从非紧对称空间到其紧对偶的嵌入

IF 0.5 4区数学 Q3 MATHEMATICS Asian Journal of Mathematics Pub Date : 2018-11-07 DOI:10.4310/AJM.2020.V24.N5.A3

Yunxia Chen, Yongdong Huang, N. Leung

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引用次数: 2

摘要

每个紧致对称空间$M$都允许一个对偶非紧致对称空间$\check｛M｝$。当$M$是广义Grassmanian时，我们可以将$\check{M}$看作它的一个开子流形，它由类空间的子空间\cite{HL}组成。基于此，我们研究了从非紧对称空间到其紧对偶的嵌入，包括广义Grassmann的类空间嵌入、Hermitian对称空间的Borel嵌入和对称R-空间的广义嵌入。我们将比较这些嵌入，并使用切割轨迹描述它们的图像。

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Embeddings from noncompact symmetric spaces to their compact duals

Every compact symmetric space $M$ admits a dual noncompact symmetric space $\check{M}$. When $M$ is a generalized Grassmannian, we can view $\check{M}$ as a open submanifold of it consisting of space-like subspaces \cite{HL}. Motivated from this, we study the embeddings from noncompact symmetric spaces to their compact duals, including space-like embedding for generalized Grassmannians, Borel embedding for Hermitian symmetric spaces and the generalized embedding for symmetric R-spaces. We will compare these embeddings and describe their images using cut loci.

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