Seashell surface explained

In mathematics, a seashell surface is a surface made by a circle which spirals up the z-axis while decreasing its own radius and distance from the z-axis. Not all seashell surfaces describe actual seashells found in nature.

Parametrization

The following is a parameterization of one seashell surface:

\begin{align} x&{}=

5\left(1-
4
v
2\pi

\right)\cos(2v)(1+\cosu)+\cos2v\\\ y&{}=

5\left(1-
4
v
2\pi

\right)\sin(2v)(1+\cosu)+\sin2v\\\ z&{}=

10v+
2\pi
5\left(1-
4
v
2\pi

\right)\sin(u)+15 \end{align}

where

0\leu<2\pi

and

-2\pi\lev<2\pi

\\

Various authors have suggested different models for the shape of shell. David M. Raup proposed a model where there is one magnification for the x-y plane, and another for the x-z plane. Chris Illert[1] proposed a model where the magnification is scalar, and the same for any sense or direction with an equation like

\vec{F}\left({\theta,\varphi}\right)=e\alpha\left({\begin{array}{*{20}c} {\cos\left(\varphi\right),}&{-\sin(\varphi),}&{\rm{0}}\\ {\sin(\varphi),}&{\cos\left(\varphi\right),}&0\\ {0,}&{{\rm{0,}}}&1\\ \end{array}}\right)\vec{F}\left({\theta,0}\right)

which starts with an initial generating curve

\vec{F}\left({\theta,0}\right)

and applies a rotation and exponential magnification.

See also

References

Notes and References

  1. Dr Chris Illert was awarded his Ph.D. on 26 September 2013 at the University of Western Sydney http://www.uws.edu.au/__data/assets/image/0004/547060/2013_ICS_Graduates.jpg.