Characterization of complex space forms in terms of geodesics and circles on their geodesic spheres
スポンサーリンク
概要
著者
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ADACHI Toshiaki
Department of Mathematics Nagoya Institute of Technology
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Maeda Sadahiro
Department Of Mathematics Faculty Of Science Kumamoto University
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Adachi Toshiaki
Department Of Mathematics Faculty Of General Education Kumamoto University
関連論文
- Length spectrum of geodesic spheres in a non-flat complex space form
- A characterization of the homogeneous minimal ruled real hypersurface in complex hyperbolic space
- TOTALLY η-UMBILIC HYPERSURFACES IN A NONFLAT COMPLEX SPACE FORM AND THEIR ALMOST CONTACT METRIC STRUCTURES
- A CHARACTERIZATION OF THE HOMOGENEOUS REAL HYPERSURFACE OF TYPE (B) WITH TWO DISTINCT CONSTANT PRINCIPAL CURVATURES IN A COMPLEX HYPERBOLIC SPACE
- Real Submanifolds of Constant Mean Curvature in Complex Projective Space
- Differential geometry of constant mean curvature submanifolds
- On slant immersions in Kohler manifolds.
- Characterization of complex space forms in terms of geodesics and circles on their geodesic spheres
- Extrinsic geodesics and hypersurfaces of type (A) in a complex projective space
- Real hypersurfaces some of whose geodesics are plane curves in nonflat complex space forms
- Meromorphic Extension of L-Functions of Anosov Flows and Profinite Graphs
- Distribution of length spectrum of circles on a complex hyperbolic space
- A note on the Folner condition for amenability
- A theorem of Hadamard-Cartan type for Kähler magnetic fields
- Ideal Boundary of a Complete Metric Space
- Circles on quaternionic space forms