2019
DOI: 10.4310/mrl.2019.v26.n5.a6
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On semipositivity theorems

Abstract: We generalize the Fujita-Zucker-Kawamata semipositivity theorem from the analytic viewpoint.

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Cited by 8 publications
(5 citation statements)
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“…[Zuo00] and [Bru,Theorem 0.6]. See also [FF17] for a different proof. From this, one can easily deduce Corollary 1.5 in the special case where the eigenvalues of the residues are rational numbers, as explained for example in [PW16].…”
Section: Statement Of the Main Resultsmentioning
confidence: 98%
“…[Zuo00] and [Bru,Theorem 0.6]. See also [FF17] for a different proof. From this, one can easily deduce Corollary 1.5 in the special case where the eigenvalues of the residues are rational numbers, as explained for example in [PW16].…”
Section: Statement Of the Main Resultsmentioning
confidence: 98%
“…We note that similar statements appear in various contexts in algebraic geometry; cf. [7,13,16,18,20,22,23,29,30,41,42,49] among many others. The fundamental results of Cattani et al [9] are an indispensable tool in the arguments of most of the articles quoted above.…”
Section: [U]mentioning
confidence: 99%
“…. Then G is locally free and G * is a nef locally free sheaf on C ′ (see [FF1,Corollary 5.23], [FFS], [FF2], [Fujisa], and so on). Since R…”
Section: Proof Of Theoremsmentioning
confidence: 99%