QUANTUM TEICHMÜLLER THEORY AND REPRESENTATIONS OF THE PURE BRAID GROUP
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Publication:3607439
DOI10.1142/S0219199708003095zbMath1229.57016arXiv0801.4922OpenAlexW2026776062MaRDI QIDQ3607439
Publication date: 2 March 2009
Published in: Communications in Contemporary Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0801.4922
Teichmüller spacerepresentationmapping class group of a surfaceChekhov-Fock algebrabraid groups of a surfaceRivin triangulation
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Cites Work
- The hyperbolic volume of knots from the quantum dilogarithm
- A volumish theorem for the Jones polynomial of alternating knots
- Euclidean structures on simplicial surfaces and hyperbolic volume
- Quantization of Teichmüller spaces and the quantum dilogarithm
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- On an elementary proof of Rivin's characterization of convex ideal hyperbolic polyhedra by their dihedral angles
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- On geometry of convex ideal polyhedra in hyperbolic 3-space
- Representations of the quantum Teichmüller space and invariants of surface diffeomorphisms
- A uniqueness property for the quantization of Teichmüller spaces
- Convex Polytopes
- The colored Jones polynomials and the simplicial volume of a knot
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