Deformations of the Fano scheme of a cubic
Abstract
We study the deformation theory of the Fano scheme F=F(X) of lines on a cubic X of dimension d with only finitely many singularities. By taking the relative Fano scheme, we define a morphism η:DX→DF of the local moduli functors associated to X and F, respectively. We show that for d≥slant 5, η yields an isomorphism on first-order deformations; in particular, η is an isomorphism whenever H0(X)=0.
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