On non-commutative twisting in etale and motivic cohomology
Abstract
In this paper we use ideas of the non-abelian Iwasawa main conjecture to prove a result about the first Galois cohomology of continuous Galois modules Vp(j) for large Tate-twist j and Vp a Qp vector space. We show that under a technical hypothesis that H1(K, Vp(j)) is generated by twists of norm-compatible units in an infinite tower of number fields with elements in Vp(j-1). This confirms a consequence of the non-abelian Iwasawa main conjecture. Using the "Bloch-Kato-conjecture" a similar result is proven for motivic cohomology with finite coefficients.
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