Pinned Repositories
endomorphisms
Rigorous computation of the endomorphism ring of a Jacobian
arithmetic-geometric_mean
Calculation of period matrices via the arithmetic-geometric mean
curve_reconstruction
Geometric and arithmetic reconstruction of curves from their period matrices
gluing
A Magma package for gluing curves of low genus along their torsion
heuristic_endomorphisms
Heuristic determination of endomorphism rings of curves
hyperelliptic
A Magma repository for reconstruction and isomorphisms of hyperelliptic curves
picard_curves
Picard curves and databases
quartic
A Magma package for calculating with smooth plane quartic curves
JRSijsling's Repositories
JRSijsling/arithmetic-geometric_mean
Calculation of period matrices via the arithmetic-geometric mean
JRSijsling/curve_reconstruction
Geometric and arithmetic reconstruction of curves from their period matrices
JRSijsling/gluing
A Magma package for gluing curves of low genus along their torsion
JRSijsling/heuristic_endomorphisms
Heuristic determination of endomorphism rings of curves
JRSijsling/hyperelliptic
A Magma repository for reconstruction and isomorphisms of hyperelliptic curves
JRSijsling/picard_curves
Picard curves and databases
JRSijsling/prym
Code for finding a Prym variety with everywhere good reduction
JRSijsling/quartic
A Magma package for calculating with smooth plane quartic curves
JRSijsling/quartic_isomorphisms
Determination of isomorphisms between plane quartic curves
JRSijsling/quartic_reconstruction
A Magma package for reconstructing plane quartics from Dixmier-Ohno invariants
JRSijsling/canmod-1inf
Canonical models of arithmetic (1; inf)-curves
JRSijsling/cm-calculations
A Magma package for calculating with CM curves
JRSijsling/gen3deg2prym
Genus 3 degree 2 Prym morphism
JRSijsling/lmfdb
L-Functions and Modular Forms Database
JRSijsling/parshin_experiments
Some Magma experiments with Parshin covers
JRSijsling/prym_decomposition
A Magma package for realizing Prym varieties as Jacobians
JRSijsling/RiemannSurfaces
Magma package for high-precision computations with Riemann surfaces defined by an affine equation f(x,y)=0 where f \in K[x,y], K number field, or by y^m = f(x), m > 1, f \in \C[x]; Detailled description of all algorithms can be found in my thesis "Efficient integration on Riemann surfaces & applications"