)-free graph is either pancyclic or is the line graph of the Petersen graph, where \(Z_i\) denotes the graph obtained by identifying an endpoint of the path \(P_{i+1}\) with a vertex of a triangle. Furthermore, as a consequence, it follows that every 4-connected claw-free \(Z_6\)-free graph and every 5-connected claw-free \(Z_8\)-free graph are pancyclic.
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claw-free graph
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pancyclic graph
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forbidden subgraphs
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