The intersection of two real forms in Hermitian symmetric spaces of compact type

Makiko Sumi Tanaka; Hiroyuki Tasaki

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The intersection of two real forms in Hermitian symmetric spaces of compact type

机译：紧凑型Hermitian对称空间中两个实型的交集

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摘要

We show that the intersections of two real forms, certain totally geodesic Lagrangian submanifolds, in Hermitian symmetric spaces of compact type are antipodal sets. The intersection number of two real forms is invariant under the replacement of the two real forms by congruent ones. If two real forms are congruent, then their intersection is a great antipodal set of them. It implies that any real form in Hermitian symmetric spaces of compact type is a globally tight Lagrangian submanifold. Moreover we describe the intersection of two real forms in the irreducible Hermitian symmetric spaces of compact type.

机译：我们表明，紧实型埃尔米特对称空间中的两个实数形式（某些完全测地的拉格朗日子流形）的交点是对映集。在两个全形替换为两个实形的情况下，两个实形的交点数不变。如果两个实数形式是全等的，则它们的交点就是它们的对立集。这意味着紧凑型Hermitian对称空间中的任何实型都是全局紧Lagrangian子流形。此外，我们描述了紧型的不可约Hermitian对称空间中两个实型的交集。

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来源
《Journal of the Mathematical Society of Japan》 |2012年第4期|p.1297-1332|共36页
作者
Makiko Sumi Tanaka; Hiroyuki Tasaki;
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作者单位

Faculty of Science and Technology Tokyo University of Science Noda Chiba 278-8510, Japan;

Division of Mathematics Faculty of Pure and Applied Sciences University of Tsukuba Tsukuba Ibaraki 305-8571, Japan;

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收录信息美国《科学引文索引》(SCI);
原文格式 PDF
正文语种 eng
中图分类
关键词
real form; lagrangian submanifold; hermitian symmetric spaces; antipodal set; 2-number; globally tight;

机译：真实形式拉格朗日子流形厄米对称空间对映集2位数;全球紧缩;

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6. Metric rigidity theorems on Hermitian locally symmetric spaces [O] . Ngaiming Mok 1986

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7. The fixed point set of a holomorphic isometry, the intersection of two real forms in a Hermitian symmetric space of compact type and symmetric triads [O] . Ikawa Osamu, Sumi Tanaka Makiko, Tasaki Hiroyuki 2015

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The intersection of two real forms in Hermitian symmetric spaces of compact type

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