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In mathematics, endoscopic groups of reduc … In mathematics, endoscopic groups of reductive algebraic groups were introduced by Robert Langlands in his work on the stable trace formula. Roughly speaking, an endoscopic group H of G is a quasi-split group whose L-group is the connected component of the centralizer of a semisimple element of the L-group of G. In the stable trace formula, unstable orbital integrals on a group G correspond to stable orbital integrals on its endoscopic groups H. The relation between them is given by the fundamental lemma.en them is given by the fundamental lemma.
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https://books.google.com/books%3Fid=NYxAtwAACAAJ +
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, http://muse.jhu.edu/journals/american_journal_of_mathematics/info/supplement.html +
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Robert Langlands
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Robert
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Langlands
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1979
, 1983
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| rdfs:comment |
In mathematics, endoscopic groups of reduc … In mathematics, endoscopic groups of reductive algebraic groups were introduced by Robert Langlands in his work on the stable trace formula. Roughly speaking, an endoscopic group H of G is a quasi-split group whose L-group is the connected component of the centralizer of a semisimple element of the L-group of G. In the stable trace formula, unstable orbital integrals on a group G correspond to stable orbital integrals on its endoscopic groups H. The relation between them is given by the fundamental lemma.en them is given by the fundamental lemma.
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Endoscopic group
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