Title: Some cool fluid dynamics art Post by: s31415 on September 03, 2011, 04:51:37 AM Hi,
Lately I've been featuring on my blog art using or inspired by fluid dynamics. Some of it displays fractalish patterns. Water sculptures by Shinishi Maruyama http://algorithmic-worlds.net/blog/blog.php?Post=20110812 http://algorithmic-worlds.net/blog/blog.php?Post=20110818 Great Raleigh-Taylor instability videos by Mark Stock. Beautiful fractal patterns there. http://algorithmic-worlds.net/blog/blog.php?Post=20110819 Two videos by Kim Pimmel http://algorithmic-worlds.net/blog/blog.php?Post=20110830 Best, Sam Title: Re: Some cool fluid dynamics art Post by: Vega on September 03, 2011, 03:01:00 PM Great Raleigh-Taylor instability videos by Mark Stock. Beautiful fractal patterns there. http://algorithmic-worlds.net/blog/blog.php?Post=20110819 Have you a video of real experiment of mixing of two liquids? How much the theoretical video is similar to a real picture? Title: Re: Some cool fluid dynamics art Post by: s31415 on September 03, 2011, 04:09:53 PM After some search I found only one:
http://video.google.com/videoplay?docid=-7589272349639644594 But it seems clear that in this case, surface tension effects are predominant, what prevents the formation of small scale structures. The simulations didn't take surface effects into account. Still, provided you find a fluid that satisfies the hypotheses used in the simulation (in particular negligible surface tension and viscosity, I would guess), you will get something very close to the simulation. After all, the theory of fluid dynamics is an extremely good approximation to real fluids in many situations. The picture of the Crab nebula shows that the Raleigh-Taylor instability can indeed create fractalish structures in physical situations. Title: Re: Some cool fluid dynamics art Post by: jehovajah on November 12, 2011, 09:28:16 AM Great video. Surface or boundary tensions are fractal regional effects also. The regional effects caused by the boundaries are fractal in a more general sense, although box counting could be done. I am more liberal about the term fractal than some and so i express my opinion . I think magnification of the boundaries would reveal how fractal they are, and that they are wada regions. Boundaries actually determine the internal nature of the regions they bound, by means of a dynamic equilibrium. It is fascinating to watch different dynamic equilibriums pass though each other without mixing. The rate of pass through is too fast for osmosis to have any appreciable effect. But as soon as the boundary equilibrium matches that of another the boundary vanishes. Surface tension then is a boundary effect due to different dynamics, and a boundary forms precisely because of the different spatial dynamics. Why can't i walk through a wall? That seems to be down to viscosity in the main. More revealing though is if i could find a space with the same dynamic equilibrium in its boundary i would simply merge with it! That is spooky! |