A local-global principle for surjective polynomial maps

Abstract

Let R be an affine domain of characteristic zero with finite quotients. We prove that a polynomial map over R is surjective if and only if it is surjective over Rm, the completion of R with respect to m, for every maximal ideal m ⊂eq R. In fact, the completions Rm may be replaced by arbitrary subrings containing R. We use this result to yield a characterization of surjective polynomial maps, and remark that there does not exist a similar principle for injective polynomial maps.