A generalization of \(K\)-contact and \((k, \mu )\)-contact manifolds
From MaRDI portal
Publication:1945670
DOI10.1007/S00022-013-0144-8zbMath1262.53026OpenAlexW1975971467MaRDI QIDQ1945670
Publication date: 8 April 2013
Published in: Journal of Geometry (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00022-013-0144-8
General geometric structures on manifolds (almost complex, almost product structures, etc.) (53C15) Contact manifolds (general theory) (53D10)
Related Items (5)
Invariant vector fields on contact metric manifolds under \(\mathcal{D}\)-homothetic deformation ⋮ Pseudo-parallel characteristic Jacobi operators on contact metric 3 manifolds ⋮ CONFORMALLY FLAT CONTACT THREE-MANIFOLDS ⋮ CONTACT METRIC THREE-MANIFOLDS WITH CONSTANT SCALAR TORSION ⋮ Certain infinitesimal transformations on contact metric manifolds
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- \(\eta\)-parallel contact metric spaces
- Conformal motion of contact manifolds with characteristic vector field in the \(k\)-nullity distribution
- On infinitesimal conformal and projective transformations of normal contact spaces
- Generalization of Myers' theorem on a contact manifold
- Conformal classification of \((k, \mu )\)-contact manifolds
- Contact metric manifolds with \(\eta \)-parallel torsion tensor
- Lagrangian submanifolds of \(C^n\) with conformal Maslov form and the Whitney sphere
- When is the tangent sphere bundle conformally flat?
- Contact hypersurfaces of Kähler manifolds
- Conformally flat contact metric manifolds with \(Q\xi=\varrho\xi\)
- Contact metric manifolds whose characteristic vector field is a harmonic vector field
- On conformally flat contact metric manifolds
- Contact metric manifolds satisfying a nullity condition
- Homogeneity on three-dimensional contact metric manifolds
- Some transformations on manifolds with almost contact and contact metric structures. II
- Certain conditions for a Riemannian manifold to be isometric with a sphere
- Some remarks on space with a certain contact structure
- Variational Problems on Contact Riemannian Manifolds
- Locally symmetric $K$-contact Riemannian manifolds
- Riemannian geometry of contact and symplectic manifolds
- Conformally flat contact metric manifolds
This page was built for publication: A generalization of \(K\)-contact and \((k, \mu )\)-contact manifolds
