Timeline for Is there a reference book for the duality between the genus of function fields and the discriminant of number fields?
Current License: CC BY-SA 3.0
8 events
| when toggle format | what | by | license | comment | |
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| May 14, 2018 at 15:21 | comment | added | user19475 | The genus of a number field is due to Weil and contained in Chapter III of Neukirch. | |
| Jul 2, 2013 at 16:53 | comment | added | Filippo Alberto Edoardo | You might also consult van der Geer and Schoof's paper on the Theta divisor of a number field. You can find it on Schoof's webpage. | |
| Jul 2, 2013 at 14:14 | comment | added | user36362 | Can you tell me the exact passage.. | |
| Jul 2, 2013 at 13:22 | comment | added | David E Speyer | <i>Fourier Analysis on Number Fields</i>, by Ramakrishnan and Valenza covers this and is (in my opinion) somewhat easier than the two references suggested above. | |
| Jul 2, 2013 at 12:59 | comment | added | Chandan Singh Dalawat | Also, Basic Number Theory by Weil. | |
| Jul 2, 2013 at 12:48 | review | First posts | |||
| Jul 2, 2013 at 12:48 | |||||
| Jul 2, 2013 at 12:45 | comment | added | Felipe Voloch | Neukirch, Algebraic Number Theory, is a suitable reference. | |
| Jul 2, 2013 at 12:30 | history | asked | user36362 | CC BY-SA 3.0 |