The metric completion of the Riemannian space of K\"ahler metrics

Abstract

Let X be a compact K\"ahler manifold and ∈ H1,1(X,) a K\"ahler class. We study the metric completion of the space of K\"ahler metrics in , when endowed with the Mabuchi L2-metric d. Using recent ideas of Darvas, we show that the metric completion (,d) of (,d) is a CAT(0) space which can be identified with 2(), a subset of the class 1() of positive closed currents with finite energy. We further prove, in the toric setting, that ,tor=tor2().