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