A Division Theorem for Nodal Projective Hypersurfaces

Abstract

Let Vn,d be the variety of equations for hypersurfaces of degree d in Pn(C) with singularities not worse than simple nodes. We prove that the orbit map G'=SLn+1(C) Vn,d, g g· s0, s0∈ Vn,d is surjective on the rational cohomology if n>1, d≥ 3, and (n,d)≠ (2,3). As a result, the Leray-Serre spectral sequence of the map from Vn,d to the homotopy quotient (Vn,d)hG' degenerates at E2, and so does the Leray spectral sequence of the quotient map Vn,d Vn,d/G' provided the geometric quotient Vn,d/G' exists. We show that the latter is the case when d>n+1.