RC-positivity, vanishing theorems and rigidity of holomorphic maps

Abstract

Let M and N be two compact complex manifolds. We show that if the tautological line bundle OTM*(1) is not pseudo-effective and OTN*(1) is nef, then there is no non-constant holomorphic map from M to N. In particular, we prove that any holomorphic map from a compact complex manifold M with RC-positive tangent bundle to a compact complex manifold N with nef cotangent bundle must be a constant map. As an application, we obtain that there is no non-constant holomorphic map from a compact Hermitian manifold with positive holomorphic sectional curvature to a Hermitian manifold with non-positive holomorphic bisectional curvature.