Balanced metrics on complex vector bundles and the diastatic exponential of a symmetric space

This thesis deals with two different subjects: balanced metrics on complex vector bundles and the diastatic exponential of a symmetric space. Correspondingly we have two main results. In the first one we prove that if a holomorphic vector bundle E over a compact Kà¤hler manifold (M,?) admits a ?-balanced metric then this metric is unique. In the second one, after defining the diastatic exponential of a real analytic Kà¤hler manifold, we prove that for every point p of an Hermitian symmetric space of noncompact type there exists a globally defined diastatic exponential centered in p which is a diffeomorphism and it is uniquely determined by its restriction to polydisks.