The diastatic exponential of a symmetric space

Abstract

Let (M, g) be a real analytic Kaehler manifold. We say that a smooth map Ep:W M from a neighborhood W of the origin of TpM into M is a diastatic exponential at p if it satisfies (d p)0=TpM, Dp(p (v))=gp(v, v), ∀ v∈ W, where Dp is Calabi's diastasis function at p (the usual exponential p obviously satisfied these equations when Dp is replaced by the square of the geodesics distance d2p from p). In this paper we prove that for every point p of an Hermitian symmetric space of noncompact type M there exists a globally defined diastatic exponential centered in p which is a diffeomorphism and it is uniquely determined by its restriction to polydisks. An analogous result holds true in an open dense neighborhood of every point of M*, the compact dual of M. We also provide a geometric interpretation of the symplectic duality map in terms of diastatic exponentials. As a byproduct of our analysis we show that the symplectic duality map pulls back the reproducing kernel of M* to the reproducing kernel of M.