Sierpinski Carpet
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High Quality Content by WIKIPEDIA articles! The Sierpinski carpet is a plane fractal first described by Wac aw Sierpi ski in 1916. The carpet is a generalization of the Cantor set to two dimensions (another is Cantor dust). Sierpi ski demonstrated that this fractal is a universal curve, in that any possible one-dimensional graph, projected onto the two-dimensional plane, is homeomorphic to a subset of the Sierpinski carpet. For curves that cannot be drawn on a 2D surface without self-intersections, the corresponding universal curve is the Menger sponge, a higher-dimensional generalization. The...
High Quality Content by WIKIPEDIA articles! The Sierpinski carpet is a plane fractal first described by Wac aw Sierpi ski in 1916. The carpet is a generalization of the Cantor set to two dimensions (another is Cantor dust). Sierpi ski demonstrated that this fractal is a universal curve, in that any possible one-dimensional graph, projected onto the two-dimensional plane, is homeomorphic to a subset of the Sierpinski carpet. For curves that cannot be drawn on a 2D surface without self-intersections, the corresponding universal curve is the Menger sponge, a higher-dimensional generalization. The technique can be applied to repetitive tiling arrangement; triangle, square, hexagon being the simplest. It would seem impossible to apply it to other than rep-tile arrangements.
