On finite polynomial mappings
Abstract
Let X⊂ Cn be a smooth irreducible affine variety of dimension k and let F: X Cm be a polynomial mapping. We prove that if m k, then there is a Zariski open dense subset U in the space of linear mappings L( Cn, Cm) such that for every L∈ U the mapping F+L is a finite mapping. Moreover, we can choose U in this way, that all mappings F+L; L∈ U are topologically equivalent.
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