Conic singularities metrics with prescribed Ricci curvature: the case of general cone angles along normal crossing divisors

Abstract

Let X be a non-singular compact K\"ahler manifold, endowed with an effective divisor D= Σ (1-βk) Yk having simple normal crossing support, and satisfying βk ∈ (0,1). The natural objects one has to consider in order to explore the differential-geometric properties of the pair (X, D) are the so-called metrics with conic singularities. In this article, we complete our earlier work CGP concerning the Monge-Amp\`ere equations on (X, D) by establishing Laplacian and C2,α, β estimates for the solution of this equations regardless to the size of the coefficients 0<βk< 1. In particular, we obtain a general theorem concerning the existence and regularity of K\"ahler-Einstein metrics with conic singularities along a normal crossing divisor.