Abstract
Let $K$ be any field with $\text{char}\,K\neq 2,3$. We classify all cubic homogeneous polynomial maps $H$ over $K$ whose Jacobian matrix, ${\mathcal{J}}H$, has $\text{rk}\,{\mathcal{J}}H\leq 2$. In particular, we show that, for such an $H$, if $F=x+H$ is a Keller map, then $F$ is invertible and furthermore $F$ is tame if the dimension $n\neq 4$.
Publisher
Cambridge University Press (CUP)
Cited by
2 articles.
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1. Some co-tame automorphisms of affine spaces;International Journal of Algebra and Computation;2021-09-28
2. The classification of some polynomial maps with nilpotent Jacobians;Linear Algebra and its Applications;2019-03