Birational geometry of Calabi-Yau pairs and 3-dimensional Cremona transformations
Abstract
We develop a framework that allows one to describe the birational geometry of Calabi-Yau pairs (X,D). After establishing some general results for Calabi-Yau pairs (X,D) with mild singularities, we focus on the special case when X=P3 and D⊂ P3 is a quartic surface. We investigate how the appearance of increasingly worse singularities on D enriches the birational geometry of the pair (P3, D).
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