On Proper Polynomial Maps of C2.

Abstract

Two proper polynomial maps f1, f2 C2 C2 are said to be equivalent if there exist 1, 2 ∈ Aut(C2) such that f2=2 f1 1. We investigate proper polynomial maps of arbitrary topological degree d ≥ 2 up to equivalence. Under the further assumption that the maps are Galois coverings we also provide the complete description of equivalence classes. This widely extends previous results obtained by Lamy in the case d=2.