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Abundance theorem for minimal compact Kähler manifolds with vanishing second Chern class

In this paper, for compact Kähler manifolds with nef cotangent bundle, we study the abundance conjecture and the associated Iitaka fibrations. We show that, for a minimal compact Kähler manifold, the second Chern class vanishes if and only if the cotangent bundle is nef and the canonical bundle has the numerical dimension $0$ or $1$. Additionally, in this case, we prove that the canonical bundle is semi-ample. Furthermore, we give a relation between the variation of the fibers of the Iitaka fibration and a certain semipositivity of the cotangent bundle.

preprint2022arXivOpen access
Masataka IwaiShin-ichi Matsumura
math.CVmath.AGmath.DG
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Masataka IwaiShin-ichi Matsumura

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