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Torsion points with multiplicatively dependent coordinates
Project funded by own resources |
Project title |
Torsion points with multiplicatively dependent coordinates |
Principal Investigator(s) |
Barroero, Fabrizio
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Organisation / Research unit |
Faculty of Science, Departement Mathematik und Informatik, Departement Mathematik und Informatik / Mathematik, Departement Mathematik und Informatik / Zahlentheorie (Habegger) |
Project start |
01.10.2017 |
Probable end |
31.01.2019 |
Status |
Completed |
Abstract |
We plan to effectively prove that, given a fixed elliptic curve defined over the rational nubers, this has at most finitely many torsion points that have multiplicatively dependent coordinates.
Collaboration with Min Sha (UNSW, Australia)
Financed by the SNF project "Diophantine Problems, o-Minimality, and Heights" (3490239) |
Financed by |
University funds Other funds
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Follow-up Project of... |
3490239 Diophantine Problems, o-Minimality, and Heights
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29/03/2024
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