Proper polynomial self-maps of the affine space: state of the art and new results
Abstract
Two proper polynomial maps f1, \,f2 n n are said to be equivalent if there exist 1,\, 2 ∈ Aut(n) such that f2=2 f1 1. In this article we investigate proper polynomial maps of topological degree d ≥ 2 up to equivalence. In particular we describe some of our recent results in the case n=2 and we partially extend them in higher dimension.
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