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Limiting Properties of Certain Geometric Flows in Complex Geometry
2017
In this thesis, we study convergence results of certain non-linear geometric flows on vector bundles over complex manifolds. First we consider the case of a semi-stable vector bundle E over a compact Kahler manifold X of arbitrary dimension. We show that in this case Donaldson's functional is bounded from below. This allows us to construct an approximate Hermitian-Einstein structure on E along the Donaldson heat flow, generalizing a classic result of Kobayashi for projective manifolds to the
doi:10.7916/d8b85g5t
fatcat:nkxnivhgkzc4ddpwpjnsoigtsy