The Langlands Classification and Irreducible Characters for Real Reductive Groups 1992nd ed.(Progress in Mathematics Vol.104) H
Adams, J.,
Barbasch, D.,
Vogan, D.A.
著
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在庫状況
海外在庫有り
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お届け予定日
1ヶ月
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価格
\37,137(税込)
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発行年月 |
1992年05月 |
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出版社/提供元 |
Birkhauser Boston |
出版国 |
アメリカ合衆国 |
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言語 |
英語 |
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媒体 |
冊子 |
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装丁 |
hardcover |
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ページ数/巻数 |
XII, 320 p. |
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ジャンル |
洋書/理工学/数学/代数学 |
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ISBN |
9780817636340 |
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商品コード |
0209210638 |
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本の性格 |
学術書 |
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商品URL | https://kw.maruzen.co.jp/ims/itemDetail.html?itmCd=0209210638 |
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内容
IIunit(G(R)) :::> IItemp(G(R)) (1. 1) to be the set ofequivalence classes ofirreducible admissible (respectively unitary or tempered) representations of G(R). Now define (G(R)) :::> temp(G(R)) (1. 2) to be the set ofLanglands parameters for irreducible admissible (respec tively tempered) representations of G(R) (see [34], [10], [1]' Chapter 5, and Definition 22. 3). To each ¢ E (G(R)), Langlands attaches a finite set II C II(G(R)), called an L-packet of representations. The L-packets II partition II(G(R)). If ¢ E temp(G(R)), then the representations in II are all tempered, and in this way one gets also a partition of II (G(R)). temp Now the classification of the unitary representations of G(IR) is one of the most interesting unsolved problems in harmonic analysis.