Singularities of Fano varieties of lines on singular cubic fourfolds
Abstract
Let X be a cubic fourfold that has only simple singularities and does not contain a plane. We prove that the Fano variety of lines on X has the same analytic type of singularity as the Hilbert scheme of two points on a surface with only ADE-singularities. This is shown as a corollary to the characterization of a singularity that is obtained as a K3[2]-type contraction and has a unique symplectic resolution.
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