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Caractères automorphes d'un groupe réductif (1608.07150v1)

Published 25 Aug 2016 in math.RT

Abstract: Let $G$ be a reductive group defined over a number field. Denote $Z(\hat G)$ the center of the dual group. Langlands has defined some homomorphism from some cohomology group of $Z(\hat G)$ into the group of automorphic characters of $G$. We prove that it is bijective.