Uniform bounds on the image of the arboreal Galois representations attached to non-CM elliptic curves

Abstract

Let be a prime number and let F be a number field and E/F a non-CM elliptic curve with a point α ∈ E(F) of infinite order. Attached to the pair (E,α) is the -adic arboreal Galois representation ωE,α,∞ : Gal(F/F) Z2 GL2(Z) describing the action of Gal(F/F) on points βn so that n βn = α. We give an explicit bound on the index of the image of ωE,α,∞ depending on how -divisible the point α is, and the image of the ordinary -adic Galois representation. The image of ωE,α,∞ is connected with the density of primes p for which α ∈ E(Fp) has order coprime to .