Envelope of holomorphy for boundary cross sets
Abstract
Let D⊂ n, G⊂ m be open sets, let A (resp. B) be a subset of the boundary ∂ D (resp. ∂ G) and let W be the 2-fold boundary cross ((D A)× B) (A×(B G)). An open subset X⊂n+m is said to be the ``envelope of holomorphy" of W if it is, in some sense, the maximal open set with the following property: Any function locally bounded on W and separately holomorphic on (A× G) (D× B) "extends" to a holomorphic function defined on X which admits the boundary values f a.e. on W. In this work we will determine the envelope of holomorphy of some boundary crosses.
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