Cotangent Bundles with General Natural Kahler Structures

Abstract

We study the conditions under which an almost Hermitian structure (G,J) of general natural lift type on the cotangent bundle T*M of a Riemannian manifold (M,g) is K\" ahlerian. First, we obtain the algebraic conditions under which the manifold (T*M,G,J) is almost Hermitian. Next we get the integrability conditions for the almost complex structure J, then the conditions under which the associated 2-form is closed. The manifold (T*M,G,J) is K\" ahlerian iff it is almost Kahlerian and the almost complex structure J is integrable. It follows that the family of Kahlerian structures of above type on T*M depends on three essential parameters (one is a certain proportionality factor, the other two are parameters involved in the definition of J).