On the Holomorphic Extension of CR Distributions from Non Generic CR Submanifolds of $\C^L$

Details On the Holomorphic Extension of CR Distributions from Non Generic CR Submanifolds of $\C^L$ On the Holomorphic Extension of CR Distributions from Non Generic CR Submanifolds of $\C^L$

2005-04-25

arxiv.org/abs/math/0504521v1

Mathematics

Complex Variables

Scientific paper

We give a holomorphic extension result from non generic CR submanifold of $\C^L$ of positive CR dimension. We consider $N$ a non generic CR submanifold given by $N=\{\n,h(\n)\}$ where $\n$ is a generic submanifold of some $\C^{\ell}$ and $h$ is a CR map from $\n$ into $\C^n$. We prove that if $\n$ is a hypersurface then any CR distribution on $N$ extends holomorphically to a complex transversal wedge, we then generalize this result for arbitrary $\n$ in the case where the graphing function $h$ is decomposable at some $p'\in \n$. We show that any CR distribution on $N$ that is decomposable at $p=(p',h(p'))$ extends holomorphically to a complex transversal wedge.

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