The 𝐾_{𝑛+5} and 𝐾_{3²,1ⁿ} families and obstructions to 𝑛-apex.
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Publication:4635099
DOI10.1090/conm/689/13856zbMath1390.05050arXiv1603.00885OpenAlexW4242108867MaRDI QIDQ4635099
Thomas W. Mattman, Michael Pierce
Publication date: 13 April 2018
Published in: Contemporary Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1603.00885
Related Items (5)
\(k\)-apices of minor-closed graph classes. I: Bounding the obstructions ⋮ Maximal knotless graphs ⋮ Recent developments in spatial graph theory ⋮ Order nine MMIK graphs ⋮ Minor obstructions for apex-pseudoforests
Cites Work
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- Graphs of 20 edges are 2-apex, hence unknotted
- Graph minors. XX: Wagner's conjecture
- Many, many more intrinsically knotted graphs
- Primitive spatial graphs and graph minors
- Graphs on 21 edges that are not 2-apex
- Über eine Eigenschaft der ebenen Komplexe
- SOME RESULTS ON INTRINSICALLY KNOTTED GRAPHS
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