Grow an Alexander Horned Sphere

​
grow horns
max horns
4
5
6
7
8
beware: values over 5 or 6 take a lot of memory and time
zoom
coloring
solid
rose
red and black
blue and tan
performance
quality
speed
Move the slider to grow the horns on an Alexander horned sphere. Zoom in on the complicated limit point. Control the maximum number of times the horns divide. The performance slider controls how many segments make up each horn. Depending on the number of horns, selecting higher quality can result in slow performance in rendering the image.

Details

Alexander's horned sphere is a famous example, due to J. W. Alexander (1924), of a subset of space homeomorphic to a sphere whose exterior is not simply connected. In this construction the sphere is formed by recursively growing interlocking horns, each similar to the others. To get the complete sphere, the construction would have to be carried out to infinity. That is not possible, but this Demonstration can help get you started.
Note: you may rotate the 3D image as usual, but zooming can be done only by the slider. Also, panning does not work as expected, because of the way the program controls the image presented.
J. W. Alexander, "An Example of a Simply Connected Surface Bounding a Region Which Is Not Simply Connected," Proc. N. A. S., 10(1), 1924 pp. 8–10.

External Links

Alexander's Horned Sphere (Wolfram MathWorld)

Permanent Citation

Michael Rogers
​
​"Grow an Alexander Horned Sphere"​
​http://demonstrations.wolfram.com/GrowAnAlexanderHornedSphere/​
​Wolfram Demonstrations Project​
​Published: March 7, 2011