2010
DOI: 10.4310/mrl.2010.v17.n6.a9
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On the canonical line bundle and negative holomorphic sectional curvature

Abstract: Abstract. We prove that a smooth complex projective threefold with a Kähler metric of negative holomorphic sectional curvature has ample canonical line bundle. In dimensions greater than three, we prove that, under equal assumptions, the nef dimension of the canonical line bundle is maximal. With certain additional assumptions, ampleness is again obtained. The methods used come from both complex differential geometry and complex algebraic geometry.

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Cited by 39 publications
(36 citation statements)
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“…Additionally, due to [Kaw85a], a Brody hyperbolic projective manifold (or even one that is merely free of rational curves) has ample canonical bundle if it is of general type. Thus, up to the validity of the Abundance Conjecture, our work in [HLW10] proves the following conjecture, which the third named author learnt from S.-T. Yau in personal conversations in the early 1970s.…”
Section: Theorem 11 ([Hlw10]mentioning
confidence: 74%
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“…Additionally, due to [Kaw85a], a Brody hyperbolic projective manifold (or even one that is merely free of rational curves) has ample canonical bundle if it is of general type. Thus, up to the validity of the Abundance Conjecture, our work in [HLW10] proves the following conjecture, which the third named author learnt from S.-T. Yau in personal conversations in the early 1970s.…”
Section: Theorem 11 ([Hlw10]mentioning
confidence: 74%
“…After the publication of our paper [HLW10], another paper on this topic appeared, namely [WWY12]. Its main result is as follows.…”
Section: Theorem 11 ([Hlw10]mentioning
confidence: 99%
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