Extendability of projective varieties via degeneration to ribbons with applications to Calabi-Yau threefolds

Abstract

In this article we study the extendability of a smooth projective variety by degenerating it to a ribbon. We apply the techniques to study extendability of Calabi-Yau threefolds Xt that are general deformations of Calabi-Yau double covers of Fano threefolds of Picard rank 1. The Calabi-Yau threefolds Xt PNl, embedded by the complete linear series |lAt|, where At is the generator of Pic(Xt), l ≥ j and j is the index of Y, are general elements of a unique irreducible component HlY of the Hilbert scheme which contains embedded Calabi-Yau ribbons on Y as a special locus. For l = j, using the classification of Mukai varieties, we show that the general Calabi-Yau threefold parameterized by HjY is as many times smoothly extendable as Y itself. On the other hand, we find for each deformation type Y, an effective integer lY such that for l ≥ lY, the general Calabi-Yau threefold parameterized by HlY is not extendable. These results provide a contrast and a parallel with the lower dimensional analogues; namely, K3 surfaces and canonical curves, which stems from the following result we prove: for l ≥ lY, the general hyperplane sections of elements of HlY fill out an entire irreducible component SlY of the Hilbert scheme of canonical surfaces which are precisely 1- extendable with HYl being the unique component dominating SlY. The contrast lies in the fact that for polarized K3 surfaces of large degree, the canonical curve sections do not fill out an entire component while the parallel is in the fact that the canonical curve sections are exactly one-extendable.