By the genus of a modular curve $X_H$, we mean the genus of any of its geometric components. This equals the genus of the open subgroup $H\leq \GL_2(\widehat \Z)$.
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- Last edited by Bjorn Poonen on 2022-03-25 11:44:48
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- columns.gps_gl2zhat_fine.dims
- columns.gps_gl2zhat_fine.genus
- columns.gps_gl2zhat_fine.genus_minus_rank
- columns.gps_gl2zhat_test.genus
- columns.gps_shimura_test.genus_minus_rank
- modcurve.decomposition
- modcurve.gassmann_class
- modcurve.genus_minus_rank
- modcurve.invariants
- modcurve.local_obstruction
- modcurve.rational_points
- rcs.cande.modcurve
- lmfdb/modular_curves/main.py (line 232)
- lmfdb/modular_curves/main.py (line 334)
- lmfdb/modular_curves/main.py (line 780)
- lmfdb/modular_curves/main.py (line 988)
- lmfdb/modular_curves/main.py (line 1068)
- lmfdb/modular_curves/main.py (line 1182)
- lmfdb/modular_curves/templates/modcurve.html (line 24)
- lmfdb/modular_curves/templates/modcurve.html (line 423)
- lmfdb/modular_curves/templates/modcurve.html (line 461)
- lmfdb/modular_curves/templates/modcurve.html (line 499)
- lmfdb/modular_curves/templates/modcurve_browse.html (line 27)
- lmfdb/modular_curves/templates/modcurve_isoclass.html (line 104)
- 2022-03-25 11:44:48 by Bjorn Poonen (Reviewed)
- 2022-03-24 15:52:03 by Bjorn Poonen
- 2022-03-21 11:32:43 by Ekin Ozman
- 2022-03-20 16:34:17 by Andrew Sutherland
- 2022-03-20 16:33:41 by Andrew Sutherland