A vertical Liouville subfoliation on the cotangent bundle of a Cartan space and some related structures
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Publication:2925880
DOI10.1142/S0219887814500637zbMath1305.53029arXiv1301.5316MaRDI QIDQ2925880
Publication date: 29 October 2014
Published in: International Journal of Geometric Methods in Modern Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1301.5316
Foliations (differential geometric aspects) (53C12) Global differential geometry of Finsler spaces and generalizations (areal metrics) (53C60) Local differential geometry of Finsler spaces and generalizations (areal metrics) (53B40)
Related Items (3)
A class of metrics and foliations on tangent bundle of Finsler manifolds ⋮ Vertical liouville foliations on the big-tangent manifold of a finsler space ⋮ Geometrical structures on the cotangent bundle
Cites Work
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- Foliations on the tangent bundle of Finsler manifolds
- Characteristic classes of subfoliations
- On the vertical bundle of a pseudo-Finsler manifold
- The multiplier approach to the projective Finsler metrizability problem
- Vrănceanu connections and foliations with bundle-like metrics
- Finsler geometry and natural foliations on the tangent bundle
- PROJECTIVE AND FINSLER METRIZABILITY: PARAMETERIZATION-RIGIDITY OF THE GEODESICS
- SUB-WEYL GEOMETRY AND ITS LINEAR CONNECTIONS
- Cohomology of CR-submanifolds
- CARTAN SPACES AND NATURAL FOLIATIONS ON THE COTANGENT BUNDLE
- Adapted basic connections to a certain subfoliation on the tangent manifold of a Finsler space
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