Iteration of functions and fractal patterns - PowerPoint PPT Presentation

1 / 16

About This Presentation

Title:

Iteration of functions and fractal patterns

Description:

Number of Views:133

Avg rating:3.0/5.0

Slides: 17

Provided by: atelierinf

Category:

Tags: affine | fractal | functions | iteration | patterns

Transcript and Presenter's Notes

Title: Iteration of functions and fractal patterns

1
Iteration of functions and fractal patterns

Edith Perrier, IRD France,
Visiting scientist at UCT,
Applied Maths Dept., room 417.1, Ext. 3205,
E-mail edith_at_maths.uct.ac.za
Web site where to download previous lectures
lect.ppt (or lect.zip if links included)
http//www.mth.uct.ac.za/Affiliations/BioMaths/Ind
ex.html

2
A well known fractal pattern ! The middle third
Cantor Set
3
Iterated functions

A mapping fIR-gtIR, IR2-gtIR2,C-gtC, E-gtE
Iterates of order k
Example f IR-gtIR
Let us look for the iterates of f and for the
largest bounded invariant set under f
f(Cantor Set)Cantor Set

4
The logistic map

Fatou (1906) for parameters values less than -2
or more than 4, Fatou dusts similar to Cantor
dusts
Population dynamics
Discrete form
Iteration of f(x)2x(1-x) starting with x0.1
0.1 0.18 0.2952 0.41611392 0.4859262512
0.4996038592 0.4999996862 0.5000000000
For large values one can
show (Falconer p.174) that the invariant set is
fractal with a Hausdorff dimension

5
Bifurcations diagram of the logistic map
6
The squaring generators

f IR-gtR
Equivalence with the logistic map with
appropriate coordinates change and
f C-gtC
For a complex number c, the filled-in Julia set
of c is the set of all z for which the iteration
of f(z )does not diverge to infinity. The Julia
set is the boundary of the filled-in Julia set.
For almost all c, these sets are fractals.
Julia sets are usually fractal sets
When IcI is large
When IcI is small

7
Iterations of z-gtz2

8
Exercice

9
Solution

10
Mandelbrot set and Julia sets
F C-gtC Mandelbrot set
11
IFS (Iterated Function Systems)

Definition An iterated function system is a
finite set
of affine transformations of IR2
Each affine transformation w (in two dimensions)
is a function that performs some combination of
scaling, rotation, and translation on points in a
plane and takes the general form
w (x,y) (ax by e , cx dy f )
Its determined by six real numbers
The notion of IFS applies to higher-dimensional
spaces . See p.80. .M. F. Barnsley. Fractals
everywhere. Academic Press, Boston, 2nd edition,
1993.

12
Examples

Von Koch
Sierpinski carpet
From Larry Riddle, Department of Mathematics,
Agnes Scott College http//ecademy.agnesscott.edu/
lriddle/ifs/

14
Examples

------------ Parameter a b c d e f p ----
Fern
0.0 0.0 0.0 0.16 0.0 0.0 0.10
0.2 -0.26 0.23 0.22 0.0 1.6 0.08
-0.15 0.28 0.26 0.24 0.0 0.44 0.08
0.75 0.04 -0.04 0.85 0.0 1.6 0.74
Grass
0.0 0.0 0.0 0.5 0.0 0.0 0.15
0.02 -0.28 0.15 0.2 0.0 1.5 0.10
0.02 0.28 0.15 0.2 0.0 1.5 0.10
0.75 0.0 0.0 0.5 0.0 4.6 0.65
--------------------------------------------------
----
The 7th paramater is the probability p which
assigns the frequency with which the
transformation is used.
http//life.csu.edu.au/complex/tutorials/tutorial3
.html

15
Lecture series

Lecture 1. March. 3rd. Introduction to fractal
geometry . Measures and power laws.
Lecture 2. March 5th. Definitions of non-integer
dimensions and mathematical formalisms
Lecture 3. March 10th. Iteration of functions and
fractal patterns
Lecture 4. March 12th. Extensions Self-similar
and self-affine sets . Multifractals.
Lecture 5. March 17th. Fractals / Geostatistics
/ Time series analysis
Lecture 6. March 19th. Dynamical processes
Fractal and random walks
Lecture 7. March 24th. Dynamical processes
Fractal and Percolation
Lecture 8. March 26th. Dynamical processes
Fractal and Chaos