On Grauert-Riemenschneider type criterions

Zhiwei Wang

arXiv:1712.06888·math.CV·December 20, 2017

On Grauert-Riemenschneider type criterions

Zhiwei Wang

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Abstract

Let $(X, ω)$ be a compact Hermitian manifold of complex dimension $n$ . In this article, we first survey recent progress towards Grauert-Riemenschneider type criterions. Secondly, we give a simplified proof of Boucksom's conjecture given by the author under the assumption that the Hermitian metric $ω$ satisfies $\partial \overline{\partial} ω^{l} =$ for all $l$ , i.e., if $T$ is a closed positive current on $X$ such that $\int_{X} T_{a c}^{n} > 0$ , then the class ${T}$ is big and $X$ is K\"{a}hler. Finally, as an easy observation, we point out that Nguyen's result can be generalized as follows: if $\partial \overline{\partial} ω = 0$ , and $T$ is a closed positive current with analytic singularities, such that $\int_{X} T_{a c}^{n} > 0$ , then the class ${T}$ is big and $X$ is K\"{a}hler.

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TopicsGeometry and complex manifolds · Geometric Analysis and Curvature Flows · Nonlinear Waves and Solitons