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I've been working on modeling an orchid using the union of three
spherical products, and making some decent progress, and if it gets good
enough, I'll post the result, but I keep getting sidetracked by other
interesting thoughts.
A rather famous multifractal Fourier series is the function W(x),
referred to variously as the Riemann multifractal function or the
Weierstrass multifractal function, defined and described here, along
with its interesting pathologies:
http://mathworld.wolfram.com/WeierstrassFunction.html
I took the first four terms, not scaled by pi (as in the above
reference) and over a full period (0 to 2pi), i.e. considered as a
classical Fourier series, and crossed W(u)W(v) with Sin(3v) -- just
because tracing one petal basically gives the shape of the R1 function
in the xz plane, while rendering the whole object gives a nice
presentation of mirror images, as it were, of the R1 function (along
with a "stem," not visible from above.)
So, for those keeping score, we have the parametric surface:
X(u, v) = W(u)*W(v)*Cos(u)*Sin(3*v)*Cos(v)
Z(u, v) = W(u)*W(v)*Sin(u)*Sin(3*v)*Cos(v)
Y(u, v) = Sin(3*v)*Sin(v)
In the first image, 0 <= u <= 2pi, and 0 <= v <= pi/3, while in the
second, 0 <= u <= 2pi, 0 <= v <= pi.
I think the first (one petal) looks like a moth (wings sloped back,
fuzzy antennae) and the second (both upper petals) is more of a butterfly.
The camera is looking down from positive y, and in the first image, the
positive z-axis is down, while in the second, the positive z-axis is to
the right.
I apologize for the gaudy coloring, but while I was working on it, one
of my colleagues wandered by and informed me that my original and (in my
opinion) tasteful color scheme was "boring," so I changed it. It also
serves to highlight the onset of the complexities. (Yes, I'm POVing at
the office, but that's what summers are for, if you're a teacher in
America.)
Dave Matthews
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