Hodge filtration and crystalline representations of GLn

Abstract

Let p be a prime number, n an integer ≥ 2 and an n-dimensional automorphic p-adic Galois representation (for a compact unitary group) such that r:=Gal(Qp/Qp) is crystalline. Under a mild assumption on the Frobenius eigenvalues of D:=Dcris(r) and under the usual Taylor-Wiles conditions, we show that the locally analytic representation of GLn(Qp) associated to in the corresponding Hecke eigenspace of the completed H0 contains an explicit finite length subrepresentation which determines and only depends on r. This generalizes previous results of the second author which assumed that the Hodge filtration on D was as generic as possible. Our approach provides a much more explicit link to this Hodge filtration (in all cases), which allows to study the internal structure of this finite length locally analytic subrepresentation.

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