The intersection of two real forms in Hermitian symmetric spaces of compact type
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概要
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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.
著者
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Tasaki Hiroyuki
Division of Mathematics, Faculty of Pure and Applied Sciences, University of Tsukuba
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Tanaka Makiko
Faculty of Science and Technology, Tokyo University of Science
関連論文
- The intersection of two real forms in Hermitian symmetric spaces of compact type
- Lagrangian Floer homology of a pair of real forms in Hermitian symmetric spaces of compact type