Langlands group
In mathematics, the Langlands group is a conjectural group attached to each local or global field that satisfies properties similar to those of the Weil group. It was named after Robert Langlands by Robert Kottwitz. In Kottwitz's formulation, the Langlands group should be an extension of the Weil group by a compact group. When is local archimedean, is the Weil group of , when is local non-archimedean, is the product of the Weil group of with SU(2). When is global, the existence of is still conjectural, though James Arthur gives a conjectural description of it.[1] The Langlands correspondence for is a "natural" correspondence between the irreducible -dimensional complex representations of and, in the global case, the cuspidal automorphic representations of , where denotes the adeles of .[2]
Notes
- ^ Arthur 2002
- ^ Kottwitz 1984, §12
References
- Arthur, James (2002). "A note on the automorphic Langlands group". Canadian Mathematical Bulletin. 45 (4): 466–482. doi:10.4153/CMB-2002-049-1. MR 1941222.
- Kottwitz, Robert (1984). "Stable trace formula: cuspidal tempered terms". Duke Mathematical Journal. 51 (3): 611–650. CiteSeerX 10.1.1.463.719. doi:10.1215/S0012-7094-84-05129-9. MR 0757954.
- Langlands, R. P. (1979). "Automorphic representations, Shimura varieties, and motives. Ein Märchen". In Borel, A.; Casselman, W. (eds.). Automorphic Forms, Representations and L-functions. Proceedings of Symposia in Pure Mathematics. Vol. 33. American Mathematical Society. pp. 205–246. ISBN 978-0-821-81437-6. MR 0546619.