Counting Minimal Surfaces in Quasi-Fuchsian three-Manifolds
classification
🧮 math.DG
math.GT
keywords
minimalleastquasi-fuchsiancurvejordanmanifoldsurfacesurfaces
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It is well known that every quasi-Fuchsian manifold admits at least one closed incompressible minimal surface, and at most finitely many of them. In this paper, for any prescribed integer $N>0$, we construct a quasi-Fuchsian manifold which contains at least $2^N$ such minimal surfaces. As a consequence, there exists some simple close Jordan curve on $S^2_\infty$ such that there are at least $2^N$ disk-type complete minimal surface in $\mathbb{H}^3$ sharing this Jordan curve as the asymptotic boundary.
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