On the Lefschetz locus in Gor(1,n,n,1)
Abstract
We study two special families of cubic hypersurfaces with vanishing Hessian in PN, obtaining rational parametrizations and computing their degree in P(S3). For N ≤ 6, these two families exhaust the locus of cubics with vanishing Hessian that are not cones. As a consequence, via Macaulay-Matlis duality, we obtain a description of the locus in Gor(1, n, n, 1) corresponding to those algebras that satisfy the Strong Lefschetz property, for n ≤ 7.
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