Classification of cubic homogeneous polynomial maps with Jacobian matrices of rank two
Abstract
Let K be any field with charK≠ 2,3. We classify all cubic homogeneous polynomial maps H over K with rk JH≤ 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≠ 4.
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