Cartan images and -torsion points of elliptic curves with rational j-invariant
Abstract
Let be an odd prime and d a positive integer. We determine when there exists a degree-d number field K and an elliptic curve E/K with j(E)∈Q\0,1728\ for which E(K)tors contains a point of order . We also determine when there exists such a pair (K,E) for which the image of the associated mod- Galois representation is contained in a Cartan subgroup or its normalizer, conditionally on a conjecture of Sutherland. We do the same under the stronger assumption that E is defined over Q.
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