The fundamental group, rational connectedness and the positivity of Kaehler manifolds

Abstract

First we confirm a conjecture asserting that any compact K\"ahler manifold N with >0 must be simply-connected by applying a new viscosity consideration to Whitney's comass of (p, 0)-forms. Secondly we prove the projectivity and the rational connectedness of a K\"ahler manifold of complex dimension n under the condition k>0 (for some k∈ \1, ·s, n\, with n being the Ricci curvature), generalizing a well-known result of Campana, and independently of Koll\'ar-Miyaoka-Mori, for the Fano manifolds. The proof utilizes both the above comass consideration and a second variation consideration of Ni-Zheng2. Thirdly, motivated by and the classical work of Calabi-Vesentini CV, we propose two new curvature notions. The cohomology vanishing Hq(N, T'N)=\0\ for any 1 q n and a deformation rigidity result are obtained under these new curvature conditions. In particular they are verified for all classical K\"ahler C-spaces with b2=1. The new conditions provide viable candidates for a curvature characterization of homogenous K\"ahler manifolds related to a generalized Hartshone conjecture.