Hyperplane sections of Calabi-Yau varieties
Abstract
Theorem: If W is a smooth complex projective variety with h1 (O-scriptW) = 0, then a sufficiently ample smooth divisor X on W cannot be a hyperplane section of a Calabi-Yau variety, unless W is itself a Calabi-Yau. Corollary: A smooth hypersurface of degree d in Pn (n >= 2) is a hyperplane section of a Calabi-Yau variety iff n+2 <= d <= 2n+2. The method is to construct out of the variety W a universal family of all varieties Z for which X is a hyperplane section with normal bundle KX, and examine the "bad" singularities of such Z. A motivation is to show many curves cannot be divisors on a K-3 surface.
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