On the contravariant of homogeneous forms arising from isolated hypersurface singularities

Abstract

Let Qnd be the vector space of homogeneous forms of degree d 3 on Cn, with n 2. The object of our study is the map , introduced in earlier articles by J. Alper, M. Eastwood and the author, that assigns to every form for which the discriminant does not vanish the so-called associated form lying in the space Qnn(d-2)*. This map is a morphism from the affine variety Xnd:=\f∈ Qnd:(f) 0\ to the affine space Qnn(d-2)*. Letting p be the smallest integer for which the product p extends to a morphism from Qnd to Qnn(d-2)*, one observes that the extended map defines a contravariant of forms in Qnd. In the present paper we obtain upper bounds for p thus providing estimates for the contravariant's degree.