Von Neumann Dimensions and Trace Formulas II: A Jacquet-Langlands correspondence for Arithmetic Group Algebras in GL(2)
Abstract
We propose a global Jacquet-Langlands correspondence for the modules over the von Neumann algebras of S-arithmetic subgroups of GL(2) and of a quaternion algebra D, which are both defined over a totally real number field F. If a representation π'=π'v of D×(AF) corresponds to a representation π= πv of GL(2,AF), we have L(SL(2,OS))πSCπ'S=|ζD(0)ζF(0)|, where ζF,ζD are the zeta functions of F,D respectively.
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