Cluster exchange groupoids and framed quadratic differentials
暂无分享,去创建一个
[1] Y. Qiu,et al. Finite presentations for spherical/braid twist groups from decorated marked surfaces , 2017, Journal of Topology.
[2] M. Wemyss,et al. Stability on contraction algebras implies $K(\pi,1)$ , 2019 .
[3] Y. Qiu,et al. Decorated Marked Surfaces III: The Derived Category of a Decorated Marked Surface , 2018, International Mathematics Research Notices.
[4] Y. Qiu. The braid group for a quiver with superpotential , 2017, Science China Mathematics.
[5] Y. Qiu. Decorated marked surfaces (part B): topological realizations , 2018 .
[6] Manuel Saor'in,et al. Contractibility of the stability manifold for silting-discrete algebras , 2017, Forum Mathematicum.
[7] Y. Qiu,et al. Decorated marked surfaces II: Intersection numbers and dimensions of Homs , 2014, Transactions of the American Mathematical Society.
[8] Y. Qiu,et al. Contractible stability spaces and faithful braid group actions , 2014, Geometry & Topology.
[9] C. Geiss,et al. The representation type of Jacobian algebras , 2013, 1308.0478.
[10] Y. Qiu. STABILITY CONDITIONS AND QUANTUM DILOGARITHM IDENTITIES FOR DYNKIN QUIVERS , 2011, 1111.1010.
[11] A. King,et al. Exchange graphs and Ext quivers , 2011, 1109.2924.
[12] S. Yau,et al. Handbook of group actions , 2015 .
[13] M. Kontsevich,et al. Stability in Fukaya categories of surfaces , 2014 .
[14] M. Kontsevich,et al. Flat surfaces and stability structures , 2014, 1409.8611.
[15] Y. Qiu. Decorated marked surfaces: spherical twists versus braid twists , 2014, 1407.0806.
[16] I. Smith,et al. Quadratic differentials as stability conditions , 2013, Publications mathématiques de l'IHÉS.
[17] John Guaschi,et al. A survey of surface braid groups and the lower algebraic K-theory of their group rings , 2013, 1302.6536.
[18] Benson Farb,et al. A primer on mapping class groups , 2013 .
[19] Corentin Boissy. CONNECTED COMPONENTS OF THE STRATA OF THE MODULI SPACE OF MEROMORPHIC DIFFERENTIALS , 2012, 1211.4951.
[20] B. Keller. Cluster algebras and derived categories , 2012, 1202.4161.
[21] Benson Farb,et al. A Primer on Mapping Class Groups (Pms-49) , 2011 .
[22] B. Keller. On cluster theory and quantum dilogarithm identities , 2011, 1102.4148.
[23] T. Brustle,et al. On the cluster category of a marked surface without punctures , 2010, 1005.2422.
[24] Pierre-Guy Plamondon. Cluster algebras via cluster categories with infinite-dimensional morphism spaces , 2010, Compositio Mathematica.
[25] B. Keller,et al. Derived equivalences from mutations of quivers with potential , 2009, 0906.0761.
[26] Claire Amiot. Cluster categories for algebras of global dimension 2 and quivers with potential , 2008, 0805.1035.
[27] I. Reiten,et al. Mutation of cluster-tilting objects and potentials , 2008, 0804.3813.
[28] D. Labardini-Fragoso,et al. Quivers with potentials associated to triangulated surfaces , 2008, 0803.1328.
[29] Y. Yoshino,et al. Mutation in triangulated categories and rigid Cohen–Macaulay modules , 2006, math/0607736.
[30] J. Weyman,et al. Quivers with potentials and their representations I: Mutations , 2007, 0704.0649.
[31] D. Thurston,et al. Cluster algebras and triangulated surfaces. Part I: Cluster complexes , 2006, math/0608367.
[32] D. Krammer. A class of garside groupoid structures on the pure braid group , 2005, math/0509165.
[33] T. Bridgeland. Stability conditions on triangulated categories , 2002, math/0212237.
[34] Anton Zorich,et al. Connected components of the moduli spaces of Abelian differentials with prescribed singularities , 2002, math/0201292.
[35] S. Fomin,et al. Cluster algebras I: Foundations , 2001, math/0104151.
[36] M. Khovanov,et al. Quivers, Floer cohomology, and braid group actions , 2000, math/0006056.
[37] Richard P. Thomas,et al. Braid group actions on derived categories of coherent sheaves , 2000, math/0001043.