English

$\mathbb Q$-curves over odd degree number fields

Number Theory 2021-09-15 v6

Abstract

By reformulating and extending results of Elkies, we prove some results on Q\mathbb Q-curves over number fields of odd degree. We show that, over such fields, the only prime isogeny degrees~\ell which an elliptic curve without CM may have are those degrees which are already possible over~Q\mathbb Q itself (in particular, 37\ell\le37), and we show the existence of a bound on the degrees of cyclic isogenies between Q\mathbb Q-curves depending only on the degree of the field. We also prove that the only possible torsion groups of Q\mathbb Q-curves over number fields of degree not divisible by a prime 7\ell\leq 7 are the 1515 groups that appear as torsion groups of elliptic curves over Q\mathbb Q. Complementing these theoretical results we give an algorithm for establishing whether any given elliptic curve EE is a Q\mathbb Q-curve, which involves working only over Q(j(E))\mathbb Q(j(E)).

Keywords

Cite

@article{arxiv.2004.10054,
  title  = {$\mathbb Q$-curves over odd degree number fields},
  author = {John Cremona and Filip Najman},
  journal= {arXiv preprint arXiv:2004.10054},
  year   = {2021}
}

Comments

22 pages, to appear in Research in Number Theory

R2 v1 2026-06-23T15:00:00.676Z