Constant mean curvature surfaces in euclidean 3-space
Fournoids are four-punctured spheres with asymptotically Delaunay ends. These fournoids are constructed by lifting a trinoid-like surface on a three-punctured sphere to a multiply-punctured sphere [1,2].
Coplanar “airplane” fournoid with three different end weightsCoplanar “cross” fournoid with two different end weightsCoplanar “wheel” fournoid with equal end weightsNoncoplanar “tripod” fournoid with two different end weightsTetranoid with tetrahedral symmetry
References
N. Schmitt, Constant mean curvature n-noids with platonic symmetries, arxiv:math/0702469(2007)link.
N. Schmitt, M. Kilian, S. Kobayashi, and W. Rossman, Unitarization of monodromy representations and constant mean curvature trinoids in 3-dimensional space forms, J. Lond. Math. Soc. (2)75(2007), no. 3, 563—581 [2352721].
