On the torsion values for sections of an elliptic scheme
-
Pietro Corvaja
,
David Masser
Abstract
We shall consider sections of a complex elliptic scheme
This analysis will also involve the multiplicity with which a torsion value is attained, which is an independent problem. We shall prove finiteness theorems for the points where the multiplicity is higher than expected. Such multiplicity has also a relation with Diophantine Approximation and quasi-integral points on
Acknowledgements
We thank Ulmer and Urzua for sending us their preprints. We thank Mavraki, Jones and Schmidt for their interest and helpful kind indications concerning their papers. Finally, we thank the anonymous referee for the careful analysis of the manuscript and for suggesting many useful changes.
References
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© 2021 Walter de Gruyter GmbH, Berlin/Boston
Artikel in diesem Heft
- Frontmatter
- On the torsion values for sections of an elliptic scheme
- 2-Verma modules
- Ellipticity and discrete series
- Quasi-isometric rigidity for graphs of virtually free groups with two-ended edge groups
- Nonnegative Ricci curvature and escape rate gap
- Hyperkähler metrics near Lagrangian submanifolds and symplectic groupoids
- On the geometry of lattices and finiteness of Picard groups
- About every convex set in any generic Riemannian manifold
- Hopf-type theorem for self-shrinkers
Artikel in diesem Heft
- Frontmatter
- On the torsion values for sections of an elliptic scheme
- 2-Verma modules
- Ellipticity and discrete series
- Quasi-isometric rigidity for graphs of virtually free groups with two-ended edge groups
- Nonnegative Ricci curvature and escape rate gap
- Hyperkähler metrics near Lagrangian submanifolds and symplectic groupoids
- On the geometry of lattices and finiteness of Picard groups
- About every convex set in any generic Riemannian manifold
- Hopf-type theorem for self-shrinkers
