Adelic openness without the Mumford-Tate conjecture

Abstract

Let X be a non-singular projective variety over a number field K, i a non-negative integer, and V, the etale cohomology of X with coefficients in the ring of finite adeles f over . Assuming the Mumford-Tate conjecture, we formulate a conjecture (Conjecture 1.2) describing the largeness of the image of the absolute Galois group GK in H(f) under the adelic Galois representation : GK -> (V)=n(f), where H is the Hodge group. The motivating example is a celebrated theorem of Serre, which asserts that if X is an elliptic curve without complex multiplication over K and i=1, then (GK) is an open subgroup of 2( )⊂ 2(f). We state and in some cases prove a weaker conjecture which does not require Mumford-Tate but which, together with Mumford-Tate, implies Conjecture 1.2. We also relate our conjectures to Serre's conjectures on maximal motives.