On polynomial convexity of compact subsets of totally-real submanifold in Cn
Abstract
Let K be a compact subset of a totally-real manifold M, where M is either a C2-smooth graph in C2n over Cn, or M=u-1\0\ for a C2-smooth submersion u from Cn to R2n-k, k≤ n. In this case we show that K is polynomially convex if and only if for a fixed neighbourhood U, defined in terms of the defining functions of M, there exists a plurisubharmonic function on Cn such that K⊂ \<0\⊂ U.
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