Period relations for Riemann surfaces with many automorphisms
| Autor: | Skip Moses, Luca Candelori, Christopher Marks, Jack Fogliasso |
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| Jazyk: | angličtina |
| Rok vydání: | 2018 |
| Předmět: |
Pure mathematics
Endomorphism Mathematics - Number Theory Riemann surface Automorphic form Complex multiplication Automorphism symbols.namesake Mathematics - Algebraic Geometry Genus (mathematics) symbols FOS: Mathematics Canonical form Number Theory (math.NT) Algebraic number Algebraic Geometry (math.AG) Mathematics |
| Popis: | By employing the theory of vector-valued automorphic forms for non-unitarizable representations, we provide a new bound for the number of linear relations with algebraic coefficients between the periods of an algebraic Riemann surface with many automorphisms. The previous best-known general bound for this number was the genus of the Riemann surface, a result due to Wolfart. Our new bound significantly improves on this estimate, and it can be computed explicitly from the canonical representation of the Riemann surface. As observed by Shiga and Wolfart, this bound may then be used to estimate the dimension of the endomorphism algebra of the Jacobian of the Riemann surface. We demonstrate with a few examples how this improved bound allows one, in some instances, to actually compute the dimension of this endomorphism algebra, and to determine whether the Jacobian has complex multiplication. |
| Databáze: | OpenAIRE |
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