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Subsets of full measure in a generic submanifold in $\C^n$ are non-plurithin

Published 13 Jul 2012 in math.CV | (1207.3312v1)

Abstract: In this paper we prove that if $I $ is a subset of measure 0 in a $C2-$smooth generic submanifold $M$ of $ \Cn$, then its complement in $M$ is non-plurithin at each point of $M$ in $\Cn$. This result improves a previous result of A. Edigarian and J. Wiegerinck, who considered the case where $I$ is pluripolar set contained in a $C1-$smooth generic submanifold $M \subset \Cn$. The proof of our result is essentially different.

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