On some mod p representations of quaternion algebra over Qp

Abstract

Let F be a totally real field in which p is unramified and B be a quaternion algebra which splits at at most one infinite place. Let r:Gal(F/F) GL2(Fp) be a modular Galois representation which satisfies the Taylor-Wiles hypotheses. Assume that for some fixed place v|p, B ramifies at v and Fv is isomorphic to Qp and r is generic at v. We prove that the admissible smooth representations of the quaternion algebra over Qp coming from mod p cohomology of Shimura varieties associated to B have Gelfand-Kirillov dimension 1. As an application we prove that the degree two Scholze's functor vanishes on supersingular representations of GL2(Qp). We also prove some finer structure theorem about the image of Scholze's functor in the reducible case.