Explicit isomorphisms for a Herr-type complex over a metabelian extension
Abstract
Let S be a Banach algebra over Qp whose residue fields are finite extensions of Qp. Given an arithmetic family V of Galois representations, i.e., a finite free S-module V with a continuous action of the absolute Galois group of a p-adic number field, we construct a complex associated to V over false-Tate extensions and construct explicit isomorphisms between its cohomology and the Galois cohomology. This recovers earlier results by Tavares Ribeiro when S is a finite extension of Qp.
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