On the moduli space of hypersurfaces singular along a subscheme of large dimension but small degree
Abstract: Let $k$ be an algebraically closed field. Fix integers $n$ and $b$ with $n\geq 3$ and $1\leq b\leq n-1.$ Let $Td_k$ be the moduli space of hypersurfaces $[F]$ in $\mathbb{P}n_k$ of degree $l$ whose singular locus contains a subscheme of dimension $b$ with Hilbert polynomial among the Hilbert polynomials of $b$-dimensional integral closed subschemes of $\mathbb{P}n$ of degree $d$. We prove that when $l$ is sufficiently large and $2\leq d\leq \frac{l+1}{2},$ any irreducible component $Z$ of $Td_k$ satisfies $Z=T1_k$ or $\dim Z<\dim T1_k.$
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