1. Constant mean curvature surfaces in hyperbolic 3-space via loop groups
- Author
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Josef Dorfmeister, Jun-ichi Inoguchi, Shimpei Kobayashi, and Technische Universität München, Faculty of Mathematics
- Subjects
Mathematics - Differential Geometry ,Surface (mathematics) ,Pure mathematics ,Minimal surface ,Mean curvature ,Euclidean space ,Applied Mathematics ,General Mathematics ,Type (model theory) ,Space (mathematics) ,ddc ,Loop (topology) ,Differential Geometry (math.DG) ,FOS: Mathematics ,Constant (mathematics) ,Mathematics - Abstract
In hyperbolic 3-space $\mathbb{H}^3$ surfaces of constant mean curvature $H$ come in three types, corresponding to the cases $0 \leq H < 1$, $H = 1$, $H > 1$. Via the Lawson correspondence the latter two cases correspond to constant mean curvature surfaces in Euclidean 3-space $\mathbb{E}^3$ with H=0 and $H \neq 0$, respectively. These surface classes have been investigated intensively in the literature. For the case $0 \leq H < 1$ there is no Lawson correspondence in Euclidean space and there are relatively few publications. Examples have been difficult to construct. In this paper we present a generalized Weierstra{\ss} type representation for surfaces of constant mean curvature in $\mathbb{H}^3$ with particular emphasis on the case of mean curvature $0\leq H < 1$. In particular, the generalized Weierstra{\ss} type representation presented in this paper enables us to construct simultaneously minimal surfaces (H=0) and non-minimal constant mean curvature surfaces ($0, Comment: 37 pages, 4 figures. v3: Various typos fixed. v4: Proposition D.1 has been fixed
- Published
- 2014