Relative Kähler-Einstein metric on Kähler varieties of positive Kodaira dimension
Abstract
In this paper we introduce a new notion of canonical metric. The notion of generalized Kähler-Einstein
metric on the Kähler varieties with an intermediate Kodaira dimension is not suitable
and we need to replace the twisted Kähler -Einstein metric (KE) to new notion of Relative
Kähler-Einstein metric (RKE) for such varieties and we highlight that to get C^∞-solution of
CMA equation of relative Kähler-Einstein metric we need Song-Tian-Tsuji measure (which has
minimal singularities with respect to other relative volume forms) be C^∞-smooth . Moreover,
we conjecture that if we have relative Kähler -Einstein metric then our family is stable in the
sense of Alexeev,and Kollar-Shepherd-Barron
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