Compact Kähler manifolds with partially semi-positive curvature
Abstract
In this paper, we establish a structure theorem for a compact K\"{a}hler manifold $X$ of rational dimension $\mathrm{rd}(X)\leq n-k$ under the mixed partially semi-positive curvature condition $\mathcal{S}_{a,b,k} \geq 0$, which is introduced as a unified framework for addressing two partially semi-positive curvature conditions -- namely, $k$-semi-positive Ricci curvature and semi-positive $k$-scalar curvature. As a main corollary, we show that a compact K\"{a}hler manifold $(X,g)$ with $k$-semi-positive Ricci curvature and $\mathrm{rd}(X)\leq n-k$ actually has semi-positive Ricci curvature and $\mathrm{rd}(X)\geq \nu(-K_X)$. Of independent interest, we also confirm the rational connectedness of compact K\"{a}hler manifolds with positive orthogonal Ricci curvature, among other results.