Veering structures of the canonical decompositions of hyperbolic fibered two-bridge link complements (Q2802900)
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scientific article; zbMATH DE number 6574409
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Veering structures of the canonical decompositions of hyperbolic fibered two-bridge link complements |
scientific article; zbMATH DE number 6574409 |
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Veering structures of the canonical decompositions of hyperbolic fibered two-bridge link complements (English)
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27 April 2016
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two-bridge link
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layered triangulation
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hyperbolic 3-manifold
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veering triangulation
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canonical decomposition
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0.9650788
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0.8818827
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0.8775005
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0.8683327
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0.86713016
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0.8576907
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0.8560762
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In the paper under review, the author completely determines whether the canonical decomposition of hyperbolic fibered two-bridge link complements is veering. This is a sequel result to the author's previous work [Topology Appl. 196, Part B, 821--845 (2015; Zbl 1360.57022)] that these canonical decompositions are layered. Applying \textit{F. Guéritaud}'s work [``Veering triangulations and Cannon-Thurston maps'', \url{arXiv:1506. 03387}], one can also find interesting relations between this result and the Cannon-Thurston fractal tessellation.
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