Explicit p-adic Hodge theory for elliptic curves and non-split Cartan images

Abstract

Let E/Qp be an elliptic curve whose mod p Galois image is contained in the normaliser of a non-split Cartan. We classify the possible p-adic images of E using tools from p-adic Hodge theory via a careful analysis of the local Galois structure of the p-power torsion of E. We pay special attention to the case where E has potentially supersingular reduction, where we give an algorithm to determine the corresponding filtered (φ,Gal(K/Qp))-module from a Weierstrass model (which appears to be novel), and introduce alternative division polynomials that may be of independent interest. We deduce global consequences for elliptic curves E/Q: when the mod p representation of E has non-split Cartan image and E doesn't have CM, the p-adic image must be the full preimage of the normaliser of a mod pn non-split Cartan for some n ≥ 1. As an application, we sharpen existing bounds on the adelic image in terms of the Weil height of the j-invariant.