Obstructions for embedding cubic graphs on the spindle surface
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Publication:598469
DOI10.1016/j.jctb.2004.02.001zbMath1051.05035OpenAlexW2055129400MaRDI QIDQ598469
C. Paul Bonnington, Dan S. Archdeacon
Publication date: 6 August 2004
Published in: Journal of Combinatorial Theory. Series B (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jctb.2004.02.001
Related Items (3)
The obstructions for toroidal graphs with no \(K_{3,3}\)'s ⋮ Self-dual embeddings of K_{4m,4n} in different orientable and nonorientable pseudosurfaces with the same Euler characteristic ⋮ Variations on a theme of Kuratowski
Uses Software
Cites Work
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- Graph minors. XX: Wagner's conjecture
- The 2 and 3 representative projective planar embeddings
- Kuratowski-type theorems do not extend to pseudosurfaces
- Cubic irreducible graphs for the projective plane
- 103 graphs that are irreducible for the projective plane
- A Kuratowski theorem for nonorientable surfaces
- Graph minors. VIII: A Kuratowski theorem for general surfaces
- Cubic graphs with crossing number two
- A kuratowski theorem for the projective plane
- On 3‐regular graphs having crossing number at least 2
- Computing the orientable genus of projective graphs
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