Quadratic homogeneous polynomial maps H and Keller maps x+H with 3 rk J H 4

Abstract

We compute by hand all quadratic homogeneous polynomial maps H and all Keller maps of the form x + H, for which rk J H = 3, over a field of arbitrary characteristic. Furthermore, we use computer support to compute Keller maps of the form x + H with rk J H = 4, namely: all such maps in dimension 5 over fields with 12; all such maps in dimension 6 over fields without 12. We use these results to prove the following over fields of arbitrary characteristic: for Keller maps x + H for which rk J H 4, the rows of J H are dependent over the base field.