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Ramanujan–Petersson conjecture for Fourier–Jacobi coefficients of siegel cusp forms

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dc.contributor.author Kumar, B.
dc.contributor.author Paul, B.
dc.date.accessioned 2021-11-30T20:40:35Z
dc.date.available 2021-11-30T20:40:35Z
dc.date.issued 2021-12-01
dc.identifier.uri http://localhost:8080/xmlui/handle/123456789/3270
dc.description.abstract Let F be a Siegel cusp form of weight k and degree n > 1 with Fourier-Jacobi coefficients {φm}m ∈ N. In this article, we investigate the Ramanujan–Petersson conjecture (formulated by Kohnen) for the Petersson norm of φm. In particular, we show that this conjecture is true when F is a Hecke eigenform and a Duke–Imamo˘glu–Ikeda lift. This generalizes a result of Kohnen and Sengupta. Further, we investigate an omega result and a lower bound for the Petersson norms of φm as m → ∞. Interestingly, these results are different depending on whether F is a Saito–Kurokawa lift or a Duke–Imamo˘glu–Ikeda lift of degree n 4. en_US
dc.language.iso en_US en_US
dc.title Ramanujan–Petersson conjecture for Fourier–Jacobi coefficients of siegel cusp forms en_US
dc.type Article en_US


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