Torsion subgroups of CM elliptic curves over odd degree number fields

Abstract

Let G CM(d) denote the collection of groups (up to isomorphism) that appear as the torsion subgroup of a CM elliptic curve over a degree d number field. We completely determine G CM(d) for odd integers d and deduce a number of statistical theorems about the behavior of torsion subgroups of CM elliptic curves. Here are three examples: (1) For each odd d, the set of natural numbers d' with G CM(d') = G CM(d) possesses a well-defined, positive asymptotic density. (2) Let T CM(d) = G ∈ G CM(d) \#G; under the Generalized Riemann Hypothesis, (12eγπ)2/3 d∞\ odd T CM(d)(dd)2/3 (24eγπ)2/3. (3) For each ε > 0, we have \#G CM(d) ε dε for all odd d; on the other hand, for each A> 0, we have \#G CM(d) > (d)A for infinitely many odd d.