when he gave a seminar talk at the Bu Mathematics and Statistics Department. At the same time I was trying to find a way to produce animation in R. I came across this great post which was relevant for both purposes.
Using the code
### Reproduced from http://tolstoy.newcastle.edu.au/R/help/05/10/13198.html
### Written by Jarek Tuszynski, PhD.
library(fields) # for tim.colors
library(caTools) # for write.gif
m = 400 # grid size
C = complex( real=rep(seq(-1.8,0.6, length.out=m), each=m ),
imag=rep(seq(-1.2,1.2, length.out=m), m ) )
C = matrix(C,m,m)
Z = 0
X = array(0, c(m,m,20))
for (k in 1:20) {
Z = Z^2+C
X[,,k] = exp(-abs(Z))
}
image(X[,,k], col=tim.colors(256)) # show final image in
write.gif(X, "Mandelbrot.gif", col=tim.colors(256), delay=100)
we get the following animation
3 comments:
Looks great. Could you explain the algorithm , what it does in the M-set interior ?
Adam
fraktal.republika.pl
A blog about the Mandelbrot set accompanying an ebook designed for school-level readers - it'll take you from basic arithmetic, through the idea of iteration, give a very gentle introduction to complex numbers, and hold your hand through coding your own Mandelbrot and Julia sets.
http://makeyourownmandelbrot.blogspot.co.uk/
Comments welcome on both the blog and the ebook (published soon) - the aim is to maximise understanding and I believe anyone with school maths can do it.
Sorry to post here but I hope people will find it through your excellent post about the Mset.
The easy to understand guide to making your own Mandelebrot (using Python) is out:
http://www.amazon.co.uk/dp/B00JFIEC2A/
https://play.google.com/store/books/details?id=OVBTAwAAQBAJ
As ever, feedbac via google+ or
http://makeyourownmandelbrot.blogspot.co.uk/ is welcome!
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