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- An '''elliptic curve''' over a [[field (mathematics)|field]] <math>K</math> is a one dimensional ...intersection is to be understood with multiplicities. The addition on the elliptic curve <math>E</math> is defined as <math>p+q:=O*(p*q)</math>. Both the commutativ10 KB (1,637 words) - 16:03, 17 December 2008
- 2 KB (206 words) - 17:21, 17 December 2008
- 12 bytes (1 word) - 10:43, 26 September 2007
- 126 bytes (17 words) - 02:22, 16 December 2008
- 85 bytes (14 words) - 17:36, 16 December 2008
- 898 bytes (142 words) - 17:30, 16 December 2008
- ...of the height pairing on a generating set for the Mordell–Weil group of an elliptic curve.144 bytes (22 words) - 15:56, 2 January 2009
- 95 bytes (15 words) - 07:28, 6 December 2008
Page text matches
- #REDIRECT [[Elliptic curve#Mazur's theorem]]44 bytes (5 words) - 15:39, 16 December 2008
- #REDIRECT [[Elliptic curve]]28 bytes (3 words) - 10:14, 17 March 2007
- ...uctor]] and the [[discriminant of an elliptic curve|discriminant]] of an [[elliptic curve]]. In a general form, it is equivalent to the well-known [[ABC conjecture] ...psilon; > 0, there exists a constant ''C''(ε) such that for any elliptic curve ''E'' defined over '''Q''' with minimal discriminant Δ and conductor1 KB (149 words) - 16:21, 11 January 2013
- #REDIRECT [[Elliptic curve#Weierstrass forms]]46 bytes (5 words) - 12:12, 21 December 2008
- #REDIRECT [[Elliptic curve#Mordell-Weil theorem]]49 bytes (5 words) - 15:35, 16 December 2008
- A relationship between the conductor and the discriminant of an elliptic curve.115 bytes (15 words) - 16:09, 27 October 2008
- ...of the height pairing on a generating set for the Mordell–Weil group of an elliptic curve.144 bytes (22 words) - 15:56, 2 January 2009
- {{r|Regulator of an elliptic curve}}141 bytes (19 words) - 11:08, 31 May 2009
- A modular form arising from the discriminant of an elliptic curve: a cusp form of weight 12 and level 1 for the full modular group and a Heck189 bytes (30 words) - 16:26, 3 December 2008
- {{r|Discriminant of an elliptic curve}}136 bytes (19 words) - 11:05, 31 May 2009
- As 1-dimensional abelian varieties, [[elliptic curve]]s provide a convenient introduction to the theory. If <math>\phi: E_1 \ri Let ''E''<sub>1</sub> be an elliptic curve over a field ''K'' of [[characteristic of a field|characteristic]] not 2 or4 KB (647 words) - 15:51, 7 February 2009
- {{r|Elliptic curve}}544 bytes (68 words) - 20:02, 11 January 2010
- {{rpl|Conductor of an elliptic curve}}226 bytes (31 words) - 04:16, 26 September 2013
- {{r|Elliptic curve}}463 bytes (59 words) - 20:58, 11 January 2010
- {{r|Elliptic curve}}495 bytes (62 words) - 20:02, 11 January 2010
- {{r|Elliptic curve}}490 bytes (62 words) - 16:49, 11 January 2010
- {{r|Elliptic curve}}482 bytes (62 words) - 07:45, 8 January 2010
- {{r|Elliptic curve}}498 bytes (63 words) - 18:00, 11 January 2010
- ** [[Algebraic curve]] of [[genus (geometry)|genus]] one versus [[elliptic curve]].1 KB (168 words) - 12:06, 22 November 2008
- An '''elliptic curve''' over a [[field (mathematics)|field]] <math>K</math> is a one dimensional ...intersection is to be understood with multiplicities. The addition on the elliptic curve <math>E</math> is defined as <math>p+q:=O*(p*q)</math>. Both the commutativ10 KB (1,637 words) - 16:03, 17 December 2008