Adjoint asymptotic multiplier ideal sheaves associated to potential triples
Abstract
In this paper, we explore the geometry of potential triples (X,,D), which by definition consists of a pair (X,) and an R-Cartier pseudoeffective divisor D on X. We define and study the asymptotic multiplier ideal sheaf J(X,, D) associated to a potential triple (X,,D). As a first main result, when D is big, we prove that the condition J(X,, D)=OX is equivalent to the triple (X,,D) being potentially klt, which is a klt analog of the pair (X,). We also study the closed set defined by the ideal sheaf J(X,, D) and prove a Nadel type cohomology vanishing theorem for J(X,, D). As an application of the main result, we prove that we can run the (KX++D)-MMP with scaling of an ample divisor for a pklt triple (X,,D).
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