Podrobno

Let $\pi \colon Z \to X$ be a holomorphic submersion of a complex manifold $Z$ onto a complex manifold $X$ and $D \Subset X$ a 1-convex domain with strongly pseudoconvex boundary. We prove that under certain conditions there always exists a spray of $\pi$-sections over $\bar{D}$ which has prescribed core, fixes the exceptional set $E$ of $D$, and is dominating on $\bar{D} \setminus E$. Each section in this spray is of class ${\mathcal C}^k(\bar{D})$ and holomorphic on $D$. As a consequence we obtain several approximation results for $\pi$-sections. In particular, we prove that $\pi$-sections which are of class ${\mathcal C}^k(\bar{D})$ and holomorphic on $D$ can be approximated in the ${\mathcal C}^k(\bar{D})$ topology by $\pi$-sections that are holomorphic in open neighborhoods of $\bar{D}$. Under additional assumptions on the submersion we also get approximation by global holomorphic $\pi$-sections and the Oka principle over 1-convex manifolds. We include a result on the existance of proper holomorphic maps from 1-convex domains into $q$-convex manifolds.