Serre's genus 50 example
Number Theory
2019-11-15 v1
Abstract
This note presents explicit equations (up to birational equivalence over ) for a complete, smooth, absolutely irreducible curve over of genus satisfying #X(\mathbb{F}_2)=40. In his 1985 Harvard lecture notes on curves over finite fields, J-P.~Serre already showed the existence of such a curve: he used class field theory to describe the function field as a certain abelian extension of the function field of some elliptic curve . Although various more recent texts recall Serre's construction, explicit equations as well as a description of intermediate curves over seem to be new. We also describe explicit equations for a curve over of genus with rational points, and for a curve over of genus with rational points.
Keywords
Cite
@article{arxiv.1911.06209,
title = {Serre's genus 50 example},
author = {Jaap Top},
journal= {arXiv preprint arXiv:1911.06209},
year = {2019}
}
Comments
7 pages