On finite regular and holomorphic mappings

Abstract

Let X, Y be smooth algebraic varieties of the same dimension. Let f, g : X Y be finite polynomial mappings. We say that f, g are equivalent if there exists a regular automorphism ∈ Aut(X) such that f = g . Of course if f, g are equivalent, then they have the same discriminant and the same geometric degree. We show, that conversely there is only a finite number of non-equivalent proper polynomial mappings f : X Y, such that D(f) = V and μ(f) = k. We prove the same statement in the local holomorphic situation. In particular we show that if f : ( Cn, 0) ( Cn, 0) is a proper and holomorphic mapping of topological degree two, then there exist biholomorphisms P,Q : ( Cn, 0) ( Cn, 0) such that P f Q (x1, x2,..., xn) = (x12, x2, ..., xn). Moreover, for every proper holomorphic mapping f : ( Cn, 0) ( Cn, 0) with smooth discriminant there exist biholomorphisms P,Q : ( Cn, 0) ( Cn, 0) such that P f Q (x1, x2,..., xn) = (x1k, x2, ..., xn), where k = μ(f).