References
- [Benzécri 60] J.-P. Benzécri. “Sur les variétés Localement Affines et Localement Projectives.” Bull. Soc. Math. France 88 (1960), 229–332.
- [Bowditch and Epstein 88] B. H. Bowditch and D. B. A. Epstein. “Natural Triangulations Associated to a Surface.” Topology 27: 1 (1988), 91–117.
- [Cooper and Long 15] D. Cooper and D. D. Long. “A Generalization of the Epstein–Penner Construction to Projective Manifolds.” Proc. Amer. Math. Soc. 143: 10 (2015), 4561–4569.
- [Cooper et al. 06] D. Cooper, D. D. Long, and M. B. Thistlethwaite. “Computing Varieties of Representations of Hyperbolic 3-manifolds into SL (4,R).” Experiment. Math. 15: 3 (2006), 291–305.
- [Cooper et al. 07] D. Cooper, D. D. Long, and M. B. Thistlethwaite. “Flexing Closed Hyperbolic Manifolds.” Geom. Topol. 11 (2007), 2413–2440.
- [Cooper et al. 09] D. Cooper, D. D. Long, and M. B. Thistlethwaite. “Constructing Non-congruence Subgroups of Flexible Hyperbolic 3-manifold Groups.” Proc. Amer. Math. Soc. 137: 11 (2009), 3943–3949.
- [Cooper et al. 15a] D. Cooper, D. D. Long, and S. Tillmann. “Deforming Convex Projective Manifolds.” Geom. & Topol. (2015). Preprint, arXiv:1511.06206.
- [Cooper et al. 15b] D. Cooper, D. D. Long, and S. Tillmann. “On Convex Projective Manifolds and Cusps.” Adv. Math. 277 (2015b), 181–251.
- [Sage Developers 15] The Sage Developers. “Sage Mathematics Software (Version 6.9),” Available at http://www.sagemath.org, 2015.
- [Epstein and Penner 88] D. B. A. Epstein and R. C. Penner. “Euclidean Decompositions of Noncompact Hyperbolic Manifolds.” J. Differential Geom. 27: 1 (1988), 67–80.
- [Floyd and Hatcher 82] W. J. Floyd and A. Hatcher. “Incompressible Surfaces in Punctured-torus Bundles.” Topol. Appl. 13: 3 (1982), 263–282.
- [Fock and Goncharov 06] V. V. Fock and A. B. Goncharov. “Moduli Spaces of Local Systems and Higher Teichmüller Theory.” Publ. Math. Inst. Hautes Études Sci. 103 (2006), 1–211.
- [Fock and Goncharov 07] V. V. Fock and A. B. Goncharov. “Moduli Spaces of Convex Projective Structures on Surfaces.” Adv. Math. 208: 1 (2007), 249–273.
- [Guo and Luo 11] R. Guo and F. Luo. “Cell Decompositions of Teichmüller Spaces of Surfaces with Boundary.” Pacific J. Math. 253: 2 (2011), 423–438.
- [Harer 86] J. L. Harer. “The Virtual Cohomological Dimension of the Mapping Class Group of an Orientable Surface.” Invent. Math. 84: 1 (1986), 157–176.
- [Kojima 90] S. Kojima. Polyhedral Decomposition of Hyperbolic Manifolds with Boundary. In On the geometric structure of manifolds, vol. 10, part III, edited by Dong Pyo Chi, Proceedings of Workshops in Pure Mathematics, pp. 37–57. Korea: Seoul National University, 1990.
- [Kojima 92] S. Kojima. Polyhedral Decomposition of Hyperbolic 3-manifolds with Totally Geodesic Boundary. In Aspects of low-dimensional manifolds, vol. 20 of Adv. Stud. Pure Math., pp. 93–112. Tokyo: Kinokuniya, 1992.
- [Lackenby 03] M. Lackenby. “The Canonical Decomposition of Once-punctured Torus Bundles.” Comment. Math. Helv. 78 (2003), 363–384.
- [Marquis 10] L. Marquis. “Espace Des Modules Marqués Des Surfaces Projectives Convexes De Volume Fini.” Geom. Topol. 14: 4 (2010), 2103–2149.
- [Mondello 09] G. Mondello. “Triangulated Riemann Surfaces with Boundary and the Weil–Petersson Poisson Structure.” J. Differential Geom. 81: 2 (2009), 391–436.
- [Penner 87] R. C. Penner. “The Decorated Teichmüller Space of Punctured Surfaces.” Comm. Math. Phys. 113: 2 (1987), 299–339.
- [Penner 04] R. C. Penner. “Decorated Teichmüller Theory of Bordered Surfaces.” Comm. Anal. Geom. 12: 4 (2004), 793–820.
- [Tillmann and Wong 16] S. Tillmann and S. Wong. “An Algorithm for the Euclidean Cell Decomposition of a Cusped Strictly Convex Projective Surface.” J. of Computational Geom. 7 (2016), 237–255.
- [Ushijima 99] A. Ushijima. “A Canonical Cellular Decomposition of the Teichmüller Space of Compact Surfaces with Boundary.” Comm. Math. Phys. 201: 2 (1999), 305–326.
- [Weeks 93] J. R. Weeks. “Convex Hulls and Isometries of Cusped Hyperbolic 3-manifolds.” Topol. Appl. 52: 2 (1993), 127–149.