$\mathrm U(p,q)$ 阿瑟包的莫格林-勒纳参数化的非消失条件

arXiv - MATH - Representation Theory Pub Date : 2024-09-14 DOI:arxiv-2409.09358

Chang Huang

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引用次数: 0

摘要

Mogelin-Renard 通过同调归纳在好奇偶性情况下对单元群的 A 包进行参数化。每个参数都会产生一个 $A_{\mathfrakq}(\lambda)$，而这个 $A_{\mathfrakq}(\lambda)$要么是 $0，要么是不可还原的。特拉帕提出了一种算法来确定$\mathrm U(p, q)$的一个中值$A_{\mathfrak q}(\lambda)$ 是否为零。基于他的结果，我们提出了对莫格林-勒纳参数化的非消失条件的进一步理解。我们的准则是一个线性约束系统，与 $p$-adiccase 非常相似。

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Non-vanishing condition on Mogelin-Renard's parametrization for Arthur packets of $\mathrm U(p,q)$

Mogelin-Renard parametrize A-packet of unitary group through cohomological induction in good parity case. Each parameter gives rise to an $A_{\mathfrak q}(\lambda)$ which is either $0$ or irreducible. Trapa proposed an algorithm to determine whether a mediocre $A_{\mathfrak q}(\lambda)$ of $\mathrm U(p, q)$ is non-zero. Based on his result, we present a further understanding of the non-vanishing condition of Mogelin-Renard's parametrization. Our criterion come out to be a system of linear constraints, and very similiar to the $p$-adic case.

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arXiv - MATH - Representation Theory

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