Removable sets for pseudoconvexity for weakly smooth boundaries
Abstract
We show that for bounded domains in Cn with C1,1 smooth boundary, if there is a closed set F of 2n-1-Lebesgue measure 0 such that ∂ F is C2-smooth and locally pseudoconvex at every point, then is globally pseudoconvex. Unlike in the globally C2-smooth case, the condition ``F of (relative) empty interior'' is not enough to obtain such a result. We also give some results under peak-set type hypotheses, which in particular provide a new proof of an old result of Grauert and Remmert about removable sets for pseudoconvexity under minimal hypotheses of boundary regularity.
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