Kahler manifolds with real holomorphic vector fields

Abstract

For a K\"ahler manifold endowed with a weighted measure e-f\,dv, the associated weighted Hodge Laplacian f maps the space of (p,q)-forms to itself if and only if the (1,0)-part of the gradient vector field ∇ f is holomorphic. We use this fact to prove that for such f, a finite energy f harmonic function must be pluriharmonic. Motivated by this result, we verify that the same also holds true for f-harmonic maps into a strongly negatively curved manifold. Furthermore, we demonstrate that such f-harmonic maps must be constant if f has an isolated minimum point. In particular, this implies that for a compact K\"ahler manifold admitting such a function, there is no nontrivial homomorphism from its first fundamental group into that of a strongly negatively curved manifold.