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| [WSS25] What shapes can organisms have? Studying biological evolution in the Wolfram evolution model Great work Julia! Seeing these evolutions to different shapes with different colors is fascinating! |
| Really good work Jesse, those fitness landscapes are fascinating! Excited to follow your work in the future. |
| Fascinating work Lorenzo! Love the section on value propagation. |
| ![Towards a theory for the speed of biological evolution][1] &[Wolfram Notebook][2] [1]: https://community.wolfram.com//c/portal/getImageAttachment?filename=Main13112024.png&userId=20103 [2]:... |
| ![enter image description here][1] &[Wolfram Notebook][2] [1]: https://community.wolfram.com//c/portal/getImageAttachment?filename=1235Hero.gif&userId=20103 [2]: https://www.wolframcloud.com/obj/f42bae7a-6be1-4209-b430-a59644b5ebda |
| ![enter image description here][1] &[Wolfram Notebook][2] [1]: https://community.wolfram.com//c/portal/getImageAttachment?filename=Willemimage.gif&userId=20103 [2]: https://www.wolframcloud.com/obj/2dea1554-0613-4976-8033-78bcfea4d3cc |
| I know I'm only 7 years late, but I was curious the fractal dimension of different Persian carpets, so I used your tool on them. Here's some of the best results I got: ![1st Rug][1] ![2nd Rug][2] ![3rd Rug][3] This is amazing that it... |
| Here is a quiz Mandelbrot gives. Of the difference graphs below, one is Brownian motion, one fractional Brownian motion, one a Levy process, two are real financial data, and three are multifractal forgeries. Can you tell which is which? ![Pick the... |