$$textrm{Sp}(n,\mathbb {R})$$ 的克莱因四对称对的分支规律

Pub Date : 2024-04-11 DOI:10.1007/s10711-024-00922-2
Jiaying Ding, Haian He, Huangyuan Pan, Lifu Wang
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引用次数: 0

摘要

对于实交点群 \(G=\textrm{Sp}(n,\mathbb {R})\),我们对所有克莱因四对称对 \((G,G^\Gamma )\)进行了分类,并确定了是否存在限制于 \(G^\Gamma\)时可离散分解的无限维不可还原 \((\mathfrak {g},K)\)- 模块。因此,我们得到了与 Chen 和 He (Int J Math 34(1):2250094, 2023, Corollary 21) 类似的结果。
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Branching laws of Klein four-symmetric pairs for $$\textrm{Sp}(n,\mathbb {R})$$

For the real symplectic groups \(G=\textrm{Sp}(n,\mathbb {R})\), we classify all the Klein four-symmetric pairs \((G,G^\Gamma )\), and determine whether there exist infinite-dimensional irreducible \((\mathfrak {g},K)\)-modules discretely decomposable upon restriction to \(G^\Gamma \). As a consequence, we obtain a similar result to Chen and He (Int J Math 34(1):2250094, 2023, Corollary 21).

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