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≥ 3 and 1≤ b≤ n-1. Let Tdk be the moduli space of hypersurfaces [F] in Pnk 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 Pn of degree d. We prove that when l is sufficiently large and 2≤ d≤ l+12, any irreducible component Z of Tdk satisfies Z=T1k or Z< T1k.