Mathematics – Differential Geometry
Scientific paper
2005-05-24
Mathematics
Differential Geometry
21 pages, 5 figures
Scientific paper
Let $D$ be a regular strictly convex bounded domain of $\r^3$, and consider a regular Jordan curve $\Gamma \subset \partial D$. Then, for each $\epsilon>0$, we obtain the existence of a complete proper minimal immersion $\psi_\epsilon :\d \to D$ satisfying that the Hausdorff distance $\delta^H(\psi_\epsilon(\partial \d), \Gamma) < \epsilon,$ where $\psi_\epsilon(\partial \d)$ represents the limit set of the minimal disk $\psi_\epsilon(\d).$ This result has some interesting consequences. Among other things, we can prove that any bounded regular domain $R$ in $\r^3$ admits a complete proper minimal immersion $\psi: \d \longrightarrow R$.
Martin Francisco
Morales Santiago
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