Bochner's tube theorem

In mathematics, Bochner's tube theorem (named for Salomon Bochner) shows that every function holomorphic on a tube domain in $$\mathbb{C}^n$$ can be extended to the convex hull of this domain.

Theorem Let $$\omega \subset \mathbb{R}^n$$ be a connected open set. Then every function $$f(z)$$ holomorphic on the tube domain $$ \Omega = \omega+i \mathbb{R}^n$$ can be extended to a function holomorphic on the convex hull $$\operatorname{ch}(\Omega)$$.

A classic reference is (Theorem 9). See also for other proofs.

Generalizations
The generalized version of this theorem was first proved by Kazlow (1979), also proved by Boivin and Dwilewicz (1998) under more less complicated hypothese.

Theorem Let $$\omega$$ be a connected submanifold of $$\mathbb{R}^n$$ of class-$$C^2$$. Then every continuous CR function on the tube domain $$\Omega(\omega)$$ can be continuously extended to a CR function on $$\Omega(\text{ach}(\omega)).\ \left(\Omega(\omega) = \omega+i \mathbb{R}^n\subset\mathbb{C}^n\ \left(n\geq 2\right), \text{ach}(\omega):=\omega\cup \text{Int}\ \text{ch}(\omega)\right)$$. By "Int ch(S)" we will mean the interior taken in the smallest dimensional space which contains "ch(S)".