On the Cox rings of some hypersurfaces
Abstract
We introduce a cohomological method to compute Cox rings of hypersurfaces in the ambient space P1 x Pn, which is more direct than existing methods. We prove that smooth hypersurfaces defined by regular sequences of coefficients are Mori dream spaces, generalizing a result of Ottem. We also compute Cox rings of certain specialized examples. In particular, we compute Cox rings in the well-studied family of Calabi--Yau threefolds of bidegree (2,4) in P1 x P3, determining explicitly how the Cox ring can jump discontinuously in a smooth family.
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