Homogeneous quasi-translations in dimension 5

Abstract

We give a proof in modern language of the following result by Paul Gordan and Max N\"other: a homogeneous quasi-translation in dimension 5 without linear invariants would be linearly conjugate to another such quasi-translation x + H, for which H5 is algebraically independent over C of H1, H2, H3, H4. Just like Gordan and N\"other, we apply this result to classify all homogeneous polynomials h in 5 indeterminates from which the Hessian determinant is zero. Others claim to have reproved 'the result of Gordan and N\"other in P4' as well, but some of them assume that h is irreducible, which Gordan and N\"other did not. Furthermore, they do not use the above result about homogeneous quasi-translations in dimension 5 for their classifications. (There is however one paper which could use this result very well, to fix a gap caused by an error.) We derive some other properties which H would have. One of them is that deg\, H 15, for which we give a proof which is less computational than another proof of it by Dayan Liu. Furthermore, we show that the Zariski closure of the image of H would be an irreducible component of V(H), and prove that every other irreducible component of V(H) would be a 3-dimensional linear subspace of C5 which contains the fifth standard basis unit vector.