Bergman metrics and geodesics in the space of K\"ahler metrics on toric varieties

Abstract

Geodesics on the infinite dimensional symmetric space of K\"ahler metrics in a fixed K\"ahler class on a projective K\"ahler manifold X are solutions of a homogeneous complex Monge-Amp\`ere equation in X × A, where A ⊂ is an annulus. They are analogues of 1PS (one-parameter subgroups) on symmetric spaces G/G. Donaldson, Arezzo-Tian and Phong-Sturm raised the question whether Monge-Amp\`ere geodesics can be approximated by 1PS geodesics in the symmetric spaces of Bergman metrics. Phong-Sturm proved weak C0 convergence of Bergman to Monge-Amp\`ere geodesics on a general manifold. In this article we prove convergence in C2(A × X) in the case of toric K\"ahler metrics, extending our earlier result on 1.