References
- Arcara, D., Bertram, A., Coskun, I., Huizenga, J. (2013). The minimal model program for the Hilbert scheme of points on P2 and Bridgeland stability. Adv. Math. 235:580–626.
- Aaron, B., Izzet, C. (2013). The birational geometry of the Hilbert scheme of points on surfaces. In: Birational Geometry, Rational Curves, and Arithmetic. New York: Springer, 15–55.
- Bertram, A., Martinez, C., Wang, J. (2014). The birational geometry of moduli spaces of sheaves on the projective plane. Geom. Dedicata 173(1):37–64.
- Choi, J., Chung, K. (2016). Moduli spaces of -stable pairs and wall-crossing on P2. J. Math. Soc. Japan 68(2):685–789.
- Choi, J., Chung, K. (2015). The geometry of the moduli space of one-dimensional sheaves. Sci. China Math. 58(3):487–500.
- Chung, K., Moon, H.-B. (2017). Birational geometry of the moduli space of pure sheaves on quadric surface. Comptes Rendus – Math. 355(10):1082–1088.
- Chung, K., Moon, H.-B. (2017). Chow ring of the moduli space of stable sheaves supported on quartic curves. Quart. J. Math. 68(3):851–887.
- Mario, M. Moduli of sheaves supported on curves of genus two in a quadric surface. arXiv:1612.03566, (2016).
- Le Potier, J. (1993). Systèmes cohérents et structures de Niveau. Astérisque 214:143.
- Maruyama, M. (1973). On a family of algebraic vector bundles. In: Akizuki, Y., Kusunoki, A., eds. Number Theory, Algebraic Geometry, and Commutative Algebra. Tokyo: Kinokuniya, pp. 95–149.
- King, A. D. (1994). Moduli of representations of finite-dimensional algebras. Q J. Math. 45(4):515–530.
- Dolgachev, I. (2012). Classical Algebraic Geometry: A Modern View. Cambridge: Cambridge University Press.
- Di Rocco, S. (1996). k-Very ample line bundles on del Pezzo surfaces. Math. Nachr. 179(1):47–56.
- Beltrametti, M., Sommese, A. (1993). On the preservation of k-very ampleness under adjunction. Math. Z 212(1):257–283.
- Knutsen, A. (2003). Exceptional curves on del Pezzo surfaces. Math. Nachr. 256(1):58–81.
- Choi, J., van Garrel, M., Katz, S., Takahashi, N. Local BPS invariants: Enumerative aspects and wall-crossing. Int. Math. Res. Notices rny171. DOI: 10.1093/imrn/rny171.
- He, M. (1998). Espaces de modules de systèmes cohérents. Int. J. Math. 09(05):545–598.
- Drézet, J.-M., Maican, M. (2011). On the geometry of the moduli spaces of semi-stable sheaves supported on plane quartics. Geom. Dedicata 152(1):17–49.
- Han-Bom, M. (2011). Birational geometry of moduli spaces of curves of genus zero. Thesis. Seoul National University, Republic of Korea.