Runge tubes in Stein manifolds with the density property
Abstract: In this paper we give a very simple proof of the existence and plenitude of Runge tubes in $\mathbb Cn$ $(n>1)$ and, more generally, in Stein manifolds with the density property. We show in particular that for any algebraic submanifold $A$ of codimension at least two in a complex Euclidean space $\mathbb Cn$, the normal bundle of $A$ in $\mathbb Cn$ admits a holomorphic embedding onto a Runge domain in $\mathbb Cn$ which agrees with the inclusion map $A\hookrightarrow \mathbb Cn$ on the zero section.
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