Describing the Jelonek set of polynomial maps via Newton polytopes

Abstract

Let =, or , and Sf be the set of points in n at which a polynomial map f:n→n is non-proper. Jelonek proved that Sf is a semi-algebraic set that is ruled by polynomial curves, with Sf≤ n-1, and provided a method to compute Sf for = . However, such methods do not exist for = . In this paper, we establish a straightforward description of Sf for a large family of non-proper maps f using the Newton polytopes of the polynomials appearing in f. Thus resulting in a new method for computing Sf that works for =, and highlights an interplay between the geometry of polytopes and that of Sf. As an application, we recover some of Jelonek's results, and provide conditions on (non-)properness of f. Moreover, we discover another large family of maps f whose Sf has dimension n-1 (even for =), satisfies an explicit stratification, and weak smoothness properties. This novel description allows our tools to be extended to all non-proper maps.