Grothendieck’s pairing on component groups of Jacobians

Abhyankar had shown that in order to solve the Jacobian Conjecture, it suffices to rule out the existence of Jacobian pairs with mixed leading form. Assume that such a pair {,f,g} exists. Following Abhyankar, consider the Laurent series expansion of {f,g} at infinity. Part of the coefficients of the

We prove that the induced map G 0 (A) → G 0 ( A ) by completion is injective if A is an excellent noetherian local ring that satisfies one of the following three conditions: (i) A is henselian; (ii) A is a local ring at the homogeneous maximal ideal of a homogeneous ring over a field; (iii) A has at

Let C be a real algebraic curve of genus g with at least g real components B1; : : : ; Bg. We give an embedding of C into a blow up in one point of the projective plane. It allows us to describe geometrically the neutral real component Pic o (C) o of the Jacobian of C thanks to an isomorphism with t