On the structure of complete k\"ahlerian manifolds furnished with closed conformal vector fields

Abstract

We show that if a connected compact k\"ahlerian surface M with nonpositive gaussian curvature is furnished with a closed conformal vector field whose singular points are isolated, then M is isometric to a flat torus and is parallel. We also consider the case of a connected complete k\"ahlerian manifod M of complex dimension n>1 and furnished with a nontrivial closed conformal vector field . In this case, it is well known that the singularities of are automatically isolated and the nontrivial leaves of the distribution generated by and J are totally geodesic in M. Assuming that one such leaf is compact, has torsion normal holonomy group and that the holomorphic sectional curvature of M along it is nonpositive, we show that is parallel and M is foliated by a family of totally geodesic isometric tori and also by a family of totally geodesic isometric complete k\"ahlerian manifolds of complex dimension n-1. In particular, the the universal covering of M is isometric to a riemannian product having R2 as a factor. We also present a generic example showing that one cannot get rid of the hypothesis on the nonpositivity of the holomorphic sectional curvature along at least one such leaf.