ON THE HARTOGS EXTENSION THEOREM FOR UNBOUNDED DOMAINS IN Cⁿ

Let Ω ⊂ Cⁿ, n > 2, be a domain with smooth connected boundary. If Ω is relatively compact, the Hartogs–Bochner theorem ensures that every CR distribution on ∂Ω has a holomorphic extension to Ω. For unbounded domains this extension property may fail, for example if Ω contains a complex hypersurface. The main result in this paper tells that the extension property holds if and only if the envelope of holomorphy of Cⁿ \ Ω is Cⁿ. It seems that it is the first result in the literature which gives a geometric characterization of unbounded domains in Cⁿ for which the Hartogs phenomenon holds. Comparing this to earlier work by the first two authors and Z. Słodkowski, one observes that the extension problem changes in character if one restricts to CR functions of higher regularity.