Bergman metrics and geodesics in the space of K\"ahler metrics on principally polarized Abelian varieties

Abstract

It's well-known in geometry that the infinite dimensional symmetric space of smooth metrics in a fixed class on a polarized manifold is well approximated by finite dimensional submanifolds k ⊂ of Bergman metrics of height k. Then it's natural to ask whether geodesics in can be approximated by Bergman geodesics in k. For any polarized manifold, the approximation is in the C0 topology. While Song-Zelditch proved the C2 convergence for the torus-invariant metrics over toric varieties. In this article, we show that some C∞ approximation exists as well as a complete asymptotic expansion for principally polarized Abelian varieties. We also get a C∞ complete asymptotic expansion for harmonic maps into k which generalizes the work of Rubinstein-Zelditch on toric varieties.