Explicit open images for elliptic curves over Q

Abstract

For a non-CM elliptic curve E defined over Q, the Galois action on its torsion points gives rise to a Galois representation E: Gal(Q/Q) GL2(Z) that is unique up to isomorphism. A renowned theorem of Serre says that the image of E is an open, and hence finite index, subgroup of GL2(Z). We describe an algorithm that computes the image of E up to conjugacy in GL2(Z); this algorithm is practical and has been implemented. Up to a positive answer to a uniformity question of Serre and finding all the rational points on a finite number of explicit modular curves of genus at least 2, we give a complete classification of the groups E(Gal(Q/Q)) SL2(Z) and the indices [GL2(Z):E(Gal(Q/Q))] for non-CM elliptic curves E/Q. Much of the paper is dedicated to the efficient computation of modular curves via modular forms expressed in terms of Eisenstein series.