The moduli space of hypersurfaces whose singular locus has high dimension

Abstract

Let k be an algebraically closed field and let b and n be integers with n≥ 3 and 1≤ b ≤ n-1. Consider the moduli space X of hypersurfaces in Pnk of fixed degree l whose singular locus is at least b-dimensional. We prove that for large l, X has a unique irreducible component of maximal dimension, consisting of the hypersurfaces singular along a linear b-dimensional subspace of Pn. The proof will involve a probabilistic counting argument over finite fields.