References
- [Arnold et al. 85] V. I. Arnold, S. M. Gusein-Zade, and A. N. Varchenko. Singularities of Differentiable Maps I. Monographs in Mathematics, vol. 82. Boston, MA: Birkhäuser Boston, Inc., 1985.
- [Brander 15] D. Brander. “Pseudospherical Frontals and Their Singularities.” arXiv:1502.04876, 2015 [math.DG].
- [Brander and Dorfmeister 10] D. Brander and J. F. Dorfmeister. “The Björling Problem for Non-Minimal Constant Mean Curvature Surfaces.” Commun. Anal. Geom. 18 (2010), 171–194.
- [Brander and Dorfmeister 15] D. Brander and J. F. Dorfmeister. “Deformations of Constant Mean Curvature Surfaces Preserving Symmetries and the Hopf Differential.” Ann. Sc. Norm. Super. Pisa Cl. Sci. XIV:5 (2015), 1–31.
- [Brander and Svensson 13] D. Brander and M. Svensson. “The Geometric Cauchy Problem for Surfaces with Lorentzian Harmonic Gauss Maps.” J. Differential Geom. 93 (2013), 37–66.
- [Dorfmeister and Haak 97] J. Dorfmeister and G. Haak. “Meromorphic Potentials and Smooth Surfaces of Constant Mean Curvature.” Math. Z. 224 (1997), 603–640.
- [Dorfmeister et al. 98] J. Dorfmeister, F. Pedit, and H. Wu. “Weierstrass Type Representation of Harmonic Maps into Symmetric Spaces.” Commun. Anal. Geom. 6 (1998), 633–668.
- [Fischer 86] G. Fischer (Ed.). Mathematische Modelle: Aus den Sammlungen von Universitäten und Museen, Kommentarband. Berlin: Akademie-Verlag, 1986.
- [Fukui and Hasegawa 12] T. Fukui and M. Hasegawa. “Singularities of Parallel Surfaces.” Tohoku Math. J. 64:2 (2012), 387–408.
- [Gálvez et al. 13] J. A. Gálvez, L. Hauswirth, and P. Mira. “Surfaces of Constant Curvature in with Isolated Singularities.” Adv. Math. 241 (2013), 103–126.
- [Heller and Schmitt 15] S. Heller and N. Schmitt. “Deformations of Symmetric CMC Surfaces in the 3-Sphere.” Exp. Math. 24 (2015), 65–75.
- [Ishikawa and Machida 06] G. Ishikawa and Y. Machida. “Singularities of Improper Affine Spheres and Surfaces of Constant Gaussian Curvature.” Int. J. Math. 17 (2006), 269–293.
- [Izumiya and Saji 10] S. Izumiya and K. Saji. “The Mandala of Legendrian Dualities for Pseudo-Spheres of Lorentz-Minkowski Space and “Flat” Spacelike Surfaces.” J. Singul. 2 (2010), 92–127.
- [Izumiya et al. 10] S. Izumiya, K. Saji, and M. Takahashi. “Horospherical Flat Surfaces in Hyperbolic 3-Space.” J. Math. Soc. Jpn. 62 (2010), 789–849.
- [Kilian et al. 00] M. Kilian, I. McIntosh, and N. Schmitt. “New Constant Mean Curvature Surfaces.” Exp. Math. 9 (2000), 595–611.
- [Kilian et al. 04] M. Kilian, N. Schmitt, and I. Sterling. “Dressing CMC n-Noids.” Math. Z. 246 (2004), 501–519.
- [Kokubu et al. 05] M. Kokubu, W. Rossman, K. Saji, M. Umehara, and K. Yamada. “Singularities of Flat Fronts in Hyperbolic Space.” Pacific J. Math. 221 (2005), 303–351.
- [Willmore 59] T. J. Willmore. An Introduction to Differential Geometry. Oxford: Clarendon Press, 1959.
- [Wood 77] J. C. Wood. “Singularities of Harmonic Maps and Applications of the Gauss-Bonnet Formula.” Amer. J. Math. 99 (1977), 1329–1344.