Rank of an elliptic curve

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1Introduction The present work grew out of an entirely unsuccessful attempt to answer some basic questions about elliptic curves over $. Start with an elliptic curve E over $, say given by a Weierstrass equation E: y2 = 4

Introduction The present work grew out of an entirely unsuccessful attempt to answer some basic questions about elliptic curves over $. Start with an elliptic curve E over $, say given by a Weierstrass equation E: y2 = 4

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Source URL: web.math.princeton.edu

Language: English - Date: 2001-03-31 11:30:21
2The Weierstrass subgroup of a curve has maximal rank. Martine Girard, David R. Kohel and Christophe Ritzenthaler ∗†‡  Abstract We show that the Weierstrass points of the generic curve of genus g over an algebraical

The Weierstrass subgroup of a curve has maximal rank. Martine Girard, David R. Kohel and Christophe Ritzenthaler ∗†‡ Abstract We show that the Weierstrass points of the generic curve of genus g over an algebraical

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Source URL: iml.univ-mrs.fr

Language: English - Date: 2005-04-05 00:17:59
3Twisted L-Functions and Monodromy  Nicholas M. Katz Contents Introduction

Twisted L-Functions and Monodromy Nicholas M. Katz Contents Introduction

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Source URL: web.math.princeton.edu

Language: English - Date: 2001-11-05 12:32:04
4REDUCTIONS OF POINTS ON ELLIPTIC CURVES AMIR AKBARY, DRAGOS GHIOCA, AND V. KUMAR MURTY Abstract. Let E be an elliptic curve defined over Q. Let Γ be a subgroup of rank r of the ¯ be the reduction group of rational poin

REDUCTIONS OF POINTS ON ELLIPTIC CURVES AMIR AKBARY, DRAGOS GHIOCA, AND V. KUMAR MURTY Abstract. Let E be an elliptic curve defined over Q. Let Γ be a subgroup of rank r of the ¯ be the reduction group of rational poin

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Source URL: www.cs.uleth.ca

Language: English - Date: 2012-08-16 19:45:23
    5On the Conjecture of Birch and Swinnerton-Dyer for an Elliptic Curve of Rank 3 Author(s): Joe P. Buhler, Benedict H. Gross, Don B. Zagier Source: Mathematics of Computation, Vol. 44, NoApr., 1985), ppPub

    On the Conjecture of Birch and Swinnerton-Dyer for an Elliptic Curve of Rank 3 Author(s): Joe P. Buhler, Benedict H. Gross, Don B. Zagier Source: Mathematics of Computation, Vol. 44, NoApr., 1985), ppPub

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    Source URL: people.mpim-bonn.mpg.de

    Language: English - Date: 2011-05-19 11:41:14
      6Annales Mathematicae et Informaticae[removed]pp. 145–153 http://ami.ektf.hu The rank of certain subfamilies of the elliptic curve Y 2 = X 3 − X + T 2∗

      Annales Mathematicae et Informaticae[removed]pp. 145–153 http://ami.ektf.hu The rank of certain subfamilies of the elliptic curve Y 2 = X 3 − X + T 2∗

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      Source URL: ami.ektf.hu

      Language: English - Date: 2012-12-19 11:45:10