REFERENCES
- [Beardon 95] A. F. Beardon. The Geometry of Discrete Groups, Graduate Texts in Mathematics 91. Springer, 1995.
- [Bergeron et al. 15] N. Bergeron, E. Falbel, and A. Guilloux. “Tetrahedra of Flags, Volume and Homology of .” To appear in Geom. Topol., available at arXiv:1101.2742, 2015.
- [Brittenham and Wu 01] M. Brittenham and Y.-Q. Wu. “The Classification of Exceptional Dehn Surgeries on 2-Bridge Knots.” Comm. Anal. Geom. 9 (2001), 97–113.
- [Burton 14] B. Burton. “A Duplicate Pair in the SnapPea Census.” Exp. Math 23: 2 (2014), 170–173.
- [Callahan et al. 99] P. Callahan, M. Hildebrand, and J. Weeks. “A Census of Cusped Hyperbolic 3-Manifolds.” Math. Comp. 68 (1999), 321–332.
- [Deraux 06] M. Deraux. “Deforming the -Fuchsian (4, 4, 4)-Triangle Group into a Lattice.” Topology 45 (2006), 989–1020.
- [Deraux 14] M. Deraux. “A 1-Parameter Family of Spherical CR Uniformizations of the Figure Eight Knot Complement.” Preprint, 2014.
- [Deraux and Falbel 15] M. Deraux and E. Falbel. “Complex Hyperbolic Geometry of the Figure Eight Knot.” To appear in Geom. Top., available at arXiv:1303.7096, 2015.
- [Deraux et al. 15] M. Deraux, J. R. Parker, and J. Paupert. “New Non-arithmetic Complex Hyperbolic Lattices.” Invent. Math. (2015), 10.1007/s00222-015-0600-1
- [Epstein and Penner 88] D. B. A. Epstein and R. C. Penner. “Euclidean Decompositions of Noncompact Hyperbolic Manifolds.” J. Diff. Geom 27 (1988), 67–80.
- [Falbel 08] E. Falbel. “A Spherical CR Structure on the Complement of the Figure Eight Knot with Discrete Holonomy.” J. Differential Geom. 79 (2008), 69–110.
- [Falbel and Wang 13] E. Falbel and J. Wang. “Branched Spherical CR Structures on the Complement of the Figure Eight Knot.” Preprint, 2013.
- [Falbel et al. 14] E. Falbel, P.-V. Koseleff, and F. Rouillier. “Representations of Fundamental Groups of 3-Manifolds into : Exact Computations in Low Complexity.” In Geom. Dedicata, Germany: Springer Verlag, 2014. 10.1007/s10711-014-9987-x1
- [Garoufalidis et al., to appear] S. Garoufalidis, M. Goerner, and C. Zickert. “Gluing Equations for -Representations of 3-Manifolds.” Algebr. Geom. Topol. (to appear)
- [Giraud 21] G. Giraud. “Sur certaines fonctions automorphes de deux variables.” Ann. Sci. École Norm. Sup. 38 (1921), 43–164.
- [Goldman 99] W. M. Goldman. Complex Hyperbolic Geometry, Oxford Mathematical Monographs. Oxford University Press, 1999.
- [Goldman and Parker 92] W. M. Goldman and J. R. Parker. “Complex Hyperbolic Triangle Groups.” J. Reine Angew. Math. 425 (1992), 71–86.
- [Hempel 04] J. Hempel. 3-Manifolds. AMS Chelsea, 2004.
- [Hildebrand and Weeks 89] M. Hildebrand and J. Weeks. “A Computer Generated Census of Cusped Hyperbolic 3-Manifolds.” In Computers and mathematics (Cambridge, MA, 1989), pp. 53–59. Springer, 1989.
- [Martelli and Petronio 06] B. Martelli and C. Petronio. “Dehn Filling of the ‘Magic’ 3-Manifold.” Comm. Anal. Geom. 14 (2006), 969–1026.
- [Neumann and Zagier 85] W. Neumann and D. Zagier. “Volumes of Hyperbolic Three-Manifolds.” Topology 24 (1985), 307–332.
- [Parker 08] J. R. Parker. “Hyperbolic Spaces.” Jyväskylä lectures in Mathematics, Jyväskylä, Finland: University of Jyväskylä, 2008.
- [Parker 15] J. R. Parker. Complex Hyperbolic Kleinian Groups. To be published by Cambridge University Press, 2015.
- [Parker and Will 15] J. R. Parker and P. Will. “A Complex Hyperbolic Riley Slice.” To appear, 2015.
- [Petronio and Porti 00] C. Petronio and J. Porti. “Negatively Oriented Triangulations and a Proof of Thurston’s Hyperbolic Dehn Surgery Theorem.” Expo. Math. 18 (2000), 16–35.
- [Riley 75] R. Riley. “A Quadratic Parabolic Group.” Math. Proc. Cambridge Philos. Soc. 77 (1975), 281–288.
- [Rolfsen 90] D. Rolfsen. Knots and Links, Mathematics Lecture Series 7. Publish or Perish, 1990.
- [Schwartz 01] R. E. Schwartz. “Degenerating the Complex Hyperbolic Ideal Triangle groups.” Acta Math. 186 (2001), 105–154.
- [Schwartz 02] R. E. Schwartz. “Complex Hyperbolic Triangle Groups.” In Proceedings of the International Congress of Mathematicians, Vol. II (Beijing, 2002), pp. 339–349. Higher Ed. Press, 2002.
- [Schwartz 03] R. E. Schwartz. “Real Hyperbolic on the Outside, Complex Hyperbolic on the Inside.” Inv. Math. 151 (2003), 221–295.
- [Schwartz 07] R. E. Schwartz. Spherical CR geometry and Dehn surgery, Annals of Mathematics Studies 165. Princeton University Press, 2007.
- [Stover 11] M. Stover. “Volumes of Picard Modular Surfaces.” Proc. Amer. Math. Soc. 139 (2011), 3045–3056.
- [Thistlethwaite 10] M. Thistlethwaite. “Cusped Hyperbolic Manifolds with 8 Tetrahedra.” Available online (http://www.math.utk.edu/~morwen/8tet), 2010.
- [Thurston 02] W. P. Thurston. The Geometry and Topology of Three-Manifolds, Princeton Lecture Notes. Available at http://library.msri.org/books/gt3m, 2002.