An l-adic norm residue epimorphism theorem
Abstract
We show that the continuous \'etale cohomology groups Hncont(X,Zl(n)) of smooth varieties X over a finite field k are spanned as Zl-modules by the n-th Milnor K-sheaf locally for the Zariski topology, for all n 0. Here l is a prime invertible in k. This is the first general unconditional result towards the conjectures of arXiv:math/9801017 (math.AG) which put together the Tate and the Beilinson conjectures relative to algebraic cycles on smooth projective k-varieties.
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