Difference between revisions of "Cantor dust"
From Wiki @ Karl Jones dot com
Karl Jones (Talk | contribs) (→See also) |
Karl Jones (Talk | contribs) (→See also) |
||
| Line 21: | Line 21: | ||
* [[Cantor set]] | * [[Cantor set]] | ||
* [[Cantor space]] | * [[Cantor space]] | ||
| + | * [[Chaos theory]] | ||
* [[Menger sponge]] | * [[Menger sponge]] | ||
* [[Sierpinski carpet]] | * [[Sierpinski carpet]] | ||
| + | * [[Strange attractor]] | ||
* [[Zero measure]] | * [[Zero measure]] | ||
Revision as of 06:59, 6 September 2015
Cantor dust is a multi-dimensional version of the Cantor set.
Description
It can be formed by taking a finite Cartesian product of the Cantor set with itself, making it a Cantor space.
Like the Cantor set, Cantor dust has zero measure.
Sierpinski carpet and Menger sponge
A different 2D analogue of the Cantor set is the Sierpinski carpet, where a square is divided up into nine smaller squares, and the middle one removed.
The remaining squares are then further divided into nine each and the middle removed, and so on ad infinitum.
The 3D analogue of this is the Menger sponge.
See also
- Cantor, Georg
- Cartesian product
- Cantor set
- Cantor space
- Chaos theory
- Menger sponge
- Sierpinski carpet
- Strange attractor
- Zero measure
External links
- Cantor dust @ Wikipedia
