Submanifolds of differentiable manifolds provided with differential- geometric structures. I
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Publication:1163251
DOI10.1007/BF01084592zbMath0483.53034WikidataQ115394215 ScholiaQ115394215MaRDI QIDQ1163251
Publication date: 1981
Published in: Journal of Soviet Mathematics (Search for Journal in Brave)
Global submanifolds (53C40) General geometric structures on manifolds (almost complex, almost product structures, etc.) (53C15)
Related Items (2)
Submanifolds in differentiable manifolds provided with differential- geometric structures. II: Submanifolds of codimension 2 in contact and almost-contact manifolds ⋮ Submanifolds in differentiable manifolds provided with differential- geometric structures. III: \(N(\sigma)\)-antiinvariant submanifolds in a manifold with almost-contact structure
Cites Work
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- Noninvariant hypersurfaces of almost contact manifolds
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- Geometry of manifolds with structural group \(\mathcal U(n)\times\mathcal O(s)\)
- Contact Riemannian submanifolds
- Semi-invariant immersions
- Correction to: ``The $f$-structure induced on submanifolds of almost complex spaces
- Submanifolds of manifolds with an $f$-structure
- A note on certain hypersurfaces of Sasakian manifolds
- Isometric immersions of Sasakian manifolds in spheres
- Invariant submanifolds of an almost contact manifold
- Induced structures on submanifolds
- Invariant submanifolds of a manifold with $(f,\,g,\,u,\,v,\,łambda)$-structure
- Invariant submanifolds of an $f$-manifold with complemented frames
- Simple proof of a theorem on transversal hypersurfaces of a certain Sasakian manifold
- On transversal hypersurfaces of an almost contact manifold
- Invariant submanifolds of an $f$-manifold with complemented frames
- Invariant submanifolds of normal contact metric manifolds
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