Skoda-Zeriahi type integrability and entropy compactness for some measure with L1-density

Abstract

In this paper, we prove the Skoda-Zeriahi type integrability theorem with respect to some measure with L1-density. In addition, we introduce the log-log threshold in order to detect singularities of K\"ahler potentials. We prove the positivity of the integrability threshold for such a measure and K\"ahler potentials with uniform log-log threshold. As an application, we prove the entropy compactness theorem for a family of potential functions of Poincar\'e type K\"ahler metrics with uniform log-log threshold. The Ohsawa-Takegoshi L2-extension theorem and Skoda-Zeriahi's integrability theorem play a very important role in this paper.