A local property of polyhedral maps on compact two-dimensional manifolds (Q1970583)
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scientific article; zbMATH DE number 1420218
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | A local property of polyhedral maps on compact two-dimensional manifolds |
scientific article; zbMATH DE number 1420218 |
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A local property of polyhedral maps on compact two-dimensional manifolds (English)
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18 October 2000
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The authors show that, for any \(k\), each polyhedral map \(G\) on a compact connected surface with Euler characteristic \(\chi\) either contains a path on \(k\) vertices such that each vertex on the path has degree at most \(k\lfloor (5+\sqrt{49-24\chi})/2\rfloor\), or it contains no path on \(k\) vertices at all. Remarkably, no analogous result holds for any connected subgraphs other than paths.
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surface
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polyhedral map
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path
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degree of a vertex
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