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| has gloss | eng: In mathematics, the Arthur-Selberg trace formula is a generalization of the Selberg trace formula from the group SL2 to arbitrary reductive groups over global fields, developed by James Arthur in a long series of papers from 1974 to 2003. It describes the character of the representation of G(A) on the discrete part L(G(F)∖G(A)) of L2(G(F)∖G(A)) in terms of geometric data, where G is a reductive algebraic group defined over a global field F and A is the ring of adeles of F. |
| lexicalization | eng: Arthur Selberg trace formula |
| lexicalization | eng: Arthur-Selberg trace formula |
| lexicalization | eng: Arthur–Selberg trace formula |
| instance of | e/Automorphic form |
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