Title 
Summary 
Primary Author 
Date 

BoxCounting of a Ddimensional array (with D=1,2,3). 
Frederic Moisy 
20061123 

Simulates an twodimensional asymmetric random walk and plots it.

M2TUM 
20041215 

This code generates a 3D surface that appears like a bowl. 
Mithun Aiyswaryan 
20030903 

Simulates electrochemical aggregation using Brownian motion. 
M2TUM 
20041215 

Draws the nth iteration of the Cantor set. 
M2TUM 
20041126 

Illustrates the Cantor set and the Devil's stairs fractals. 
Dagmar Scherzinger 
20021217 

Draws the nth iteration of the curve called Cantor's devil's stairs. 
M2TUM 
20041126 

Simulates a cellular automat with some given rules. 
M2TUM 
20050307 

Simulates the game of chaos by Michael Barnsley. 
M2TUM 
20041124 

Draws the nth partial sum of a series of functions such that the limit is a function that is continuous everywhere but never differentiable. 
M2TUM 
20041201 

Shows the rate of convergence for each starting point (x,y) using Newton iteration for the equation x^p + i = 0. 
M2TUM 
20041130 

This code generates the 3D surface interpretation of the Fractal density 
Mithun Aiyswaryan 
20030903 

Simulates the movement of multiple particles in a fixed frame. These particles hit the wall or each other and hence change their impulse.

M2TUM 
20041215 

Creates a drumlike sound from an input wavfile. 
M2TUM 
20050228 

Creates different echo sounds from an input wavfile by a nonrecursive or a recursive definition. 
M2TUM 
20050228 

Grafica Epicicloide e Hipocicloide 
Miguel Ataurima 
20050606 

Composes a piece of music with four different 'voices' which must be put in by four wavfiles. 
M2TUM 
20050228 

This source code generates a Fractal cone. 
Mithun Aiyswaryan 
20030809 

Calculates the dimension of a fractal curve or set in 2D using the box counting method. 
M2TUM 
20041208 

Draws the cut through a fractal landscape (randomized or deterministic version). 
M2TUM 
20050117 

Draws a fractal landscape (i.e. a recursively computed mountain) in 3D consisting of squares. 
M2TUM 
20050118 

Draws a fractal landscape (i.e. a recursively computed mountain) in 3D consisting of triangles. 
M2TUM 
20050118 

Draws the nth iteration of Hilbert's spacefilling curve. 
M2TUM 
20041126 

Constructs a fractal picture by the principle of a IFS (iterated function system).

M2TUM 
20050202 

Draws the Julia set. 
M2TUM 
20041130 

Creates colorful plots of the Julia set of a complex function. 
Andreas Klimke 
20030504 

Draws the Koch curve fractal. 
Dagmar Scherzinger 
20021217 

Simulates the Lsystem or stringrewritingsystem in 2 dimensions.

M2TUM 
20050202 

Simulates the Lsystem or stringrewritingsystem in 3 dimensions.

M2TUM 
20050202 

Successively computes the values of the linear iterator f(x) = ax. 
M2TUM 
20050301 

GUI to animate the solution of the "Lorenz Model". 
M2TUM 
20040423 

Draws the Mandelbrot set. 
M2TUM 
20041126 

Graphical user interface to explore the Mandelbrot set. 
Andreas Klimke 
20030504 

Draws the nth iteration of the Menger cube (or Menger sponge) 
M2TUM 
20041126 

Constructs a fractal picture by the principle of a MRCM (multiple reduction copy machine). The algorithm stops after each iteration.

M2TUM 
20050201 

Creates multiple bars of music with three different 'voices' which must be put in by three wavfiles. 
M2TUM 
20050228 

Shows the set of starting points (x,y) for each zero of the equations x^p + i = 0 (p=3, 5, 7) using Newton iteration. 
M2TUM 
20041130 

Draws Pascal's triangle with coloured hexagons. The colour of the hexagon with number n is determined by the parameter s (whether s divides n or not). 
M2TUM 
20041126 

Draws the nth iteration of the Peano curve. 
M2TUM 
20041129 

Draws a triangle of small objects which are black with probability z and white with probability 1z.

M2TUM 
20041214 

Constructs the nth iteration of the fractal Pythagoraeic tree consisting of squares and triangles. 
M2TUM 
20050617 

Successively computes the values of the quadratic iterator f(x) = ax(1x) 
M2TUM 
20050301 

Draws the Koch curve at level n  randomised or normal. 
M2TUM 
20041214 

Draws the Sierpinski triangle at level n into the unit square, but randomly permutes the four quarters of the square at each iteration. 
M2TUM 
20041214 

Draws the Sierpinski triangle at level n with a randomised shape of the smaller triangles. 
M2TUM 
20041214 

This code plots a 3Dimensional roof. 
Mithun Aiyswaryan 
20030903 

Simulates the sound of the waves at a beach, given an input wavfile with the sound of plain water. 
M2TUM 
20050228 

Successively computes the values of an iterator on the sawtooth function. 
M2TUM 
20050301 

Draws the nth iteration of the Sierpinski carpet. 
M2TUM 
20041126 

Plots the Sierpinski gasket. 
Dagmar Scherzinger 
20021217 

Creates the Sierpinski triangle based on Pascal's triangle. 
M2TUM 
20041124 

GUI calculator with the basic functions. 
Mohammad alshikh khalil 
20060830 

Simulates the development of a stock price at the financial market. 
M2TUM 
20041215 

Simulates a onedimensional symmetric random walk (equal probability of going left or right) and plots it.

M2TUM 
20041215 

Simulates a twodimensional symmetric random walk (equal probability of going up, down, left or right) and plots it. 
M2TUM 
20041215 

Successively computes the values of an iterator on the tent function. 
M2TUM 
20050302 

The enclosed source code generates the classical Mandelbrot sets and plots them as a 3D surfact. 
Mithun Aiyswaryan 
20030809 

Simulates a forest of trees. Some trees are burning at the beginning and the trees next to it catch fire; the simulation lasts until there is no fire left. 
M2TUM 
20041215 