Riemannian manifolds not quasi-isometric to leaves in codimension one foliations
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Publication:407802
DOI10.5802/AIF.2653zbMath1241.57036arXiv0911.4665OpenAlexW2963682578WikidataQ115159025 ScholiaQ115159025MaRDI QIDQ407802
Publication date: 28 March 2012
Published in: Annales de l'Institut Fourier (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0911.4665
quasi-isometrybounded homology propertyclosed leaf theoremcodimension one foliationgeometry of leaves
Global submanifolds (53C40) Foliations (differential geometric aspects) (53C12) Foliations in differential topology; geometric theory (57R30) Local Riemannian geometry (53B20)
Related Items (5)
Exotic open 4-manifolds which are nonleaves ⋮ Foliated vector fields without periodic orbits ⋮ Coarse homology of leaves of foliations ⋮ MANIFOLDS THAT ARE NOT LEAVES OF CODIMENSION ONE FOLIATIONS ⋮ Realization Problems in the Theory of Foliations
Cites Work
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- Une variété que n'est pas une feuille
- Open manifolds which are non-realizable as leaves
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- Every surface is a leaf
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- Manifolds which cannot be leaves of foliations
- Deformation of homeomorphisms on stratified sets
- When is a manifold a leaf of some foliation?
- A VIRTUAL LEAF
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