On homaloidal polynomial functions of degree 3 and prehomogeneous vector spaces

Abstract

In this paper we consider homaloidal polynomial functions f such that their multiplicative Legendre transform f*, defined as in [Section3.2]MR1890194, is again polynomial. Following Dolgachev MR1786486, we call such polynomials EKP-homaloidal. We prove that every EKP-homaloidal polynomial function of degree three is a relative invariant of a symmetric prehomogeneous vector space. This provides a complete proof of [Theorem 3.10, p.~39]MR1890194. With respect to the original argument of Etingof, Kazhdan and Polischuk our argument focuses more on prehomogeneous vector spaces and, in principle, it may suggest a way to attack the more general problem raised in [Section 3.4]MR1890194 of classification of EKP-homaloidal polynomials of arbitrary degree.