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dc.contributor.authorTuite, Michael P.
dc.contributor.authorKrauel, Matthew
dc.contributor.authorBringmann, Kathrin
dc.date.accessioned2019-04-08T09:39:59Z
dc.date.available2019-04-08T09:39:59Z
dc.date.issued2017-06-23
dc.identifier.citationBringmann, Kathrin , Krauel, Matthew , & Tuite, Michael P. . (2017). Zhu reduction for Jacobi n-point functions and applications.
dc.identifier.urihttp://hdl.handle.net/10379/15101
dc.description.abstractWe establish precise Zhu reduction formulas for Jacobi n-point functions which show the absence of any possible poles arising in these formulas. We then exploit this to produce results concerning the structure of strongly regular vertex operator algebras, and also to motivate new differential operators acting on Jacobi forms. Finally, we apply the reduction formulas to the Fermion model in order to create polynomials of quasi-Jacobi forms which are Jacobi forms.en_IE
dc.subjectVertex algebrasen_IE
dc.subjectJacobi Formsen_IE
dc.titleZhu reduction for Jacobi n-point functions and applicationsen_IE
dc.typeArticleen_IE
dc.local.publishedsourcehttps://arxiv.org/abs/1706.07596en_IE
dc.description.peer-reviewednon-peer-revieweden_IE
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