Effective bounds for adelic Galois representations attached to elliptic curves over the rationals

Abstract

Given an elliptic curve E defined over Q without complex multiplication, we provide an explicit sharp bound on the index of the image of the adelic representation ρE. In particular, if hF(E) is the stable Faltings height of E, we show that [GL2(Z) : ImρE] is bounded above by 1021 (hF(E)+40)4.42, and, for hF(E) tending to infinity, by hF(E)3+o(1). We also classify the possible (conjecturally non-existent) images of the representations ρE,pn whenever ImρE,p is contained in the normaliser of a non-split Cartan. This result improves previous work of Zywina and Lombardo.