On projective manifolds with semi-positive holomorphic sectional curvature

Abstract

In this paper, we establish a structure theorem for a smooth projective variety X with semi-positive holomorphic sectional curvature. Our structure theorem contains the solution for Yau's conjecture and it can be regarded as a natural generalization of the structure theorem proved by Howard-Smyth-Wu and Mok for holomorphic bisectional curvature. Specifically, we prove that X admits a locally trivial morphism φ:X Y such that the fiber F is rationally connected and the image Y has a finite \'etale cover A Y by an abelian variety A, by combining the author's previous work with the theory of holomorphic foliations. Moreover, we show that the universal cover of X is biholomorphic and isometric to the product Cm × F of the universal cover Cm of Y with a flat metric and the rationally connected fiber F with a K\"ahler metric whose holomorphic sectional curvature is semi-positive.