On Topological Approaches to the Jacobian Conjecture in Cn
Abstract
We obtain a structure theorem for the nonproperness set Sf of a nonsingular polynomial mapping f:Cn Cn. Jelonek's results on Sf and our result show that if f is a counterexample to the Jacobian conjecture, then Sf is a hypersurface such that Sf Z ≠ , for any Z⊂ Cn biregular to Cn-1 and Z = h-1(0) for a polynomial submersion h: Cn C. Also, we present topological approaches to the Jacobian conjecture in Cn.
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