Zhu reduction for Jacobi N-point functions and applications

Kathrin Bringmann; Matthew Krauel; Michael Tuite

doi:10.1090/tran/8013

Zhu reduction for Jacobi N-point functions and applications

Kathrin Bringmann
, Matthew Krauel
, Michael Tuite

Mathematics

Research output: Contribution to a Journal (Peer & Non Peer) › Article › peer-review

5 Citations (Scopus)

Abstract

We 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.

Original language	English
Pages (from-to)	3261-3293
Number of pages	33
Journal	Transactions of the American Mathematical Society
Volume	373
Issue number	5
DOIs	https://doi.org/10.1090/tran/8013
Publication status	Published - 2020

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10.1090/tran/8013

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title = "Zhu reduction for Jacobi N-point functions and applications",

abstract = "We 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.",

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AB - We 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.

UR - https://www.scopus.com/pages/publications/85082935023

U2 - 10.1090/tran/8013

DO - 10.1090/tran/8013

M3 - Article

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JO - Transactions of the American Mathematical Society

JF - Transactions of the American Mathematical Society

IS - 5

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Zhu reduction for Jacobi N-point functions and applications

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