On quadratic polynomial mappings $f: \Bbb C^2 \to \Bbb C^2$
arXiv:1606.08752
Abstract
We show that up to linear equivalence, there is only finitely many polynomial quadratic mappings $f:\Bbb C^2\to\Bbb C^2$ and $f:\Bbb R^2\to \Bbb R^2.$ We list all possibilities.