A geometric Jacquet-Langlands correspondence for U(2) Shimura varieties

Let G be a unitary group over ℚ, associated to a CM-field F with totally real part F ⁺, with signature (1, 1) at all the archimedean places of F ⁺. Under certain hypotheses on F ⁺, we show that Jacquet-Langlands correspondences between certain automorphic representations of G and representations of a group G′ isomorphic to G except at infinity can be realized in the cohomology of Shimura varieties attached to G and G′.