L-invariants and local-global compatibility for the group GL2/F

Abstract

Let F be a totally real number field, a place of F above p. Let be a 2-dimensional p-adic representation of Gal(F/F) which appears in the \'etale cohomology of quaternion Shimura curves (thus is associated to Hilbert eigenforms). When the restriction :=|D at the decomposition group of is semi-stable non-crystalline, one can associate to the so-called Fontaine-Mazur L-invariants, which are however invisible in the classical local Langlands correspondence. In this paper, we prove one can find these L-invariants in the completed cohomology group of quaternion Shimura curves, which generalizes some of Breuil's results in GL2/Q-case.