Higher local duality in Galois cohomology
Abstract
A field K is quasi-classical d-local if there exist fields K=kd,…,k0 with ki+1 Henselian admissible discretely valued with residue field ki, and k0 quasi-finite. We prove a duality theorem for the Galois cohomology of such K with many coefficients, including finite coefficients of any order. Previously, such duality was only known in few cases : as a perfect pairing of finite groups for finite coefficients prime to char k0 in general, or for any finite coefficients when k1 is p-adic ; or as a perfect pairing of locally compact Hausdorff groups for the fppf cohomology of finite group schemes when K is local. With no obvious reasonable topology available, we abandon perfectness altogether and instead obtain nondegenerate pairings of abstract abelian groups. This is done with new diagram-chasing results for pairings of torsion groups, allowing a d\'evissage approach which reduces our results to the study of KMr(K)/p× Hd+1-rp(K)/p using results of Kato.
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