A CHARACTERIZATION OF PROJECTIVE SPACES FROM THE MORI THEORETIC VIEWPOINT

[1] M. Andreatta and J.A. Wis´niewski: A note on nonvanishing and applications, Duke Math. J. 72 (1993), 739–755.

[2] C. Araujo and S. Druel: On codimension 1 del Pezzo foliations on varieties with mild singularities, Math. Ann. 360 (2014), 769–798.

[3] O. Fujino: Notes on toric varieties from Mori theoretic viewpoint, Tohoku Math. J. (2) 55 (2003), 551–564.

[4] O. Fujino: Toric varieties whose canonical divisors are divisible by their dimensions, Osaka J. Math. 43(2006), 275–281.

[5] O. Fujino: Fundamental theorems for the log minimal model program, Publ. Res. Inst. Math. Sci. 47 (2011), 727–789.

[6] O. Fujino: Fundamental theorems for semi log canonical pairs, Algebr. Geom. 1 (2014), 194–228.

[7] O. Fujino: Foundations of the minimal model program, MSJ Memoirs 35, Mathematical Society of Japan, Tokyo, 2017.

[8] O. Fujino: A relative spannedness for log canonical pairs and quasi-log canonical pairs, to appear in Ann. Sci. Norm Super. Pisa Cl. Sci.

[9] T. Fujita: On the structure of polarized varieties with Δ-genera zero, J. Fac. Sci. Univ. Tokyo Sect. IA Math. 22 (1975), 103–115.

[10] T. Fujita: The structure and classification of polarized varieties, (Japanese) Su¯gaku 27 (1975), 316–326.

[11] T. Fujita: Classification theories of polarized varieties, London Mathematical Society Lecture Note Series155, Cambridge University Press, Cambridge, 1990.

[12] S. Iitaka: Kakankan-ron. (Japanese) [Theory of commutative rings], Second edition, Iwanami Shoten Kiso Su¯gaku [Iwanami Lectures on Fundamental Mathematics] 8, Daisu¯ [Algebra], iv. Iwanami Shoten, Tokyo, 1984.

[13] S. Kobayashi and T. Ochiai: Characterizations of complex projective spaces and hyperquadrics, J. Math. Kyoto Univ. 13 (1973), 31–47.

[14] J. Kolla´r: Lectures on resolution of singularities, Annals of Mathematics Studies 166, Princeton University Press, Princeton, NJ, 2007.