Bounds for Serre's open image theorem for elliptic curves over number fields
Abstract
For E/K an elliptic curve without complex multiplication we bound the index of the image of Gal(K/K) in GL2(Z), the representation being given by the action on the Tate modules of E at the various primes. The bound is effective and only depends on [K:Q] and on the stable Faltings height of E. We also prove a result relating the structure of subgroups of GL2(Z) to certain Lie algebras naturally attached to them.
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