一般自旋群的多重性一定理：阿基米德情况

arXiv - MATH - Representation Theory Pub Date : 2024-09-14 DOI:arxiv-2409.09320

Melissa Emory, Yeansu Kim, Ayan Maiti

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引用次数: 0

摘要

让$\GSpin(V)$ (resp. $\GPin(V)$)是一个与阿基米德局部域$F$上维数为$n的非enerate二次元空间$V$相关联的一般自旋群（res. a general Pin group）。对于维数为 $n-1$ over $F$ 的非enerate 二次空间 $W$，我们也考虑 $GSpin(W)$ 和 $GPin(W)$。我们证明了一对群（$\GSpin(V), \GSpin(W)$）和一对群（$\GPin(V), \GPin(W)$）在阿基米德情况下的多重性定理；即，我们证明了对 $\GSpin(W)$ 的限制（respect.的一个不可还原的卡塞尔曼-瓦拉几表示是无多重性的。

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Multiplicity One Theorem for General Spin Groups: The Archimedean Case

Let $\GSpin(V)$ (resp. $\GPin(V)$) be a general spin group (resp. a general Pin group) associated with a nondegenerate quadratic space $V$ of dimension $n$ over an Archimedean local field $F$. For a nondegenerate quadratic space $W$ of dimension $n-1$ over $F$, we also consider $\GSpin(W)$ and $\GPin(W)$. We prove the multiplicity-at-most-one theorem in the Archimedean case for a pair of groups ($\GSpin(V), \GSpin(W)$) and also for a pair of groups ($\GPin(V), \GPin(W)$); namely, we prove that the restriction to $\GSpin(W)$ (resp. $\GPin(W)$) of an irreducible Casselman-Wallach representation of $\GSpin(V)$ (resp. $\GPin(V)$) is multiplicity free.

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arXiv - MATH - Representation Theory

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