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The Heisenberg covering of the Fermat curve

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dc.contributor.author BANERJEE, DEBARGHA en_US
dc.contributor.author Merel, Loïc en_US
dc.date.accessioned 2024-06-21T05:41:29Z
dc.date.available 2024-06-21T05:41:29Z
dc.date.issued 2024-05 en_US
dc.identifier.citation Canadian Journal of Mathematics en_US
dc.identifier.issn 0008-414X en_US
dc.identifier.issn 1496-4279 en_US
dc.identifier.uri https://doi.org/10.4153/S0008414X24000476 en_US
dc.identifier.uri http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/8990
dc.description.abstract For N integer ≥1, K. Murty and D. Ramakrishnan defined the Nth Heisenberg curve, as the compactified quotient X′N of the upper half-plane by a certain non-congruence subgroup of the modular group. They ask whether the Manin–Drinfeld principle holds, namely, if the divisors supported on the cusps of those curves are torsion in the Jacobian. We give a model over Z[μN,1/N] of the Nth Heisenberg curve as covering of the Nth Fermat curve. We show that the Manin–Drinfeld principle holds for N=3, but not for N=5. We show that the description by generator and relations due to Rohrlich of the cuspidal subgroup of the Fermat curve is explained by the Heisenberg covering, together with a higher covering of a similar nature. The curves XN and the classical modular curves X(n), for n even integer, both dominate X(2), which produces a morphism between Jacobians JN→J(n). We prove that the latter has image 0 or an elliptic curve of j-invariant 0. In passing, we give a description of the homology of X′N. en_US
dc.language.iso en en_US
dc.publisher Cambridge University Press en_US
dc.subject Fermat’s curves en_US
dc.subject Modular symbols en_US
dc.subject Heisenberg curves en_US
dc.subject 2024 en_US
dc.subject 2024-JUN-WEEK1 en_US
dc.subject TOC-JUN-2024 en_US
dc.title The Heisenberg covering of the Fermat curve en_US
dc.type Article en_US
dc.contributor.department Dept. of Mathematics en_US
dc.identifier.sourcetitle Canadian Journal of Mathematics en_US
dc.publication.originofpublisher Foreign en_US


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