球面变种的对偶群

Q2 Mathematics

Transactions of the Moscow Mathematical Society Pub Date : 2017-02-27 DOI:10.1090/mosc/270

F. Knop, B. Schalke

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引用次数: 15

摘要

设$X$是连通约化群$G$的球变体。Gaitsgory-Nadler的工作有力地证明了$G$的Langlands对偶群$G^\vee$有一个子群，其Weyl群是$X$的小Weyl群。Sakellaridis-Venkatesh定义了一个精化的对偶群$G^\vee_X$，并在许多情况下证明了从$G^\vee_X$到$G^\vee$之间存在一个同生$\phi$。本文给出了$\phi$的完全一般存在性。我们的方法是纯组合的，并且适用于任意的$G$-变量(尽管标题是这样)。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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The dual group of a spherical variety

Let $X$ be a spherical variety for a connected reductive group $G$. Work of Gaitsgory-Nadler strongly suggests that the Langlands dual group $G^\vee$ of $G$ has a subgroup whose Weyl group is the little Weyl group of $X$. Sakellaridis-Venkatesh defined a refined dual group $G^\vee_X$ and verified in many cases that there exists an isogeny $\phi$ from $G^\vee_X$ to $G^\vee$. In this paper, we establish the existence of $\phi$ in full generality. Our approach is purely combinatorial and works (despite the title) for arbitrary $G$-varieties.

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Transactions of the Moscow Mathematical Society Mathematics-Mathematics (miscellaneous)

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期刊介绍： This journal, a translation of Trudy Moskovskogo Matematicheskogo Obshchestva, contains the results of original research in pure mathematics.