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ON MODULAR FORMS FOR THE PARAMODULAR GROUPS

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Publication:5494130

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DOI10.1142/9789812774415_0015zbMath1161.11340OpenAlexW2315055882MaRDI QIDQ5494130

Brooks Roberts, Ralf Schmidt

Publication date: 17 October 2006

Published in: Automorphic Forms and Zeta Functions (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1142/9789812774415_0015

Mathematics Subject Classification ID

Siegel modular groups; Siegel and Hilbert-Siegel modular and automorphic forms (11F46) Jacobi forms (11F50) Modular correspondences, etc. (11F32)

Related Items (27)

Lowest weight modules of \(\mathrm{Sp}_4 (\mathbb{R})\) and nearly holomorphic Siegel modular forms ⋮ On counting cuspidal automorphic representations for \(\mathrm{GSp(4)}\) ⋮ Moduli spaces and modular forms. Abstracts from the workshop held January 31 -- February 6, 2021 (hybrid meeting) ⋮ Siegel paramodular forms and sparseness in \(\mathrm{AdS}_{3}/\mathrm{CFT}_{2}\) ⋮ Fourier coefficients for twists of Siegel paramodular forms (expanded version) ⋮ Theta lifts of Bianchi modular forms and applications to paramodularity ⋮ Non-vanishing of fundamental Fourier coefficients of paramodular forms ⋮ A geometric Jacquet-Langlands correspondence for paramodular Siegel threefolds ⋮ Local and global Maass relations ⋮ Dimension formulas for Siegel modular forms of level 4 ⋮ Symmetries in A-type little string theories. I: Reduced free energy and paramodular groups ⋮ Newforms for odd orthogonal groups ⋮ Packet structure and paramodular forms ⋮ Survey article: Characterizations of the Saito-Kurokawa lifting ⋮ Paramodular forms in CAP representations of ${\rm GSp}(4)$ ⋮ Paramodular abelian varieties of odd conductor ⋮ Liftable mapping class groups of regular cyclic covers ⋮ Siegel modular forms and black hole entropy ⋮ The Maaß space and Hecke operators ⋮ Nonlift weight two paramodular eigenform constructions ⋮ The Hecke algebras for the orthogonal group SO(2,3) and the paramodular group of degree 2 ⋮ Formulas for central values of twisted spin $L$-functions attached to paramodular forms ⋮ Paramodular forms coming from elliptic curves ⋮ On the paramodularity of typical abelian surfaces ⋮ Siegel modular forms of degree two attached to Hilbert modular forms ⋮ Paramodular forms of level 16 and supercuspidal representations ⋮ Paramodular forms of level 8 and weights 10 and 12

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