English

Constructing hyperelliptic curves with surjective Galois representations

Number Theory 2019-06-06 v2

Abstract

In this paper we show how to explicitly write down equations of hyperelliptic curves over Q such that for all odd primes l the image of the mod l Galois representation is the general symplectic group. The proof relies on understanding the action of inertia groups on the l-torsion of the Jacobian, including at primes where the Jacobian has non-semistable reduction. We also give a framework for systematically dealing with primitivity of symplectic mod l Galois representations. The main result of the paper is the following. Suppose n=2g+2 is an even integer that can be written as a sum of two primes in two different ways, with none of the primes being the largest primes less than n (this hypothesis appears to hold for all g different from 0,1,2,3,4,5,7 and 13). Then there is an explicit integer N and an explicit monic polynomial f0(x)Z[x]f_0(x)\in \mathbb{Z}[x] of degree n, such that the Jacobian JJ of every curve of the form y2=f(x)y^2=f(x) has Gal(Q(J[l])/Q)GSp2g(Fl)Gal(\mathbb{Q}(J[l])/\mathbb{Q})\cong GSp_{2g}(\mathbb{F}_l) for all odd primes l and Gal(Q(J[2])/Q)S2g+2Gal(\mathbb{Q}(J[2])/\mathbb{Q})\cong S_{2g+2}, whenever f(x)Z[x]f(x)\in\mathbb{Z}[x] is monic with f(x)f0(x)modNf(x)\equiv f_0(x) \bmod{N} and with no roots of multiplicity greater than 22 in Fp\overline{\mathbb{F}}_p for any p not dividing N.

Keywords

Cite

@article{arxiv.1701.05915,
  title  = {Constructing hyperelliptic curves with surjective Galois representations},
  author = {Samuele Anni and Vladimir Dokchitser},
  journal= {arXiv preprint arXiv:1701.05915},
  year   = {2019}
}

Comments

24 pages, minor corrections

R2 v1 2026-06-22T17:55:33.734Z