GNU XaoS - GNU XaoS. XaoS is an interactive fractal zoomer. It allows the user to continuously zoom in or out of a fractal in a fluid, continuous motion. This capability makes XaoS great for exploring fractals, and it’s fun! If you don’t know what fractals are, don’t worry. XaoS includes many animated tutorials that make learning about fractals fun and easy. These tutorials are also a great introduction to all of XaoS’s features. XaoS can display many different fractal types, including Mandelbrot , Barnsley , Newton , Phoenix, and many more. XaoS currently runs on Windows, Mac OS X, Linux, and other Unix-like systems.
XaoS is free software, licensed under the GPL . This web site is maintained by the DokuWiki system. Ultra Fractal: Advanced Fractal Software for Windows and Mac OS X. Software. « hd fractals. Ensemble de Mandelbrot. Un article de Wikipédia, l'encyclopédie libre.
L'ensemble de Mandelbrot (en noir) Zoom sur une partie de l'ensemble. On remarque l'autosimilarité des structures. est bornée. Historique[modifier | modifier le code] L'ensemble de Mandelbrot tire ses origines de la dynamique complexe, un domaine défriché par les mathématiciens français Pierre Fatou et Gaston Julia au début du XXe siècle. La première représentation de cet ensemble apparaît en 1978 dans un article de Robert Brooks (en) et Peter Matelski[2].
Le 1er mars 1980, au centre Thomas J. En 1984, l'étude de l'ensemble de Mandelbrot commence réellement avec les travaux d'Adrien Douady et de John H. En 1985, les mathématiciens Heinz-Otto Peitgen (en) et Peter Richter popularisent l'ensemble de Mandelbrot par des images de qualité et qui frappent les esprits[6],[7],[8].
Propriétés[modifier | modifier le code] Définition[modifier | modifier le code] Barrière du module égal à 2[modifier | modifier le code] Géométrie élémentaire. The Encyclopedia of the Mandelbrot Set at MROB. A second-order embedded Julia set This is a picture from the Mandelbrot Set, one of the most well-known fractal images in the world. (Click it for a larger version). The Mandelbrot Set is one of my hobbies, and I have collected a large amount of information about it. To organize that information I have created Mu-Ency, a large collection of text files linked to each other. Here are some entries from Mu-Ency: Mandelbrot Set: The mathematical definition.
History: How the Mandelbrot Set was discovered, how it became popular, etc. Exploring: The many things you can expect to find when you explore on your own. Area: I have been involved in finding the area of the Mandelbrot Set. Algorithms: How to compute the Mandelbrot Set and how to draw it. R2 Naming System: I have also developed a rather precise (and complex) naming system for features of the Mandelbrot Set. You can also look up specific terms in the index . Coordinates of the image above: Width (and height): 0.000 000 000 000 000 160.
Hd fractals. The Deepest Mandelbrot Fractal Zoom Ever Done- Bigger Than Any Universe That'll Ever Exist. The Deepest Mandelbrot Fractal Zoom Ever Done- Bigger Than Any Universe That'll Ever Exist The boys of Team Fresh have done it and now its new MandelbrotFractal-zoom posted on the web!
Do you remember to this zoom with the e ^ Several million was 214 times larger than the known universe? Forget that! The new Zoom dares you to an enlargement of the Mandelbrot fractal to a factor of e ^ 228! This is beyond imagination and just looking beautiful!