Search results
Jump to navigation
Jump to search
Page title matches
- In [[algebraic geometry]] an '''Abelian variety''' <math>A</math> over a [[field]] <math>K</math> is a projective variety,522 bytes (82 words) - 02:26, 16 December 2008
- 12 bytes (1 word) - 02:25, 24 September 2007
- 198 bytes (24 words) - 02:23, 16 December 2008
- 150 bytes (19 words) - 17:31, 16 December 2008
- 895 bytes (142 words) - 02:21, 16 December 2008
- In [[mathematics]], in [[Diophantine geometry]], the '''conductor of an abelian variety''' defined over a [[local field|local]] or [[global field]] ''F'' is a meas For an Abelian variety ''A'' defined over a field ''F'' with ring of integers ''R'', consider the2 KB (316 words) - 04:24, 1 November 2013
- 95 bytes (15 words) - 15:45, 28 October 2008
- Auto-populated based on [[Special:WhatLinksHere/Conductor of an abelian variety]]. Needs checking by a human.507 bytes (65 words) - 15:38, 11 January 2010
Page text matches
- In [[algebraic geometry]] an '''Abelian variety''' <math>A</math> over a [[field]] <math>K</math> is a projective variety,522 bytes (82 words) - 02:26, 16 December 2008
- ...'Abelian surface''' over a [[field]] <math>K</math> is a two dimensional [[Abelian variety]]. Every abelian surface is a finite quotient of a [[Jacobian variety]] of ...a polarization is call a ''polarized Abelian surface''. Given a polarized Abelian variety <math>(A,D)</math> we define the ''polarization map''2 KB (290 words) - 09:39, 13 January 2009
- A 2-dimensional Abelian variety.69 bytes (7 words) - 05:51, 4 September 2009
- {{r|Abelian variety}}245 bytes (30 words) - 10:06, 12 July 2008
- An isogeny between an abelian variety and its dual.87 bytes (12 words) - 15:08, 15 December 2008
- Method in algebraic geometry of making an abelian variety from a morphism of algebraic curves.131 bytes (18 words) - 11:13, 4 September 2009
- An algebraic curve of genus one with a group structure; a one-dimensional abelian variety.126 bytes (17 words) - 02:22, 16 December 2008
- In [[mathematics]], in [[Diophantine geometry]], the '''conductor of an abelian variety''' defined over a [[local field|local]] or [[global field]] ''F'' is a meas For an Abelian variety ''A'' defined over a field ''F'' with ring of integers ''R'', consider the2 KB (316 words) - 04:24, 1 November 2013
- {{r|Abelian variety}}898 bytes (114 words) - 10:49, 11 January 2010
- ...ometimes also denoted as Pic<sup>0</sup>. It is an principally polarized [[Abelian variety]] of dimension g.914 bytes (154 words) - 01:39, 27 October 2013
- {{rpl|Conductor of an abelian variety}}226 bytes (31 words) - 04:16, 26 September 2013
- {{r|Abelian variety}} {{r|Conductor of an abelian variety}}1 KB (187 words) - 20:18, 11 January 2010
- Auto-populated based on [[Special:WhatLinksHere/Conductor of an abelian variety]]. Needs checking by a human.507 bytes (65 words) - 15:38, 11 January 2010
- For [[abelian variety|abelian varieties]] the Manin obstruction is just the [[Tate-Shafarevich gr1 KB (164 words) - 16:21, 27 October 2008
- {{r|Conductor of an abelian variety}}598 bytes (78 words) - 20:14, 11 January 2010
- {{r|Abelian variety}}898 bytes (142 words) - 17:30, 16 December 2008
- ...O_{Jac(C)}(2\Theta_C)|\cong\mathbb{P}^{2^2-1}</math> (see the article on [[Abelian variety|Abelian varieties]]). This maps factors through the Kummer variety as a deg The 2-torsion points on an Abelian variety admit a symplectic [[bilinear form]] called the Weil pairing. In the case o7 KB (1,246 words) - 05:37, 18 October 2013
- In [[algebraic geometry]], an '''isogeny''' between [[abelian variety|abelian varieties]] is a [[rational map]] which is also a [[group homomorph4 KB (647 words) - 15:51, 7 February 2009
- ...over a [[field (mathematics)|field]] <math>K</math> is a one dimensional [[Abelian variety]] over <math>K</math>. Alternatively it is a smooth [[algebraic curve]] of The theorem also applies to an [[abelian variety]] ''A'' of higher dimension over a number field. The [[Lang-Néron theorem10 KB (1,637 words) - 16:03, 17 December 2008