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Calcul du nombre de points sur une courbe elliptique dans un corps fini : aspects algorithmiques

François Morain (1995)

Journal de théorie des nombres de Bordeaux

Nous décrivons dans cet article les algorithmes nécessaires à une implantation efficace de la méthode de Schoof pour le calcul du nombre de points sur une courbe elliptique dans un corps fini. Nous tentons d’unifier pour cela les idées d’Atkin et d’Elkies. En particulier, nous décrivons le calcul d’équations pour $X_{0} (ℓ)$ , $ℓ$ premier, ainsi que le calcul efficace de facteurs des polynômes de division d’une courbe elliptique.

Computations with Witt vectors of length $3$

Luís R. A. Finotti (2011)

Journal de Théorie des Nombres de Bordeaux

In this paper we describe how to perform computations with Witt vectors of length $3$ in an efficient way and give a formula that allows us to compute the third coordinate of the Greenberg transform of a polynomial directly. We apply these results to obtain information on the third coordinate of the $j$ -invariant of the canonical lifting as a function on the $j$ -invariant of the ordinary elliptic curve in characteristic $p$ .

Computing Igusa's local zeta functions of univariate polynomials, and linear feedback shift registers.

Zuniga-Galindo, W. A. (2003)

Journal of Integer Sequences [electronic only]

Computing integral points on Mordell's elliptic curves.

J. Gebel, A. Pethö, H. G. Zimmer (1997)

Collectanea Mathematica

Computing periods of cusp forms and modular elliptic curves.

Cremona, John E. (1997)

Experimental Mathematics

Corps sextiques contenant un corps cubique (III)

Michel Olivier (1991)

Journal de théorie des nombres de Bordeaux

Counting points in medium characteristic using Kedlaya's algorithm.

Gaudry, Pierrick, Gürel, Nicolas (2003)

Experimental Mathematics

Counting points on elliptic curves over finite fields

René Schoof (1995)

Journal de théorie des nombres de Bordeaux

We describe three algorithms to count the number of points on an elliptic curve over a finite field. The first one is very practical when the finite field is not too large ; it is based on Shanks's baby-step-giant-step strategy. The second algorithm is very efficient when the endomorphism ring of the curve is known. It exploits the natural lattice structure of this ring. The third algorithm is based on calculations with the torsion points of the elliptic curve [18]. This deterministic polynomial...

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