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Bibliographic Details
Main Author: Kiefer, Paul
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2503.15123
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author Kiefer, Paul
author_facet Kiefer, Paul
contents We generalize the notions of locally and polar harmonic Maass forms to general orthogonal groups of signature $(2, n)$ with singularities along real analytic and algebraic cycles. We prove a current equation for locally harmonic Maass forms and recover the Fourier expansion of the Oda lift involving cycle integrals. Moreover, using the newly defined polar harmonic Maass forms, we prove that meromorphic modular forms with singularities along special divisors are orthogonal to cusp forms with respect to a regularized Petersson inner product. Using this machinery, we derive a duality theorem involving cycle integrals of meromorphic modular forms along real analytic cycles and cycle integrals of locally harmonic Maass forms along algebraic cycles.
format Preprint
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institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Locally and Polar Harmonic Maass Forms for Orthogonal Groups of Signature $(2, n)$
Kiefer, Paul
Number Theory
We generalize the notions of locally and polar harmonic Maass forms to general orthogonal groups of signature $(2, n)$ with singularities along real analytic and algebraic cycles. We prove a current equation for locally harmonic Maass forms and recover the Fourier expansion of the Oda lift involving cycle integrals. Moreover, using the newly defined polar harmonic Maass forms, we prove that meromorphic modular forms with singularities along special divisors are orthogonal to cusp forms with respect to a regularized Petersson inner product. Using this machinery, we derive a duality theorem involving cycle integrals of meromorphic modular forms along real analytic cycles and cycle integrals of locally harmonic Maass forms along algebraic cycles.
title Locally and Polar Harmonic Maass Forms for Orthogonal Groups of Signature $(2, n)$
topic Number Theory
url https://arxiv.org/abs/2503.15123