The Mandelbrot Set is typically defined as the set of all numbers for which — with , and — the limit converges. Visualizations of this standard Mandelbrot Set can be seen in three of my posts (Mandelbrot Set, Mandelbrot Set Miscalculations and Mandelbrot Set II).

However, one can extend the fractal’s definition beyond only having the exponent in the function to be with . The third post I mentioned actually has some generalization as it allows for , although the approach used cannot be extended to real or even rational numbers.

The method I used in the aforementioned post consists of manually expanding for each . The polynomial , for example, would be expanded to .

This method is not only tedious, error-prone and has to be done for every exponent (of which there are many), it also only works for whole-number exponents. To visualize real Multibrots, I had to come up with an algorithm for complex number exponentiation.

Luckily enough, there are two main ways to represent a complex number, Cartesian form and polar form . Converting from Cartesian to polar form is simply done by finding the number’s vector’s magnitude and its angle to the x-axis . *(The function is used in favor of to avoid having to divide by zero. View this Wikipedia article for more on the function and its definition.)*

Once having converted the number to polar form, exponentiation becomes easy as . With the exponentiated in polar form, it can be converted back in Cartesian form with .

Using this method, converting the complex number to perform exponentiation, I wrote a Java program which visualizes the Multibrot for a given range of exponents and a number of frames.

Additionally, I added a new strategy for coloring the Multibrot Set, which consists of choosing a few anchor colors and then linearly interpolating the red, green and blue values. The resulting images have a reproducible (in contrast to randomly choosing colors) and more interesting (in contrast to only varying brightness) look.

The family of Multibrot Sets can also be visualized as an animation, showing the fractal with an increasing exponent. The animated gif shown below was created using ImageMagick’s `convert -delay <ms> *.png multibrot.gif`

command to stitch together the various .png files the Java application creates. To speed up the rendering, a separate thread is created for each frame, often resulting in 100% CPU-usage. *(Be aware of this should you render your own Multibrot Sets!)*

To use the program on your own, either copy the source code listed below or download the .java file. The sections to change parameters or the color palette are clearly highlighted using block comments (simply search for ‘/*’).

To compile and execute the Java application, run (on Linux or MacOS) the command `javac multibrot.java; java -Xmx4096m multibrot`

in the source code’s directory (`-Xmx4096m`

tag optional, though for many frames at high quality it may be necessary as it allows Java to use more memory).

If you are a sole Windows user, I recommend installing the Windows 10 Bash Shell.

```
// Java 1.8 Code
// Jonathan Frech, 11th of September 2016
// edited 17th of April 2017
// edited 18th of April 2017
// edited 20th of April 2017
// edited 21st of April 2017
// edited 22nd of April 2017
```