Computing modular correspondences for abelian varieties
Abstract
The aim of this paper is to give a higher dimensional equivalent of the classical modular polynomials . If is the -invariant associated to an elliptic curve over a field then the roots of correspond to the -invariants of the curves which are -isogeneous to . Denote by the modular curve which parametrizes the set of elliptic curves together with a -torsion subgroup. It is possible to interpret as an equation cutting out the image of a certain modular correspondence in the product . Let be a positive integer and . We are interested in the moduli space that we denote by of abelian varieties of dimension over a field together with an ample symmetric line bundle and a symmetric theta structure of type . If is a prime and let , there exists a modular correspondence . We give a system of algebraic equations defining the image of this modular correspondence.
Cite
@article{arxiv.0910.4668,
title = {Computing modular correspondences for abelian varieties},
author = {Jean-Charles Faugère and David Lubicz and Damien Robert},
journal= {arXiv preprint arXiv:0910.4668},
year = {2012}
}