Maximal families of nodal varieties with defect
Abstract
In this paper we prove that a nodal hypersurface in P4 with defect has at least (d-1)2 nodes, and if it has at most 2(d-2)(d-1) nodes and d>6 then it contains either a plane or a quadric surface. Furthermore, we prove that a nodal double cover of P3 ramified along a surface of degree 2d with defect has at least d(2d-1) nodes. We construct the largest dimensional family of nodal degree d hypersurfaces in P(2n+2) with defect for d sufficiently large.
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