Strictly regular and cscK metrics

Abstract

A Kaehler metric g with integral Kaehler form is said to be partially regular if the partial Bergman kernel associated to mg is a positive constant for all integer m sufficiently large. The aim of this paper is to prove that for all n≥ 2 there exists an n-complex dimensional manifold equipped with strictly partially regular and cscK metric g. Further, for n≥ 3, the (constant) scalar curvature of g can be chosen to be zero, positive or negative.