P. Broussous, V. Sécherre, and S. Stevens

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P. Broussous, V. Sécherre, and S. Stevens

机译：布鲁斯（P. Broussous），史基（V.Sichre）和史蒂文斯（S.Stevens）

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Let $F$ be a locally compact nonarchimedean local field. In this article, we extend to any inner form of $GL_n$ over $F$, with $n1$, the notion of endo-class introduced by Bushnell and Henniart for $GL_n(F)$. We investigate the intertwining relations of simple characters of these groups, in particular their preservation properties under transfer. This allows us to associate to any discrete series representation of an inner form of $GL_n(F)$ an endo-class over $F$. We conjecture that this endo-class is invariant under the local Jacquet-Langlands correspondence.

机译：假设$ F $是一个局部紧凑的非原始本地字段。在本文中，我们扩展到$ GL_n $超过$ F $的任何内部形式，其中$ n > 1 $是Bushnell和Henniart为$ GL_n（ F）$引入的内在类概念。我们研究了这些群体的简单特征之间的交织关系，特别是它们在转移下的保存特性。这使我们可以将任何内部形式$ GL_n（ F）$的内在类超过$ F $的任何离散序列表示形式与之关联。我们推测，在本地Jacquet-Langlands对应关系下，该内层类是不变的。

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《DOCUMENTA MATHEMATICA 》 |2012年第1期| 共56页
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P. Broussous, V. Sécherre, and S. Stevens

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