论文信息 - An Algorithm for Discrete Constant Mean Curvature Surfaces

An Algorithm for Discrete Constant Mean Curvature Surfaces

We present a new algorithm for computing discrete constant mean curvature surfaces in ℝ3. It is based on the definition of a discrete version of the conjugate surface construction for cmc surfaces. Here we solve a Plateau problem for a discrete minimal surface in S3 by computing a sequence of discrete harmonic maps F i : S3 → S3. The definition of a discrete conjugation allows to transform this sequence to a sequence of conjugate discrete maps which converges to a discrete cmc surface in ℝ3. The algorithm is applicable to free boundary value problems for cmc surfaces and led to the recent discovery of new compact cmc surfaces.

Konrad Polthier | Bernd Oberknapp

[1] John M. Sullivan,et al. Using Symmetry Features of the Surface Evolver to Study Foams , 1997, VisMath.

[2] Konrad Polthier,et al. Constant Mean Curvature Surfaces Derived from Delaunay's and Wente's Examples , 1997, VisMath.

[3] Konrad Polthier,et al. Compact Constant Mean Curvature Surfaces with Low Genus , 1997, Exp. Math..

[4] H. Lawson,et al. Complete Minimal Surfaces in S 3 , 1970 .

[5] Kenneth A. Brakke,et al. The Surface Evolver , 1992, Exp. Math..

[6] Ulrich Pinkall,et al. Computing Discrete Minimal Surfaces and Their Conjugates , 1993, Exp. Math..

[7] H. Karcher. The triply periodic minimal surfaces of Alan Schoen and their constant mean curvature companions , 1989 .

[8] Karsten Große-Brauckmann,et al. New surfaces of constant mean curvature , 1993 .

[9] G. Dziuk,et al. An algorithm for evolutionary surfaces , 1990 .