Simple L-invariants for GLn

Abstract

Let L be a finite extension of Qp, and L be an n-dimensional semi-stable non crystalline p-adic representation of GalL with full monodromy rank. Via a study of Breuil's (simple) L-invariants, we attach to L a locally Qp-analytic representation (L) of GLn(L), which carries the exact information of the Fontaine-Mazur simple L-invariants of L. When L comes from an automorphic representation of G(AF+) (for a unitary group G over a totally real filed F+ which is compact at infinite places and GLn at p-adic places), we prove under mild hypothesis that (L) is a subrerpresentation of the associated Hecke-isotypic subspaces of the Banach spaces of p-adic automorphic forms on G(AF+). In other words, we prove the equality of Breuil's simple L-invariants and Fontaine-Mazur simple L-invariants.