References
- [Caldero and Keller 06] P. Caldero and B. Keller. “From Triangulated Categories to Cluster Algebras. II.” Ann. Sci. École Norm. Sup. (4) 39:6 (2006), 983–1009.
- [Coxeter 34] H. S. M. Coxeter. “Discrete Groups Generated by Reflections.” Ann. Math. (2) 35:3 (1934), 588–621.
- [Derksen and Owen 08] H. Derksen and T. Owen. “New Graphs of Finite Mutation Type.” Electron. J. Combin. 15:1 (2008), 15. Research Paper 139.
- [Felikson et al. 12] A. Felikson, M. Shapiro, and P. Tumarkin. “Skew-Symmetric Cluster Algebras of Finite Mutation Type.” J. Eur. Math. Soc. (JEMS) 14:4 (2012), 1135–1180.
- [Fomin and Zelevinsky 02] S. Fomin and A. Zelevinsky. “Cluster Algebras. I. Foundations.” J. Am. Math. Soc. 15:2 (2002), 497–529 ( electronic).
- [Fomin and Zelevinsky 03] S. Fomin and A. Zelevinsky. “Cluster Algebras. II. Finite Type Classification.” Invent. Math. 154:1 (2003), 63–121.
- [Keller 11] B. Keller. “Categorification of Acyclic Cluster Algebras: An Introduction.” In Higher structures in geometry and physics, volume 287 of Progr. Math., edited by S. A. Cattaneo and A. Giaquinto, pp. 227–241. New York: Birkhäuser/Springer, 2011.
- [Lawson 15] J. Lawson. “Minimal Mutation-Infinite Quivers.” Available online (http://www.math.dur.ac.uk/users/j.w.lawson/mmi), 2015.
- [Seven 07] A. I. Seven. “Recognizing Cluster Algebras of Finite Type.” Electron. J. Combin. 14:1 (2007), 35. Research Paper 3. (electronic).
- [Shapiro 10] M. Shapiro. “Quivers of Finite Mutation Type.” Available online (http://www.math.msu.edu/mshapiro/FiniteMutation.html), (2010).
- [Vinberg 85] È. B. Vinberg. “Hyperbolic Groups of Reflections (Russian).” Uspekhi Mat. Nauk 40:1 (1985), 29–66, 255. English translation in: Russ. Math. Surv., 40:1 (1985), 31–75.
- [Williams 14] L. K. Williams. “Cluster Algebras: An Introduction.” Bull. Am. Math. Soc. (N.S.) 51:1 (2014), 1–26.