English

Modular Curves with many Points over Finite Fields

Number Theory 2024-02-07 v5

Abstract

We describe an algorithm to compute the number of points over finite fields on a broad class of modular curves: we consider quotients XH/WX_H/W for HH a subgroup of \GL2(Z/nZ)\GL_2(\mathbb Z/n\mathbb Z) such that for each prime pp dividing nn, the subgroup HH at pp is either a Borel subroup, a Cartan subgroup, or the normalizer of a Cartan subgroup of \GL2(Z/peZ)\GL_2(\mathbb Z/p^e\mathbb Z), and for WW any subgroup of the Atkin-Lehner involutions of XHX_H. We applied our algorithm to more than ten thousands curves of genus up to 50, finding more than one hundred record-breaking curves, namely curves X/\FFqX/\FF_q with genus gg that improve the previously known lower bound for the maximum number of points over \FFq\FF_q of a curve with genus gg. As a key technical tool for our computations, we prove the generalization of Chen's isogeny to all the Cartan modular curves of composite level.

Keywords

Cite

@article{arxiv.1603.07489,
  title  = {Modular Curves with many Points over Finite Fields},
  author = {Valerio Dose and Guido Lido and Pietro Mercuri and Claudio Stirpe},
  journal= {arXiv preprint arXiv:1603.07489},
  year   = {2024}
}
R2 v1 2026-06-22T13:17:46.546Z