An Edge-of-the Wedge Theorem for Hypersurface CR Functions
Abstract
The Lewy extension theorem asserts the holomorphic extendability of CR functions defined in a neighborhood of a point on a hypersurface in Cn+1. The edge-of-the-wedge theorem asserts the extendability of holomorphic functions defined in wedges in Cn+1 with edge a maximally real submanifold. In this article we prove under suitable hypotheses the holomorphic extendability to an open set in Cn+1 of CR functions defined in the intersection of a hypersurface with a wedge whose edge is contained in the hypersurface. Unlike the situation for the classical edge-of-the-wedge theorem, for this hypersurface version extendability generally depends on the direction of the wedge.
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