On the global monodromy of a fibration of the Fermat surface of odd degree \(n\)
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Publication:719097
DOI10.3836/TJM/1313074444zbMath1222.14016OpenAlexW2038980685MaRDI QIDQ719097
Publication date: 27 September 2011
Published in: Tokyo Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3836/tjm/1313074444
Structure of families (Picard-Lefschetz, monodromy, etc.) (14D05) Fibrations, degenerations in algebraic geometry (14D06)
Related Items (2)
Axial fibrations of the Fermat surfaces and their singular fibers ⋮ On the global monodromy of a fibration of the Fermat surface of odd degree \(n\)
Cites Work
- On the global monodromy of a Lefschetz fibration arising from the Fermat surface of degree 4
- On the global monodromy of a fibration of the Fermat surface of odd degree \(n\)
- A proof of Thurston's uniformization theorem of geometric orbifolds
- Subordinate fibers of Takamura splitting families for stellar singular fibers
- On the topology of Fermat type surface of degree 5 and the numerical analysis of algebraic curves
- On the topological structure of the Fermat surface of degree 5
- Pseudo-periodic homeomorphisms and degeneration of Riemann surfaces
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