Locally analytic vectors in the completed cohomology of quaternionic Shimura curves

Abstract

We use the methods introduced by Lue Pan to study the locally analytic vectors of the completed cohomology of Shimura curves associated to an indefinite quaternion algebra D which is ramified at a prime number p. Let Dp× be the group of units of D at p. Using p-adic uniformization of the quaternionic Shimura curves, we compute the Hecke eigenspace of the completed cohomology with the Hecke eigenvalues associated to a classical automorphic form on another quaternion algebra D (switching invariants of D at p,∞). We present this locally analytic Dp×-representation using the de Rham complex of the Lubin-Tate tower of dimension 1. This is analogous to the Breuil-Strauch conjecture for the group GL2(Qp). We show that the locally analytic Dp×-representation does not detect the Hodge filtration of the local de Rham Galois representation at p in the crystalline case, and also give applications for the locally analytic Jacquet--Langlands correspondence for GL2(Qp) and Dp×.