Regularity of weak minimizers of the K-energy and applications to properness and K-stability

Abstract

Let (X,ω) be a compact K\"ahler manifold and H the space of K\"ahler metrics cohomologous to ω. If a cscK metric exists in H, we show that all finite energy minimizers of the extended K-energy are smooth cscK metrics, partially confirming a conjecture of Y.A. Rubinstein and the second author. As an immediate application, we obtain that existence of a cscK metric in H implies J-properness of the K-energy, thus confirming one direction of a conjecture of Tian. Exploiting this properness result we prove that an ample line bundle (X,L) admitting a cscK metric in c1(L) is K-polystable.