Residual Galois representations of elliptic curves with image contained in the normaliser of a non-split Cartan

Abstract

It is known that if p>37 is a prime number and E/Q is an elliptic curve without complex multiplication, then the image of the mod p Galois representation E,p:Gal(Q/Q)→ GL(E[p]) of E is either the whole of GL(E[p]), or is contained in the normaliser of a non-split Cartan subgroup of GL(E[p]). In this paper, we show that when p>1.4× 107, the image of E,p is either GL(E[p]), or the full normaliser of a non-split Cartan subgroup. We use this to show the following result, partially settling a question of Najman. For d≥ 1, let I(d) denote the set of primes p for which there exists an elliptic curve defined over Q and without complex multiplication admitting a degree p isogeny defined over a number field of degree ≤ d. We show that, for d≥ 1.4× 107, we have I(d)=\p prime:p≤ d-1\.