A K\"ahler Structure on Cartan Spaces

In this paper, we define a new metric on Cartan manifolds and obtain a K\"ahler structure on their cotangent bundles. We prove that on a Cartan manifold M of negative constant flag curvature, (T* M_0, G, J) has a K\"aahlerian structure. For Cartan manifolds of positive constant flag curvature, we show that the tube around the zero section has a K\"aahlerian structure. Finally by computing the Levi-Civita connection and components of curvature related to this metric, we show that there is no non- Riemannian Cartan structure such that (T* M_0, G, J) became a Einstein manifold or locally symmetric manifold.