Radical entanglement for elliptic curves

Abstract

Let G be a commutative connected algebraic group over a number field K, let A be a finitely generated and torsion-free subgroup of G(K) of rank r>0 and, for n>1, let K(n-1A) be the smallest extension of K inside an algebraic closure K over which all the points P∈ G( K) such that nP∈ A are defined. We denote by s the unique non-negative integer such that G( K)[n] ( Z/n Z)s for all n≥ 1. We prove that, under certain conditions, the ratio between nrs and the degree [K(n-1A):K(G[n])] is bounded independently of n>1 by a constant that depends only on the -adic Galois representations associated with G and on some arithmetic properties of A as a subgroup of G(K) modulo torsion. In particular we extend the main theorems of [13] about elliptic curves to the case of arbitrary rank.