On the Ricci curvature of Kähler-Ricci flow

HKUST Electronic Theses

On the Ricci curvature of Kähler-Ricci flow

by Cheuk Yan Fung

THESIS 2022

M.Phil. Mathematics

1 online resource (vii, 37 pages) : illustrations (some color)

Abstract
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 X_can 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 ω_B locally away from the singular set of X in C⁰_loc(ω(t)) topology.

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Details

Collection HKUST Electronic Theses Degree M.Phil. Department Mathematics Supervisors Fong, Tsz Ho Authors Fung, Cheuk Yan Subjects Ricci flow Manifolds (Mathematics) Curvature Language English Call number Thesis MATH 2022 Fung DOI 10.14711/thesis-991013106459003412

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On the Ricci curvature of Kähler-Ricci flow

by Cheuk Yan Fung

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