https://orcid.org/0000-0002-4735-0249
References
- Adachi, T., Iyama, O., Reiten, I. (2014). τ-tilting theory. Compos. Math. 150:415–452.
- Armstrong, D. (2009). Generalized Noncrossing Partitions and Combinatorics of Coxeter Groups. Memoirs of the American Mathematical Society, Vol. 202, no. 949. Providence, RI: American Mathematical Society, 153pp.
- Brenner, S., Butler, M. C. R. (1980). Generalizations of the Berněsteǐn Gel’fand Ponomarev reflection functors. In: Dlab, V., Gabriel, P., eds. Representation Theory, II. Lecture Notes in Mathematics, Vol. 832. Berlin: Springer,pp. 103–169.
- Bruns, W., Herzog, H. (1998). Cohen-Macaulay Rings. Cambridge Studies in Advanced Mathematics, 2nd ed. Cambridge: Cambridge University Press.
- Buan, A. B., Iyama, O., Reiten, I., Scott, J. (2009). Cluster structures for 2-Calabi-Yau categories and unipotent groups. Compos. Math. 145(4):1035–1079.
- Buan, A. B., Iyama, O., Reiten, I., Smith, D. (2011). Mutation of cluster-tilting objects and potentials. Am. J. Math. 133(4):835–887.
- Buan, A. B., Marsh, R., Reiten, I. (2008). Cluster mutation via quiver representations. Comment. Math. Helv. 83(1):143–177.
- Buan, A. B., Marsh, R., Reineke, M., Reiten, I., Todorov, G. (2006). Tilting theory and cluster combinatorics. Adv. Math. 204:572–618.
- Chapoton, F. (2004). Enumerative properties of generalized associahedra. Sémin. Lothar. Comb. 51:B51b.
- Cerulli Irelli, G., Keller, B., Labardini-Fragoso, D., Plamondon, P. G. (2013). Linear independence of cluster monomials for skew-symmetric cluster algebras. Compos. Math. 149(10):1753–1764.
- Cao, P., Li, F. (2020). The enough g-pairs property and denominator vectors of cluster algebras. Trans. Am. Math. Soc. 377:1547–1572.
- Demonet, L., Iyama, O., Jasso, G. (2019). τ-tilting finite algebras, bricks and g-vectors. Int. Math. Res. Not.3:852–892.
- Enomoto, H. (2020). Rigid modules and ICE-closed subcategories in quiver representations. preprint, arXiv:2005.05536 [math.RT].
- Fu, C., Gyoda, Y. (2019). Compatibility degree of cluster complexes. preprint, arXiv:1911.07193 [math.RA].
- Fu, C., Keller, B. (2010). On cluster algebras with coefficients and 2-Calabi-Yau categories. Trans. Am. Math. Soc. 362(2):859–895.
- Fishel, S., Kallipoliti, M., Tzanaki, E. (2013). Facets of the generalized cluster complex and regions in the extended Catalan arrangement of type A. Electron. J. Comb. 20(4):P7.
- Fomin, S., Shapiro, M., Thurston, D. (2008). Cluster algebras and triangulated surfaces. Part I: Cluster complexes. Acta Math. 201:83–146.
- Fomin, S., Thurston, D. (2018). Cluster Algebras and Triangulated Surfaces. Part II: Lambda Lengths. Memoirs of the American Mathematical Society, Vol. 255, no. 1223. Providence, RI: American Mathematical Society.
- Fomin, S., Zelevinsky, A. (2003). Cluster algebras II: Finite type classification. Invent. Math. 154:63–121.
- Fomin, S., Zelevinsky, A. (2003). Y-systems and generalized associahedra. Ann. Math. 158(3):977–1018.
- Fomin, S., Zelevinsky, A. (2007). Cluster algebra IV: Coefficients. Compos. Math. 143:112–164.
- Iyama, O., Yoshino, Y. (2008). Mutation in triangulated categories and rigid Cohen-Macaulay modules. Invent. Math. 172(1):117–168.
- Jasso, G. (2015). Reduction of τ-tilting modules and torsion pairs. Int. Math. Res. Not. 16:7190–7237.
- Keller, B. (2010). Cluster Algebras, Quiver Representations and Triangulated Categories. London Mathematical Society Lecture Note Series, Vol. 375. Cambridge: Cambridge University Press.
- Keller, B. (2012). Cluster algebras and derived categories. preprint, arXiv:1202.4161 [math.RT].
- Krattenthaler, C. (2006). The F-triangle of the generalised cluster complex. In: Klazar, M., Kratochvíl, J., Loebl, M., Matoušek, J., Valtr, P., Thomas, R., eds. Topics in Discrete Mathematics, Vol. 26. Berlin: Springer, pp. 93–126.
- Marsh, R., Reineke, M., Zelevinsky, A. (2003). Generalized associahedra via quiver representations. Trans. Am. Math. Soc. 355:4171–4186.
- Riedtmann, C., Schofield, A. (1991). On a simplicial complex associated with tilting modules. Comment. Math. Helv. 66(1):70–78.
- Sloane, N. J. A. The on-line encyclopedia of integer sequences. published electronically at https://oeis.org.
- Unger, L. (1999). Shellability of simplicial complexes arising in representation theory. Adv. Math. 144(2):221–246.
- Ziegler, G. M. (1995). Lectures on Polytopes. Graduate Texts in Mathematics, Vol. 152. New York: Springer.
- Zito, S. (2020). τ-tilting finite cluster-tilted algebras. Proc. Edinburgh Math. Soc. 63:950–055.