Cantor dust

Cantor dust, named after the mathematician Georg Cantor, is the two-dimensional version of the Cantor set.

In the limit, starting from a square the construction produces a set with an infinite number of square sections each having zero area — the sum of all areas also decreases to zero in the limit.

The three-dimensional form of this is called the Menger sponge. An alternate generalization of the Cantor set produces the Sierpinski carpet.

Missing image
Cantor_dust.png
Cantor dust (2D)
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Cantors_cube.jpg
Cantor dust (3D)

See also: fractales:Polvo de Cantor

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