Counting isolated points outside the image of a polynomial map

Abstract

We consider a generic family of polynomial maps f:=(f1,f2):C2→C2 with given supports of polynomials, and degree d(f):= (deg f1, deg f2). We show that the (non-) properness of maps f in this family depends uniquely on the pair of supports and that the set of isolated points in C2 f(C2) has a size of at most 6 d(f). This improves an existing upper bound (d(f) - 1)2 proven by Jelonek. Moreover, for each n∈N, we construct a dominant map f above, with d(f) = 2n+2, and having 2n isolated points in C2 f(C2). Our proofs are constructive and can be adapted to a method for computing isolated missing points of f. As a byproduct, we describe those points in terms of singularities of the bifurcation set of f.