Topology of leaves for minimal laminations by non-simply-connected hyperbolic surfaces
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Publication:2141710
DOI10.4171/GGD/645zbMath1497.57041arXiv2005.09050WikidataQ115481603 ScholiaQ115481603MaRDI QIDQ2141710
Sébastien Alvarez, Joaquin Brum
Publication date: 25 May 2022
Published in: Groups, Geometry, and Dynamics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2005.09050
Covering spaces and low-dimensional topology (57M10) Foliations in differential topology; geometric theory (57R30) Dynamical systems involving transformations and group actions with special properties (minimality, distality, proximality, expansivity, etc.) (37B05)
Related Items (2)
Prescribing the curvature of leaves of laminations: revisiting a theorem by Candel ⋮ On the Teichmüller space of laminations fibering over hyperbolic surfaces
Cites Work
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- Minimality of the horocycle flow on laminations by hyperbolic surfaces with non-trivial topology
- Examples of minimal laminations and associated currents
- Generic leaves
- Residually minimal foliations with 2 ends
- Topology of generic leaves
- Reeb stability and the Gromov-Hausdorff limits of leaves in compact foliations
- Solenoidal Manifolds
- Commentaries on the paper "Solenoidal Manifolds" by Dennis Sullivan
- Uniformization of surface laminations
- The Schreier continuum and ends
- Leaves Without Holonomy
- The Teichmüller space of the Hirsch foliation
- Inverse Limit Sequences with Covering Maps
- Inverse Limits and Homogeneity
- On the Classification of Noncompact Surfaces
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