Extension of CR functions from boundaries in Cn × R

Abstract

Let ⊂ Cn × R be a bounded domain with smooth boundary such that ∂ has only nondegenerate elliptic CR singularities, and let f ∂ C be a smooth function that is CR at CR points of ∂ (when n=1 we require separate holomorphic extensions for each real parameter). Then f extends to a smooth CR function on , that is, an analogue of Hartogs-Bochner holds. In addition, if f and ∂ are real-analytic, then f is the restriction of a function that is holomorphic on a neighborhood of in Cn+1. An immediate application is a (possibly singular) solution of the Levi-flat Plateau problem for codimension 2 submanifolds that are CR images of ∂ as above. The extension also holds locally near nondegenerate, holomorphically flat, elliptic CR singularities.