We conclude the multiple fibration problem for closed orientable Seifert three-orbifolds, namely, the determination of all the inequivalent fibrations that such an orbifold may admit. We treat here geometric orbifolds with geometries $\mathbb R<^>3$ and $\mathbb S<^>2\times\mathbb R$ and bad orbifolds (hence non-geometric), since the only other geometry for which the multiple fibration phenomenon occurs, namely, $\mathbb S<^>3$, has been treated before by the second and third authors. For the geometry $\mathbb R<^>3$ we recover, by direct and geometric arguments, the computer-assisted results obtained by Conway, Delgado-Friedrichs, Huson and Thurston.
The multiple fibration problem for seifert 3-Orbifolds
Seppi, Andrea
2025-01-01
Abstract
We conclude the multiple fibration problem for closed orientable Seifert three-orbifolds, namely, the determination of all the inequivalent fibrations that such an orbifold may admit. We treat here geometric orbifolds with geometries $\mathbb R<^>3$ and $\mathbb S<^>2\times\mathbb R$ and bad orbifolds (hence non-geometric), since the only other geometry for which the multiple fibration phenomenon occurs, namely, $\mathbb S<^>3$, has been treated before by the second and third authors. For the geometry $\mathbb R<^>3$ we recover, by direct and geometric arguments, the computer-assisted results obtained by Conway, Delgado-Friedrichs, Huson and Thurston.
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