Bounds on multiplicities of symmetric pairs of finite groups

IF 1.2 2区数学 Q1 MATHEMATICS Forum of Mathematics Sigma Pub Date : 2024-09-09 DOI:10.1017/fms.2024.58

Avraham Aizenbud, Nir Avni

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Abstract

Let

$\Gamma $

be a finite group, let

$\theta $

be an involution of

$\Gamma $

and let

$\rho $

be an irreducible complex representation of

$\Gamma $

. We bound

${\operatorname {dim}} \rho ^{\Gamma ^{\theta }}$

in terms of the smallest dimension of a faithful

$\mathbb {F}_p$

-representation of

$\Gamma /\operatorname {\mathrm {Rad}}_p(\Gamma )$

, where p is any odd prime and

$\operatorname {\mathrm {Rad}}_p(\Gamma )$

is the maximal normal p-subgroup of

$\Gamma $

. This implies, in particular, that if

$\mathbf {G}$

is a group scheme over

$\mathbb {Z}$

and

$\theta $

is an involution of

$\mathbf {G}$

, then the multiplicity of any irreducible representation in

$C^\infty \left( \mathbf {G}(\mathbb {Z}_p)/ \mathbf {G} ^{\theta }(\mathbb {Z}_p) \right)$

is bounded, uniformly in p.

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有限群对称对的乘数界值

让 $\Gamma $ 是一个有限群，让 $\theta $ 是 $\Gamma $ 的一个反卷，让 $\rho $ 是 $\Gamma $ 的一个不可还原复代表。我们将 ${operatorname {dim}\的最小维度，其中 p 是任意奇素数，$operatorname {\mathrm {Rad}}_p(\Gamma )$ 是 $Gamma $ 的最大法向 p 子群。这就意味着，如果 $\mathbf {G}$ 是一个在 $\mathbb {Z}$ 上的群方案，并且 $\theta $ 是 $\mathbf {G}$ 的一个内卷，那么在 $C^\infty \left( \mathbf {G}(\mathbb {Z}_p)/ \mathbf {G} 中的任何不可还原表征的多重性就是 $C^\infty \left( \mathbf {G}(\mathbb {Z}_p)/ \mathbf {G})^{\theta }(\mathbb {Z}_p) \right)$ 是有界的，在 p 中均匀分布。

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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来源期刊

Forum of Mathematics Sigma Mathematics-Statistics and Probability

CiteScore

1.90

自引率

5.90%

发文量

审稿时长

40 weeks

期刊介绍： Forum of Mathematics, Sigma is the open access alternative to the leading specialist mathematics journals. Editorial decisions are made by dedicated clusters of editors concentrated in the following areas: foundations of mathematics, discrete mathematics, algebra, number theory, algebraic and complex geometry, differential geometry and geometric analysis, topology, analysis, probability, differential equations, computational mathematics, applied analysis, mathematical physics, and theoretical computer science. This classification exists to aid the peer review process. Contributions which do not neatly fit within these categories are still welcome. Forum of Mathematics, Pi and Forum of Mathematics, Sigma are an exciting new development in journal publishing. Together they offer fully open access publication combined with peer-review standards set by an international editorial board of the highest calibre, and all backed by Cambridge University Press and our commitment to quality. Strong research papers from all parts of pure mathematics and related areas will be welcomed. All published papers will be free online to readers in perpetuity.

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