关于$p$进Coxeter轨道的分解

Pub Date : 2023-09-27 DOI:10.46298/epiga.2023.8562

Alexander B. Ivanov

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引用次数: 2

摘要

在非阿基米德局部域上，分析了[Iva21]中引入的$p$-adic Deligne—Lusztig空间$X_w(b)$在非阿基米德局部域上的几何性质。证明了当${\bf G}$为经典，$b$为基本，$w$为科塞特时，$X_w(b)$分解为某积分$p$-进阶Deligne—Lusztig空间的平移的不相交并。在此过程中，我们将DeBacker和Reeder关于非分枝环面的有理共轭类的一些观察推广到扩展的纯内形式的情况，并证明了Frobenius-twisted Steinberg横截面的一个循环版本。

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On a decomposition of $p$-adic Coxeter orbits

We analyze the geometry of some $p$-adic Deligne--Lusztig spaces $X_w(b)$ introduced in [Iva21] attached to an unramified reductive group ${\bf G}$ over a non-archimedean local field. We prove that when ${\bf G}$ is classical, $b$ basic and $w$ Coxeter, $X_w(b)$ decomposes as a disjoint union of translates of a certain integral $p$-adic Deligne--Lusztig space. Along the way we extend some observations of DeBacker and Reeder on rational conjugacy classes of unramified tori to the case of extended pure inner forms, and prove a loop version of Frobenius-twisted Steinberg's cross section.

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