English

The Thom Conjecture for proper polynomial mappings

Algebraic Geometry 2015-02-10 v4

Abstract

Let f,g:XYf,g:X \to Y be continuous mappings. We say that ff is topologically equivalent to gg if there exist homeomorphisms Φ:XX\Phi : X\to X and Ψ:YY\Psi: Y\to Y such that ΨfΦ=g.\Psi\circ f\circ \Phi=g. Let X,YX,Y be complex smooth irreducible affine varieties. We show that every algebraic family F:M×X(m,x)F(m,x)=fm(x)YF: M\times X\ni (m, x)\mapsto F(m, x)=f_m(x)\in Y of polynomial mappings contains only a finite number of topologically non-equivalent proper mappings. In particular there are only a finite number of topologically non-equivalent proper polynomial mappings f:CnCmf: \Bbb C^n\to\Bbb C^m of bounded (algebraic) degree. This gives a positive answer to the Thom Conjecture in the case of proper polynomial mappings.

Keywords

Cite

@article{arxiv.1404.7463,
  title  = {The Thom Conjecture for proper polynomial mappings},
  author = {Zbigniew Jelonek},
  journal= {arXiv preprint arXiv:1404.7463},
  year   = {2015}
}
R2 v1 2026-06-22T04:02:10.591Z