The index number of an 𝑅-space: An extension of a result of M.Takeuchi’s
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Publication:4333027
DOI10.1090/S0002-9939-97-03517-XzbMath0878.53040OpenAlexW1602208439MaRDI QIDQ4333027
Publication date: 19 February 1997
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1090/s0002-9939-97-03517-x
Related Items (8)
The (𝑀₊,𝑀₋)-method on compact symmetric spaces and its applications ⋮ A survey on natural Γ-symmetric structures on 𝑅-spaces ⋮ Great antipodal sets on complex Grassmannian manifolds as designs with the smallest cardinalities ⋮ Natural \(\Gamma\)-symmetric structures on \(R\)-spaces ⋮ Antipodal sets of symmetric \(R\)-spaces ⋮ Maximal antipodal sets of compact classical symmetric spaces and their cardinalities. I ⋮ On index number and topology of flag manifolds ⋮ Antipodal sets and designs on unitary groups
Cites Work
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- Addendum to ``Existence of Hermitian n-symmetric spaces and of non- commutative naturally reductive spaces
- Symmetric submanifolds of Euclidean space
- Minimal imbeddings of R-spaces
- The Invariant of Chen-Nagano on Flag Manifolds
- The Tightness of Certain Almost Complex Submanifolds
- An application of the Morse theory to the topology of Lie-groups
- A Riemannian Geometric Invariant and its Applications to a Problem of Borel and Serre
- Two-number of symmetric R-spaces
- The action of a real semisimple group on a complex flag manifold. I: Orbit structure and holomorphic arc components
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