The Global Jacquet-Langlands Correspondence via Tensor Products

Abstract

We prove that the global Jacquet--Langlands correspondence JL for GL(2) can be realized via tensor products over Hecke algebras. Let G be a non-split inner form of GL(2) over a number field. Using the similitude theta correspondence, the space L2(D(A)× A×) acquires the structure of a G(A)-(G(A)× GL(2,A)) bimodule such that L2(G(F) G(A),)H(G)L2(D(A)× A×)~~π∈ A(G,-1) π JL(π). This decomposition into irreducible representations of G(A)× GL(2,A) recovers the full global Jacquet-Langlands correspondence.