Discreteness of volumes of divisors on Calabi-Yau type varieties
Abstract
We study the volumes of divisors in Calabi--Yau type varieties. We show that given a klt Calabi--Yau pair (X,B) and an integral divisor A on X, the volume of A is in a fixed discrete set depending only on the dimension and singularities of (X,B). As an application, we prove a boundedness result of polarized log Calabi--Yau pairs which was conjectured by Birkar.
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