In this thesis, we consider n-dimensional compact Kähler manifold X with semi-ample
canonical line bundle. We investigate the bound of Ricci curvature of X
along the long time solution of Kähler Ricci Flow. In particular, when the fibres
of X over the canonical model Xcan of X are biholomorphic to each other and
the Kodaira dimension is one, the Ricci curvature of X converges to the negative of a generalized Kähler-Einstein metric ωB locally away from the singular set of
X in C0loc(ω(t)) topology.
Permanent URL for this record: https://lbezone.hkust.edu.hk/bib/991013106459003412
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