Galois structure of rings of integers and elliptic curves without complex multiplication (Q1893473)

In a number of recent papers the Galois module structure of rings of integers attached to elliptic curves \(E\) and admitting a rational point of finite order, has been considered. The present paper attempts to give results in the case where the usual assumptions that \(E\) has everywhere good reduction and that \(E\) has complex multiplication, are dropped. Conditions are given which imply that the ring of integers in the top field of the extension is a free module over the associated order.