Constructing thin subgroups commensurable with the figure-eight knot group
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Publication:894966
DOI10.2140/agt.2015.15.3011zbMath1329.57025arXiv1410.8157OpenAlexW3098035067MaRDI QIDQ894966
Darren D. Long, Samuel A. Ballas
Publication date: 25 November 2015
Published in: Algebraic \& Geometric Topology (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1410.8157
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Cites Work
- Unnamed Item
- Unnamed Item
- Deformations of noncompact projective manifolds
- Zariski dense surface subgroups in \(\mathrm{SL}(3,\mathbb Z)\).
- Finite volume properly convex deformations of the figure-eight knot
- Groups of integral representation type
- Automorphisms of convex cones
- The Bianchi groups are separable on geometrically finite subgroups.
- Semigroups containing proximal linear maps
- Zariski closure and the dimension of the Gaussian law of the product of random matrices. I
- On convex projective manifolds and cusps
- Coxeter group in Hilbert geometry
- Generic elements in Zariski-dense subgroups and isospectral locally symmetric spaces
- A generalization of the Epstein-Penner construction to projective manifolds
- Convex Real Projective Structures on Closed Surfaces are Closed
- Hyperbolic manifolds and discrete groups
