Harmonic weak Maass forms and periods II
Weitere Details
of negative half-integral weight. We relate the algebraicity of these
coefficients to the algebraicity of the coefficients of certain canonical
meromorphic modular forms of positive even weight with poles at Heegner
divisors. Moreover, we give an explicit formula for the coefficients of
harmonic Maass forms in terms of periods of certain meromorphic modular forms
with algebraic coefficients.
Zitierstile
Alfes-Neumann C, Bruinier JH, Schwagenscheidt M. Harmonic weak Maass forms and periods II. arXiv:2209.11454. 2022.
Alfes-Neumann, C., Bruinier, J. H., & Schwagenscheidt, M. (2022). Harmonic weak Maass forms and periods II. arXiv:2209.11454
Alfes-Neumann, C., Bruinier, J. H., and Schwagenscheidt, M. (2022). Harmonic weak Maass forms and periods II. arXiv:2209.11454.
Alfes-Neumann, C., Bruinier, J.H., & Schwagenscheidt, M., 2022. Harmonic weak Maass forms and periods II. arXiv:2209.11454.
C. Alfes-Neumann, J.H. Bruinier, and M. Schwagenscheidt, “Harmonic weak Maass forms and periods II”, arXiv:2209.11454, 2022.
Alfes-Neumann, C., Bruinier, J.H., Schwagenscheidt, M.: Harmonic weak Maass forms and periods II. arXiv:2209.11454. (2022).
Alfes-Neumann, Claudia, Bruinier, Jan Hendrik, and Schwagenscheidt, Markus. “Harmonic weak Maass forms and periods II”. arXiv:2209.11454 (2022).
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of negative half-integral weight. We relate the algebraicity of these
coefficients to the algebraicity of the coefficients of certain canonical
meromorphic modular forms of positive even weight with poles at Heegner
divisors. Moreover, we give an explicit formula for the coefficients of
harmonic Maass forms in terms of periods of certain meromorphic modular forms
with algebraic coefficients.
Zitierstile
Alfes-Neumann C, Bruinier JH, Schwagenscheidt M. Harmonic weak Maass forms and periods II. arXiv:2209.11454. 2022.
Alfes-Neumann, C., Bruinier, J. H., & Schwagenscheidt, M. (2022). Harmonic weak Maass forms and periods II. arXiv:2209.11454
Alfes-Neumann, C., Bruinier, J. H., and Schwagenscheidt, M. (2022). Harmonic weak Maass forms and periods II. arXiv:2209.11454.
Alfes-Neumann, C., Bruinier, J.H., & Schwagenscheidt, M., 2022. Harmonic weak Maass forms and periods II. arXiv:2209.11454.
C. Alfes-Neumann, J.H. Bruinier, and M. Schwagenscheidt, “Harmonic weak Maass forms and periods II”, arXiv:2209.11454, 2022.
Alfes-Neumann, C., Bruinier, J.H., Schwagenscheidt, M.: Harmonic weak Maass forms and periods II. arXiv:2209.11454. (2022).
Alfes-Neumann, Claudia, Bruinier, Jan Hendrik, and Schwagenscheidt, Markus. “Harmonic weak Maass forms and periods II”. arXiv:2209.11454 (2022).
Download
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JSON-LD-Format
Turtle-Format
N3-Format