On Globally Diffeomorphic Polynomial Maps via Newton Polytopes and Circuit Numbers

Abstract

In this article we analyze the global diffeomorphism property of polynomial maps F:Rn→Rn by studying the properties of the Newton polytopes at infinity corresponding to the sum of squares polynomials \|F\|22. This allows us to identify a class of polynomial maps F for which their global diffeomorphism property on Rn is equivalent to their Jacobian determinant det JF vanishing nowhere on Rn. In other words, we identify a class of polynomial maps for which the Real Jacobian Conjecture, which was proven to be false in general, still holds.