On Galois equivariance of homomorphisms between torsion potentially crystalline representations
Abstract
Let K be a complete discrete valuation field of mixed characteristic (0,p) with perfect residue field. Let (πn)n 0 be a system of p-power roots of a uniformizer π=π0 of K with πpn+1=πn, and define Gs (resp.\ G∞) the absolute Galois group of K(πs) (resp.\ K∞:=n 0 K(πn)). In this paper, we study Gs-equivatiantness properties of G∞-equivariant homomorphisms between torsion (potentially) crystalline representations
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