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A classification of polyharmonic Maaß forms via quiver representations

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Název: A classification of polyharmonic Maaß forms via quiver representations
Autoři: Alfes, Claudia, Burban, I., Raum, Martin, 1985
Zdroj: Real-analytiska ortogonala modulära former som genererande serier Journal of Algebra. 661:713-756
Témata: Kronecker limit formula, Polyharmonic Maaß forms, Mock modular forms, Gelfand quiver, Harish-Chandra modules
Popis: We give a classification of the Harish-Chandra modules generated by the pullback to SL2(R) of polyharmonic Maaß forms for congruence subgroups of SL2(Z) with exponential growth allowed at the cusps. This extends results of Bringmann–Kudla in the harmonic case. While in the harmonic setting there are nine cases, our classification comprises ten; A new case arises in weights k>1. To obtain the classification we introduce quiver representations into the topic and show that those associated with polyharmonic Maaß forms are cyclic, indecomposable representations of the two-cyclic or the Gelfand quiver. A classification of these transfers to a classification of polyharmonic weak Maaß forms. To realize all possible cases of Harish-Chandra modules we develop a theory of weight shifts for Taylor coefficients of vector-valued spectral families. We provide a comprehensive computer implementation of this theory, which allows us to provide explicit examples.
Popis souboru: electronic
Přístupová URL adresa: https://research.chalmers.se/publication/542905
https://research.chalmers.se/publication/542905/file/542905_Fulltext.pdf
Databáze: SwePub
Popis
Abstrakt:We give a classification of the Harish-Chandra modules generated by the pullback to SL2(R) of polyharmonic Maaß forms for congruence subgroups of SL2(Z) with exponential growth allowed at the cusps. This extends results of Bringmann–Kudla in the harmonic case. While in the harmonic setting there are nine cases, our classification comprises ten; A new case arises in weights k>1. To obtain the classification we introduce quiver representations into the topic and show that those associated with polyharmonic Maaß forms are cyclic, indecomposable representations of the two-cyclic or the Gelfand quiver. A classification of these transfers to a classification of polyharmonic weak Maaß forms. To realize all possible cases of Harish-Chandra modules we develop a theory of weight shifts for Taylor coefficients of vector-valued spectral families. We provide a comprehensive computer implementation of this theory, which allows us to provide explicit examples.
ISSN:1090266X
00218693
DOI:10.1016/j.jalgebra.2024.07.033