Stability of torsion subgroups of elliptic curves over non-Galois extensions of odd prime degree

Abstract

Let K be a field of characteristic 0 and E/K an elliptic curve over K. For a finite extension L/K and a prime~, we provide Galois-theoretic sufficient conditions on L/K under which E(L)[∞] = E(K)[∞]. For a non-Galois extension L/K of prime degree, we relate the growth of the ∞-torsion subgroup of E under the base change L/K to the image of the mod- cyclotomic character. In particular, In particular, we refine Gonz\'alez-Jim\'enez's result by ruling out certain torsion structures for quintic non-Galois extensions L/Q.

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