Growth of torsion of elliptic curves with odd-order torsion over quadratic cyclotomic fields

Abstract

Let K = Q(-3) or Q(-1) and let Cn denote the cyclic group of order n. We study how the torsion part of an elliptic curve over K grows in a quadratic extension of K. In the case E(K)[2] ≈ C1 we investigate how a given torsion structure can grow in a quadratic extension and the maximum number of extensions in which it grows. We also study the torsion structures which occur as the quadratic twist of a given torsion structure. In order to achieve this we examine N-isogenies defined over K for N=15,20,21,24,27,30,35.