k-noid

In differential geometry, a k-noid is a minimal surface with k catenoid openings. In particular, the 3-noid is often called trinoid. The first k-noid minimal surfaces were described by Jorge and Meeks in 1983.^[1]

The term k-noid and trinoid is also sometimes used for constant mean curvature surfaces, especially branched versions of the unduloid ("triunduloids").^[2]

k-noids are topologically equivalent to k-punctured spheres (spheres with k points removed). k-noids with symmetric openings can be generated using the Weierstrass–Enneper parameterization ${\displaystyle f(z)=1/(z^k-1{)}^2,g(z)=z^{k-1}}$.^[3] This produces the explicit formula

${\displaystyle \begin{array}{cc}X(z)=\frac{1}{2}\mathrm{\Re }\left\{\right(\frac{-1}{kz(z^k-1)}\left)\right[& (k-1)(z^k-1{)}_2{F}_1(1,-1/k;(k-1)/k;z^k)\\ & -(k-1)z^2(z^k-1{)}_2{F}_1(1,1/k;1+1/k;z^k)\\ & -k{z}^k+k+z^2-1\left]\right\}\end{array}}$

${\displaystyle \begin{array}{cc}Y(z)=\frac{1}{2}\mathrm{\Re }\left\{\right(\frac{i}{kz(z^k-1)}\left)\right[& (k-1)(z^k-1{)}_2{F}_1(1,-1/k;(k-1)/k;z^k)\\ & +(k-1)z^2(z^k-1{)}_2{F}_1(1,1/k;1+1/k;z^k)\\ & -k{z}^k+k-z^2-1)]\}\end{array}}$

${\displaystyle Z(z)=\mathrm{\Re }\left\{\frac{1}{k-k{z}^k}\right\}}$

where ${}_2{F}_1(a,b;c;z)$ is the Gaussian hypergeometric function and ${\displaystyle \mathrm{\Re }\{z\}}$ denotes the real part of ${\displaystyle z}$.

It is also possible to create k-noids with openings in different directions and sizes,^[4] k-noids corresponding to the platonic solids and k-noids with handles.^[5]

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