References
- [Derksen et al. 10] H. Derksen, J. Weyman, and A. Zelevinsky. “Quivers with Potentials and Their Representations II: Applications to Cluster Algebras.” J. Amer. Math. Soc. 23:3 (2010), 749–790.
- [Doman 16] B. G. S. Doman. The Classical Orthogonal Polynomials. Hackensack, NJ: World Scientific Publishing Co. Pte. Ltd., 2016.
- [Fomin and Zelevinsky 02] S. Fomin and A. Zelevinsky. “Cluster Algebras I: Foundations.” J. Amer. Math. Soc. 15:02 (2002), 497–529.
- [Fomin and Zelevinsky 07] S. Fomin and A. Zelevinsky. “Cluster Algebras. IV. Coefficients.” Compositio Math. 143:01 (2007), 112–164.
- [Gross et al. 17] M. Gross, P. Hacking, S. Keel, and M. Kontsevich. “Canonical Bases for Cluster Algebras.” J. Amer. Math. Soc. 31:2 (2017), 497–608.
- [Lee and Schiffler 13] K. Lee and R. Schiffler. “Positivity for Cluster Algebras of Rank 3.” Publ. Res. Inst. Math. Sci. 49:3 (2013), 601–649.
- [Lee and Schiffler 15] K. Lee and R. Schiffler. “Positivity for Cluster Algebras.” Ann. Math. 182 (2015), 73–125.
- [Najera Chavez 12] A. Najera Chavez. “On the c-Vectors and g-Vectors of the Markov Cluster Algebra.” Sémin. Lothar. Comb. 69 (2012), Article B69d.
- [Nakanishi 19] T. Nakanishi. “Synchronicity Phenomenon in Cluster Patterns.” (2019), arXiv:1906.12036.
- [Nakanishi and Zelevinsky 12] T. Nakanishi and A. Zelevinsky. “On Tropical Dualities in Cluster Algebras.” In Algebraic Groups and Quantum Groups, Contemp. Math, Vol. 565, pp. 217–226, 2012.
- [Reading 18] N. Reading. “A Combinatorial Approach to Scattering Diagrams.” (2018), arXiv:1806.05094.