Entanglement of elliptic curves upon base extension

Abstract

Fix distinct primes p and q and let E be an elliptic curve defined over a number field K. The (p,q)-entanglement type of E over K is the isomorphism class of the group Gal(K(E[p]) K(E[q])/K). The size of this group measures the extent to which the image of the mod pq Galois representation attached to E fails to be a direct product of the mod p and mod q images. In this article, we study how the (p,q)-entanglement group varies over different base fields. We prove that for each prime dividing the greatest common divisor of the size of the mod p and q images, there are infinitely many fields L/K such that the entanglement over L is cyclic of order . We also classify all possible (2,q)-entanglement types that can occur as the base field L varies.