Boundary cross theorem in dimension 1
Abstract
Let X, Y be two complex manifolds of dimension 1 which are countable at infinity, let D⊂ X, G⊂ Y be two open sets, let A (resp. B) be a subset of ∂ D (resp. ∂ G), and let W be the 2-fold cross ((D A)× B) (A×(B G)). Suppose in addition that D (resp. G) is Jordan-curve-like on A (resp. B) and that A and B are of positive length. We determine the "envelope of holomorphy" W of W in the sense that any function locally bounded on W, measurable on A× B, and separately holomorphic on (A× G) (D× B) "extends" to a function holomorphic on the interior of W.
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