一分快速三官方老平台

一分快速三官方老平台:发表论文

(1) C. Birkar, Boundedness and volume of generalised pairs. arXiv:2103.14935v2.      
(2) C. Birkar, G. Di Cerbo, R. Svaldi; Boundedness of elliptic Calabi-Yau varieties with a rational section.      
arXiv:2010.09769v1.      
(3) C. Birkar, On connectedness of non-klt loci of singularities of pairs. arXiv:2010.08226v1.      
(4) C. Birkar, Y. Chen, Singularities on toric fibrations. arXiv:2010.07651v1.      
(5) C. Birkar, K. Loginov, Bounding non-rationality of divisors on 3-fold Fano fibrations. arXiv:2007.15754v1.      
(6) C. Birkar, Generalised pairs in birational geometry. arXiv:2008.01008v2.      
(7) C. Birkar, Geometry and moduli of polarised varieties.. arXiv:2006.11238v1 (2020).      
(8) C. Birkar, Log Calabi-Yau fibrations. arXiv:1811.10709v2.      
(9) C. Birkar, Singularities of linear systems and boundedness of Fano varieties. Ann. of Math, 193, No. 2      
(2021), 347–405.      
(10) C. Birkar; Anti-pluricanonical systems on Fano varieties, Ann. of Math. 190, No. 2 (2019), 345–463.      
(11) C. Birkar, Y. Chen, L. Zhang, Iitaka’s Cn,m conjecture for 3-folds over finite fields. Nagoya Math. J., (2016), 1-31.      
(12) C. Birkar, J. Waldron; Existence of Mori fibre spaces for 3-folds in char p. Adv. in Math. 313 (2017), 62-101.      
(13) C. Birkar, D.-Q. Zhang; Effectivity of Iitaka fibrations and pluricanonical systems of polarized pairs. Pub. Math. IHES      
123 (2016), 283-331.      
(14) C. Birkar; The augmented base locus of real divisors over arbitrary fields. Math Ann. 368 (2017), no. 3-4, 905-921.      
(15) C. Birkar, J.A. Chen; Varieties fibred over abelian varieties with fibres of log general type. Adv. in Math. 270 (2015),      
206-222.      
(16) C. Birkar; Existence of flips and minimal models for 3-folds in char p. Annales Scientifiques de l’ENS,      
49 (2016), 169-212.      
(17) C. Birkar; Singularities on the base of a Fano type fibration. J. Reine Angew Math., 715 (2016), 125-142.      
(18) C. Birkar, Y. Chen; Images of manifolds with semi-ample anti-canonical divisor. J. Alg. Geom., 25 (2016), 273-287.      
(19) C. Birkar, Z. Hu; Log canonical pairs with good augmented base loci. Compos. Math, 150, 04, (2014), 579-592.      
(20) C. Birkar, Z. Hu; Polarized pairs, log minimal models, and Zariski decompositions. Nagoya Math. J.      
Volume 215 (2014), 203-224.      
(21) C. Birkar; Existence of log canonical flips and a special LMMP. Pub. Math. IHES. Volume 115 (2012), 1, 325-368.      
(22) C. Birkar; On existence of log minimal models and weak Zariski decompositions. Math Ann., Volume      
354 (2012), Number 2, 787-799.      
(23) C. Birkar; On existence of log minimal models II. J. Reine Angew Math. 658 (2011), 99-113.      
(24) C. Birkar; The Iitaka conjecture C n,m in dimension six. Compos. Math. 145 (2009), 1442-1446.      
(25) C. Birkar; On existence of log minimal models. Compos. Math. 146 (2010), 919-928.      
(26) C. Birkar; P. Cascini; C. Hacon; J. M c Kernan; Existence of minimal models for varieties of log general      
type. J. Amer. Math. Soc. 23 (2010), 405-468.      
(27) C. Birkar; V.V. Shokurov; Mld’s vs thresholds and flips. J. Reine Angew. Math. 638 (2010), 209-234.      
(28) C. Birkar; Ascending chain condition for log canonical thresholds and termination of log flips. Duke      
Math. Journal, volume 136, no 1, (2007), 173-180.×××