Richmond surface



In differential geometry, a Richmond surface is a minimal surface first described by Herbert William Richmond in 1904. It is a family of surfaces with one planar end and one Enneper surface-like self-intersecting end.

It has Weierstrass–Enneper parameterization $$f(z)=1/z^2, g(z)=z^m$$. This allows a parametrization based on a complex parameter as
 * $$\begin{align}

X(z) &= \Re[(-1/2z) - z^{2m+1}/(4m+2)]\\ Y(z) &= \Re[(-i/2z) + i z^{2m+1}/(4m+2)]\\ Z(z) &= \Re[z^m / m] \end{align} $$ The associate family of the surface is just the surface rotated around the z-axis.

Taking m = 2 a real parametric expression becomes:
 * $$\begin{align}

X(u,v) &= (1/3)u^3 - uv^2 + \frac{u}{u^2+v^2}\\ Y(u,v) &= -u^2v + (1/3)v^3 - \frac{v}{u^2+v^2}\\ Z(u,v) &= 2u \end{align} $$