Smoothing pairs over degenerate Calabi-Yau varieties
Abstract
We apply the techniques developed in our previous work with Leung to study smoothings of a pair (X,C*), where C* is a bounded perfect complex of locally free sheaves over a degenerate Calabi-Yau variety X. In particular, if X is a projective Calabi-Yau variety admitting the structure of a toroidal crossing space and with the higher tangent sheaf T1X globally generated, and F is a locally free sheaf over X, then we prove, using the recent results of Felten-Filip-Ruddat, that the pair (X,F) is formally smoothable when Ext2(F,F)0 = 0 and H2(X,OX) = 0.
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