\'Equivalences de Fontaine multivariables Lubin-Tate et plectiques pour un corps local p-adique

Abstract

Let be a finite set. We adapt the techniques of Carter-Kedlaya-Z\'abr\'adi to obtain a multivariable Fontaine equivalence which relates continuous finite dimensional Fq-representations of Πα ∈ GFq(\!(X)\!) to multivariable -modules over a Fq-algebra which is a domain. From this, we deduce a multivariable Lubin-Tate Fontaine equivalence for continuous finite type OK-representations of Πα ∈ GK, where K|Qp is a finite extension. We also obtain a plectic Fontaine equivalence and two equivalences for the subgroup GK,glec of the plectic Galois group.

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