Structures of $\epsilon$-lc Calabi--Yau pairs

Abstract

We study the structures of $\epsilon$-lc Calabi--Yau pairs. We show that such pairs possess a finite cover that is isomorphic in codimension 1 with a fiber product of a Calabi--Yau variety and a rationally connected variety. Moreover, the degree of the cover depends only on $\epsilon$ and the dimension. As a corollary, we show that the index of 4-dimensional non-canonical Calabi--Yau variety is bounded. We also prove a boundedness result on polarized $\epsilon$-lc Calabi--Yau pairs.

Locations

• arXiv (Cornell University) - View - PDF