Structure of the Newton tree at infinity of a polynomial in two variables

Abstract

Let f:C2 C be a polynomial map. Let C2 ⊂ X be a compactification of C2 where X is a smooth rational compact surface and such that there exists a morphism of varieties :X P1 which extends f. Put D=X C2; D is a curve whose irreducible components are smooth rational compact curves and all its singularities are ordinary double points. The dual graph of D is a tree. We are interested in this tree, and we analyse its complexity in terms of the genus of the generic fiber of f.