Vanishing theorems and rational connectedness on holomorphic tensor fields

Abstract

A vanishing theorem for uniformly RC k-positive Hermitian holomorphic vector bundles is established. It turns out that the holomorphic tangent bundle of a compact complex manifold equipped with a positive k-Ricci curvature K\"ahler metric is uniformly RC k-positive. Two main applications are presented. The first one is to deduce that spaces of some holomorphic tensor fields on such K\"ahler or more generally K\"ahler-like Hermitian manifolds are trivial, generalizing some recent results. The second one is to show that a compact K\"ahler manifold whose holomorphic tangent bundle can be endowed with either a uniformly RC k-positive Hermitian metric or a positive k-Ricci curvature K\"ahler-like Hermitian metric is projective and rationally connected.