On 7-adic Galois representations for elliptic curves over Q

Abstract

In recent years, significant progress has been made on Mazur's Program B, with many authors beginning a systematic classification of all possible images of p-adic Galois representations attached to elliptic curves over Q. Currently, the classification is only complete for p ∈ \2,3,13,17\. The main difficulty for other primes arises from the need to understand elliptic curves whose mod-pn Galois representations are contained in the normaliser of a non-split Cartan subgroup. Equivalently, this amounts to determining the rational points on the modular curves Xns+(pn). Here, we consider the case p=7 and show that the modular curve Xns+(49), of genus 69, has no non-CM rational points. To achieve this, we establish a correspondence between the rational points on Xns+(49) and the primitive integer solutions of the generalised Fermat equation a2 + 28b3 = 27 c7, the resolution of which can be reduced to determining the rational points of several genus-three curves. Furthermore, we reduce the complete classification of 7-adic images to the determination of the rational points of a single plane quartic.