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[1] Martine Girard.
The group of Weierstrass points of a plane quartic with at least eight hyperflexes.
Math. Comp.
75
(2006)
1561-1583.
MR 2219046.
Abstract, references, and article information
View Article: PDF
[2] Abdolali Basiri, Andreas Enge, Jean-Charles Faugère and Nicolas Gürel.
The arithmetic of Jacobian groups of superelliptic cubics.
Math. Comp.
74
(2005)
389-410.
MR 2085899.
Abstract, references, and article information
View Article: PDF
[3] Amod Agashe and William Stein; with an Appendix by J. Cremona and B. Mazur.
Visible evidence for the Birch and Swinnerton-Dyer conjecture for modular abelian varieties of analytic rank zero.
Math. Comp.
74
(2005)
455-484.
MR 2085902.
Abstract, references, and article information
View Article: PDF
[4] Kamal Khuri-Makdisi.
Linear algebra algorithms for divisors on an algebraic curve.
Math. Comp.
73
(2004)
333-357.
MR 2034126.
Abstract, references, and article information
View Article: PDF
This article is available free of charge
[5] Andreas Enge.
Computing discrete logarithms in high-genus hyperelliptic Jacobians in provably subexponential time.
Math. Comp.
71
(2002)
729-742.
MR 1885624.
Abstract, references, and article information
View Article: PDF
This article is available free of charge
[6] Andreas Enge and Andreas Stein.
Smooth ideals in hyperelliptic function fields.
Math. Comp.
71
(2002)
1219-1230.
MR 1898752.
Abstract, references, and article information
View Article: PDF
This article is available free of charge
[7] E. Victor Flynn, Franck Leprévost, Edward F. Schaefer, William A. Stein, Michael Stoll and Joseph L. Wetherell.
Empirical evidence for the Birch and Swinnerton-Dyer conjectures for modular Jacobians of genus 2 curves.
Math. Comp.
70
(2001)
1675-1697.
MR 1836926.
Abstract, references, and article information
View Article: PDF
This article is available free of charge
[8] S. D. Galbraith, S. M. Paulus and N. P. Smart.
Arithmetic on superelliptic curves.
Math. Comp.
71
(2002)
393-405.
MR 1863009.
Abstract, references, and article information
View Article: PDF
This article is available free of charge
[9] Sachar Paulus and Hans-Georg Rück.
Real and imaginary quadratic representations of hyperelliptic
function fields.
Math. Comp.
68
(1999)
1233-1241.
MR 1627817.
Abstract, references, and article information
View Article: PDF
This article is available free of charge
[10] David G. Cantor.
Computing in the Jacobian of a hyperelliptic
curve
.
Math. Comp.
48
(1987)
95-101.
MR 866101.
Abstract, references, and article information
View Article: PDF
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