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Torsion points on theta divisors

Authordc.contributor.authorAuffarth, Robert Frederick 
Authordc.contributor.authorPirola, Gian Pietro 
Authordc.contributor.authorManni, Riccardo Salvati 
Admission datedc.date.accessioned2018-12-19T20:28:36Z
Available datedc.date.available2018-12-19T20:28:36Z
Publication datedc.date.issued2017
Cita de ítemdc.identifier.citationProceedings of the American Mathematical Society, Volumen 145, Issue 1, 2017, Pages 89-99
Identifierdc.identifier.issn10886826
Identifierdc.identifier.issn00029939
Identifierdc.identifier.other10.1090/proc/13230
Identifierdc.identifier.urihttps://repositorio.uchile.cl/handle/2250/153555
Abstractdc.description.abstract© 2016 American Mathematical Society. Using the irreducibility of a natural irreducible representation of the theta group of an ample line bundle on an abelian variety, we derive a bound for the number of n-torsion points that lie on a given theta divisor. We present also two alternate approaches to attacking the case n = 2.
Lenguagedc.language.isoen
Publisherdc.publisherAmerican Mathematical Society
Type of licensedc.rightsAttribution-NonCommercial-NoDerivs 3.0 Chile
Link to Licensedc.rights.urihttp://creativecommons.org/licenses/by-nc-nd/3.0/cl/
Sourcedc.sourceProceedings of the American Mathematical Society
Keywordsdc.subjectAbelian variety
Keywordsdc.subjectTheta divisor
Keywordsdc.subjectTorsion
Títulodc.titleTorsion points on theta divisors
Document typedc.typeArtículo de revista
Catalogueruchile.catalogadorcrb
Indexationuchile.indexArtículo de publicación SCOPUS
uchile.cosechauchile.cosechaSI


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Attribution-NonCommercial-NoDerivs 3.0 Chile
Except where otherwise noted, this item's license is described as Attribution-NonCommercial-NoDerivs 3.0 Chile