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Penrose tiling as 3D fractal.

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	Penrose tiling as 3D fractal. by Robert Walker-7 :: Rate this Message: Reply to Author \| View Threaded \| Show Only this Message Hi there, While answering the last e-mail, I looked up L-System fractals in wikipedia, and I just came across this picture of a Penrose tiling as an L-System: http://en.wikipedia.org/wiki/Image:Pend05c.gif It's the same idea as my 3D fractal Penrose. If you did it like that and just superimposed a few more layers, in the same way - and if you were to draw the smallest tiles in a very light pen and use darker pens as the tiles got larger, then zoomed out until the smallest tiles of all merged to become continuous or nearly so the result would be a 2D fractal. To get a more continuous appearance, shade each of the larger tiles so that it is black at its boundary and shades to white at the centre, and as before use lighter pens for the smaller tiles - and superimpose by subtraction from white so that dark grey + light grey gives very dark grey - e.g. 90% intensity + 80 % intensity superimposes as 60% intensity (subtract 10% then 20%). The result would be a continuous 2D fractal. You could then take that into 3D by using the intensity as the 3D height. So that would be a way to make the Penrose tiling into a 3D fractal landscape. You could superimpose the coloured tiles over the landscape and you'd notice that the same type of feature in the landscape has the same pattern of tiles wrapping over it, so bringing out the larger and larger scale structures in the Penrose tilings more clearly than in the usual 2D representation. It might be a fun thing to do. I've got a Penrose tiling generating program which I wrote which I'm sure could be modified to do this and may give it a go some day when I have a bit of time. Robert [Non-text portions of this message have been removed]
	Re: Penrose tiling as 3D fractal. by Gunnar-7 :: Rate this Message: Reply to Author \| View Threaded \| Show Only this Message There's a program that I first started using back in 1991, Fractint <http://www.fractint.org/ftp/release.20.0/dos/frain200.zip> , that has a section on L-Systems, and I recall several different Penrose variations in the list of stored L-System parameters. It's a DOS program, but you can run it at the command prompt (Start>Run> Cmd). The program also generates Mandelbrot & similar fractals, and the Lorenz, Gingerbread & other dot cluster types. There's an option for generating sounds while the image is calculated. --- In cnfractal_music@..., "Robert Walker" <yahoogroups@...> wrote: > > Hi there, > > While answering the last e-mail, I looked up L-System fractals > in wikipedia, and I just came across this picture of a Penrose tiling as an L-System: > http://en.wikipedia.org/wiki/Image:Pend05c.gif > > It's the same idea as my 3D fractal Penrose. If you did it like that > and just superimposed a few more layers, in the same way > - and if you were to draw the smallest tiles in a very light pen > and use darker pens as the tiles got larger, then zoomed out > until the smallest tiles of all merged to become continuous or > nearly so the result would be a 2D fractal. > > To get a more continuous appearance, shade each of the larger > tiles so that it is black at its boundary and shades to white at the > centre, and as before use lighter pens for the smaller tiles > - and superimpose by subtraction from white so that dark grey > + light grey gives very dark grey - e.g. 90% intensity + 80 % > intensity superimposes as 60% intensity (subtract 10% then 20%). > > The result would be a continuous 2D fractal. You could then take that > into 3D by using the intensity as the 3D height. > > So that would be a way to make the Penrose tiling into a 3D > fractal landscape. You could superimpose the coloured tiles > over the landscape and you'd notice that the same type of > feature in the landscape has the same pattern of tiles > wrapping over it, so bringing out the larger and larger > scale structures in the Penrose tilings more clearly than in the > usual 2D representation. It might be a fun thing to do. I've got > a Penrose tiling generating program which I wrote which I'm sure > could be modified to do this and may give it a go some day > when I have a bit of time. > > Robert > > [Non-text portions of this message have been removed] > [Non-text portions of this message have been removed]
	Looking for a few good beta testors by Dave Strohbeen :: Rate this Message: Reply to Author \| View Threaded \| Show Only this Message I'm getting to the final beta testing stages for ArtSong 7 and would appreciate a few more testers. If you're interested please contact me at strohbeen@... thanks Dave Strohbeen [Non-text portions of this message have been removed]