K\"ahler-Einstein metrics with positive curvature near an isolated log terminal singularity

Abstract

We analyze the existence of K\"ahler-Einstein metrics of positive curvature in the neighborhood of a germ of a log terminal singularity (X,p). This boils down to solve a Dirichlet problem for certain complex Monge-Amp\`ere equations. We show that the solvability of the latter is independent of the shape of the domain and of the boundary data. We establish a Moser-Trudinger (MT)γ inequality in subcritical regimes γ<γp and establish the existence of smooth solutions in that cases. We show that the expected critical exponent γp=n+1n vol(X,p)1/n can be expressed in terms of the normalized volume, an important algebraic invariant of the singularity.