Unipotent ℓ-blocks for simply connected p-adic groups

IF 0.9 1区数学 Q2 MATHEMATICS Algebra & Number Theory Pub Date : 2023-09-09 DOI:10.2140/ant.2023.17.1533

Thomas Lanard

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引用次数: 1

Abstract

Let $F$ be a nonarchimedean local field and $G$ the $F$ -points of a connected simply connected reductive group over $F$ . We study the unipotent $ℓ$ -blocks of $G$ , for $ℓ \neq p$ . To that end, we introduce the notion of $(d, 1)$ -series for finite reductive groups. These series form a partition of the irreducible representations and are defined using Harish-Chandra theory and $d$ -Harish-Chandra theory. The $ℓ$ -blocks are then constructed using these $(d, 1)$ -series, with $d$ the order of $q$ modulo $ℓ$ , and consistent systems of idempotents on the Bruhat–Tits building of $G$ . We also describe the stable $ℓ$ -block decomposition of the depth zero category of an unramified classical group.

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Uni强效ℓ-单连通p-adic群的块

设F是非阿基米德局部域，G是F上连通单连通还原群的F-点ℓ-G的块，用于ℓ≠p。为此，我们引入了有限归约群的（d，1）-级数的概念。这些级数形成了不可约表示的一个划分，并使用Harish-Chandra理论和d-Harish-Chandra理论进行了定义。这个ℓ-然后使用这些（d，1）-级数构造块，其中d是q的模阶ℓ, 以及G的Bruhat–Tits构造上的幂等元的一致系统。我们还描述了稳定的ℓ-非分枝经典群的深度零范畴的块分解。

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来源期刊

Algebra & Number Theory MATHEMATICS-

CiteScore

1.80

自引率

7.70%

发文量

审稿时长

6-12 weeks

期刊介绍： ANT’s inclusive definition of algebra and number theory allows it to print research covering a wide range of subtopics, including algebraic and arithmetic geometry. ANT publishes high-quality articles of interest to a broad readership, at a level surpassing all but the top four or five mathematics journals. It exists in both print and electronic forms. The policies of ANT are set by the editorial board — a group of working mathematicians — rather than by a profit-oriented company, so they will remain friendly to mathematicians'' interests. In particular, they will promote broad dissemination, easy electronic access, and permissive use of content to the greatest extent compatible with survival of the journal. All electronic content becomes free and open access 5 years after publication.

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