Locally Algebraic Vectors in the Breuil-herzig Ordinary Part
نویسنده
چکیده
For a fairly general reductive group G/Qp , we explicitly compute the space of locally algebraic vectors in the Breuil-Herzig construction Π(ρ)ord, for a potentially semistable Borel-valued representation ρ of Gal(Q̄p/Qp). The point being we deal with the whole representation, not just its socle – and we go beyond GLn(Qp). In the case of GL2(Qp), this relation is one of the key properties of the p-adic local Langlands correspondence. We give an application to p-adic local-global compatibility for Π(ρ)ord for modular representations, but with no indecomposability assumptions.
منابع مشابه
Locally algebraic vectors in the Breuil – Herzig ordinary part
For a fairly general reductive group G/Qp , we explicitly compute the space of locally algebraic vectors in the Breuil–Herzig construction (ρ)ord , for a potentially semistableBorel-valued representationρ ofGal(Q̄p/Qp). The point beingwedealwith thewhole representation, not just its socle—and we go beyond GLn(Qp). In the case of GL2(Qp), this relation is one of the key properties of the p-adic l...
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