The Hessian correspondence of hypersurfaces of degree 3 and 4

Abstract

Let X be a hypersurface, of degree d, in an n--dimensional projective space. The Hessian map is a rational map from X to the projective space of symmetric matrices that sends a point p∈ X to the Hessian matrix of the defining polynomial of X evaluated at p. The Hessian correspondence is the map that sends a hypersurface to its Hessian variety; i.e. the Zariski closure of its image via the Hessian map. In this paper, we study this correspondence for hypersurfaces with Waring rank at most n+1 and for hypersurfaces of degree 3 and 4. We prove that, for hypersurfaces with Waring rank k≤ n+1, the map is birational onto its image for d even, and it is generically finite of degree 2k-1 for d odd. We prove that, for degree 3 and n=1, the map is two to one, and that, for degree 3 and n≥ 2, and for degree 4, the Hessian correspondence is birational. In this study, we introduce the k--gradients varieties and analyze their main properties. We provide effective algorithms for recovering a hypersurface from its Hessian variety, for degree 3 and n≥ 1, and for degree 4 and n even.