Scalar Curvature and Projective Embeddings, I
S.K. Donaldson
Source: J. Differential Geom. Volume 59, Number 3
(2001), 479-522.
Abstract
We prove that a metric of constant scalar curvature on a polarised Kähler manifold is the limit of metrics induced from a specific sequence of projective embeddings; satisfying a condition introduced by H. Luo. This gives, as a Corollary, the uniqueness of constant scalar curvature Kähler metrics in a given rational cohomology class. The proof uses results in the literature on the asymptotics of the Bergman kernel. The arguments are presented in a general framework involving moment maps for two different group actions.
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Journal of Differential Geometry
