On laminar groups, Tits alternatives and convergence group actions on \(\mathrm{S}^2\)
DOI10.1515/jgth-2019-2047zbMath1472.20079arXiv1411.3532OpenAlexW3098334499MaRDI QIDQ2414558
Publication date: 17 May 2019
Published in: Journal of Group Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1411.3532
Geometric group theory (20F65) Dynamical systems involving maps of the circle (37E10) Fuchsian groups and their generalizations (group-theoretic aspects) (20H10) General geometric structures on low-dimensional manifolds (57M50) Dynamics induced by group actions other than (mathbb{Z}) and (mathbb{R}), and (mathbb{C}) (37C85) Group actions on manifolds and cell complexes in low dimensions (57M60)
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Cites Work
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- Quasigeodesic pseudo-Anosov flows in hyperbolic 3-manifolds and connections with large scale geometry
- Ideal boundaries of pseudo-Anosov flows and uniform convergence groups with connections and applications to large scale geometry
- Spaces of surface group representations
- Convergence groups and Seifert fibered 3-manifolds
- Laminations and groups of homeomorphisms of the circle
- Groups acting on the circle.
- Spaces of invariant circular orders of groups
- Free Seifert pieces of pseudo-Anosov flows
- Quasigeodesic flows and sphere-filling curves
- Group invariant Peano curves
- Fuchsian groups, circularly ordered groups and dense invariant laminations on the circle
- Free subgroups of the homeomorphism group of the circle
- Abelian and Nondiscrete Convergence Groups on the Circle
- Homeomorphic conjugates of Fuchsian groups.
- Examples of Möbius-like groups which are not Möbius groups
- Recognizing constant curvature discrete groups in dimension 3
- A topological characterisation of hyperbolic groups
- Convergence groups are Fuchsian groups
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