On Fano-Enriques threefolds
arXiv:math/0604468 · doi:10.1070/SM2007v198n04ABEH003849
Abstract
Let $U\subset \mathbb P^N$ be a projective variety which is not a cone and whose hyperplane sections are smooth Enriques surfaces. We prove that the degree of a $U$ is at most 32 and the bound is sharp.
18 pages, LaTeX