Approximation of analytic sets with proper projection by algebraic sets
classification
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keywords
setsalgebraicanalyticprojectionproperapproximatedapproximationdimension
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Let $X$ be an analytic subset of $U\times C^n$ of pure dimension $k$ such that the projection of $X$ onto $U$ is a proper mapping, where $U$ is a Runge domain in $C^k$. We show that $X$ can be approximated by algebraic sets.
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