Grassmann geometry on symmetric spaces

Grassmann geometry on symmetric spaces

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摘要 A duality principle between Grassmann geometries on compact symmetric spaces and those on noncompact symmetric spaces is proved, which greatly facilitates the study of Grassmann geometry on symmetric spaces. Those Grassmann geometries on noncompact symmetric spaces which admit non-totally geodesic submanifold are also determined. A duality principle between Grassmann geometries on compact symmetric spaces and those on noncompact symmetric spaces is proved, which greatly facilitates the study of Grassmann geometry on symmetric spaces. Those Grassmann geometries on noncompact symmetric spaces which admit non-totally geodesic submanifold are also determined.

作者 JIN QuanqinDepartment of Mathematics, Hebei University, Baoding 071002, China Department of Mathematics, Nankai University, Tianjin 300071,China

出处《Chinese Science Bulletin》 SCIE EI CAS 1999年第1期41-44,共4页

关键词 SYMMETRIC spaces GRASSMANN GEOMETRY CARTAN decomposition orthogonal SYMMETRIC Lie algebra totally GEODESIC submanifold. symmetric spaces Grassmann geometry Cartan decomposition orthogonal symmetric Lie algebra totally geodesic submanifold

分类号 O186.1 [理学—基础数学]

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Chinese Science Bulletin

1999年第1期

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Grassmann geometry on symmetric spaces

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