Multivariable (q,OK×)-modules associated to p-adic representations of Gal(K/K)
Abstract
Let K be an unramified extension of Qp, and E a finite extension of K with ring of integers OE. We associate to every finite type continuous OE-representation of Gal(K/K) an \'etale (q,OK×)-module DAmv,E(0)() over Amv,E, where Amv,E is the p-adic completion of a completed localization of the Iwasawa algebra OE[[OK]]. Furthermore, we prove that the functor DAmv,E(0) is fully faithful and exact. This functor is a p-adic analogue of DA(0) in the recent work of Breuil, Herzig, Hu, Morra and Schraen.
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