Menger-Diaz fractals in video

Submitted by admin on Dom, 06/25/2023 - 11:16

Menger–Diaz fractals
Combining Menger's algorithm with Diaz's algorithms (initial atom, cube of existence, sizes of the cubes) we can get an infinite number of variants of the Menger-Diaz fractal.
The concept and many more examples can be seen here: https://easychair.org/publications/author/NqSp

Presented in the SCULPT2023 in july-7 in Genoa. SCULPT papers will be published in a special issue of the Hyperseeing magazine. Now in

 

https://people.tamu.edu/~ergun/hyperseeing/2023.html

https://smiconf.github.io/2023/sculpt.html In the end of the page is the program.
The videos are of a Menger sponge but with Stella Octangula (changing the atom).  The following example is a Menger-Diaz with few places polyhedron that we change from cube to rhombic dodecahedron. Of a Menger-Díaz changing the cube of existence and the size. And the last one is a simple Sierpinski tetrahedron which is also a Menger-Diaz fractal (exchange cube for octahedron, cube of existence of size 2, many more examples in the articles).

This artworks be in the SCULPT2023 Show & Tell Virtual Exhibition Event

To watch the recording, please follow this link:
https://bournemouth.cloud.panopto.eu/Panopto/Pages/Viewer.aspx?id=ad7e303b-1b8e-4bae-9ea9-b038015ac013

In Minute 1:48:12 (Menger-Diaz en SCULPT2023)

And in minute 3:22:23 the videos

Also in Youtube Our previous Show&Tell meetings, held via Zoom in March and July 2023, were well-received, and the recordings are available on our YouTube Channel.

Menger sponge but with Stella Octangula (changing the atom)

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Complement with "cube" of rhombic dodecahedron

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Menger-Díaz changing the cube of existence and the size.

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Sierpinski tetrahedron which is also a Menger-Diaz fractal (exchange cube for octahedron, cube of existence of size 2)

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Several examples of a Sierpinski Tetrahedron, level 6, with some caotics movements:

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