Density of Elliptic Curves over Number Fields with Prescribed Torsion Subgroups

Abstract

Let K be a number field. For positive integers m and n such that m n, we let Sm,n be the set of elliptic curves E/K defined over K such that E(K)tors⊃eq T Z/mZ× Z/nZ. We prove that if the genus of the modular curve X1(m,n) is 0, then `almost all' E∈ Sm,n satisfy that E(K)tors= T, i.e., not larger than T. In particular, if m=n=1, this result generalizes Duke's theorem over Q to arbitrary number fields K for the trivial torsion subgroup.