English

Semistable abelian varieties with small division fields

Number Theory 2007-05-23 v1

Abstract

Let AA be a semistable abelian variety defined over Q{\bf Q} with bad reduction only at one prime pp. Let L=Q(A[])L= {\bf Q}(A[\ell]) be the \ell-division field of AA for a prime \ell not equal to pp and let F=Q(μ)F={\bf Q}(\mu_\ell) be the cyclotomic field generated by the group of th\ell^{th}-roots of unity. We study the varieties AA for which H=Gal(L/F)H={\rm Gal(L/F)} is "small" in the sense that HH is an \ell-group or, more generally, that HH is nilpotent. We show that if =2\ell=2 or 3 and HH is nilpotent then the reduction of AA at pp is totally toroidal, so its conductor is pdimAp^{\dim A}. The Jacobian of the modular curve X0(41)X_0(41) is a simple semistable abelian variety of dimension 3, with bad reduction only at p=41p=41 and the Galois group of its 2-division field is a 2-group. For =2\ell=2, 3 or 5, there exist elliptic curves EE of prime conductor such that Q(E[])=Q(μ2){\bf Q}(E[\ell]) = {\bf Q}(\mu_{2 \ell}). We characterize the abelian varieties that are isogenous to products EdE^d.

Keywords

Cite

@article{arxiv.math/0207309,
  title  = {Semistable abelian varieties with small division fields},
  author = {Armand Brumer and Kenneth Kramer},
  journal= {arXiv preprint arXiv:math/0207309},
  year   = {2007}
}