English

Some Reductions on Jacobian Problem in Two Variables

Algebraic Geometry 2009-02-06 v1 Commutative Algebra Complex Variables

Abstract

Let f=(f1,f2)f=(f_1, f_2) be a regular sequence of affine curves in \bC2\bC^2. Under some reduction conditions achieved by composing with some polynomial automorphisms of \bC2\bC^2, we show that the intersection number of curves (fi)(f_i) in \bC2\bC^2 equals to the coefficient of the leading term xn1x^{n-1} in g2g_2, where n=degfin=\deg f_i (i=1,2)(i=1, 2) and (g1,g2)(g_1, g_2) is the unique solution of the equation yJ(f)=g1f1+g2f2y{\mathcal J}(f)=g_1f_1+g_2f_2 with deggin1\deg g_i\leq n-1. So the well-known Jacobian problem is reduced to solving the equation above. Furthermore, by using the result above, we show that the Jacobian problem can also be reduced to a special family of polynomial maps.

Keywords

Cite

@article{arxiv.math/0209254,
  title  = {Some Reductions on Jacobian Problem in Two Variables},
  author = {Wenhua Zhao},
  journal= {arXiv preprint arXiv:math/0209254},
  year   = {2009}
}