Langlands reciprocity for C*-algebras
Abstract
We introduce a C*-algebra AV of a variety V over the number field K and a C*-algebra AG of a reductive group G over the ring of adeles of K. Using Pimsner's Theorem we construct an embedding AV AG, where V is a G-coherent variety, e.g. the Shimura variety of G. The embedding is an analog of the Langlands reciprocity for C*-algebras. It follows from the K-theory of the inclusion AV⊂AG that the Hasse-Weil L-function of V is a product of the automorphic L-functions corresponding to irreducible representations of the group G.
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