I would also mention that English is not my first language. So, I would appreciate comments on how to better this text from that point of view. Thanks.
I made the Barnley imaginaire formula with the purpose of seeing what would happen if in the Barnsley 1 and 3 formulas, the real part of Z was changed for its imaginary conterpart. I kept both a Mandelbrot & Julia version, so the switch mode can still be used.
Here are the specific parameters of the formula:
Barnsley Type | This is the choice between the two original Barnsley formulas. |
Choices | First (default), Third |
Comments | The First option corresponds to the Barnsley 1 and the Third to the Barnsley 3. |
Barnsley Offset | This parameter lets you change the 0 of the result of calculation for another value. |
Choices | You may use any number. Default is 0 for backward compatibility with previous version. |
Comments | Instead of having the result of calculation being >= 0 (zero or positive) or < 0 (negative), you can change it to >= Offset or < Offset. |
Seed | This is just a set of two numbers you may use to modify the formula in the Julia version. The meaning is purely mathematical. |
Choices | You may use any number. |
Comments | This number can be determined by using instead the Mandelbrot version and the switch mode. |
Starting Point | This is just a set of two numbers you may use to start the calculation in the Mandelbrot version. The meaning is purely mathematical. |
Choices | You may use any number. |
The other parameters are part of the Epsilon Range Parameter Toolbox and the Bailout Parameters Toolbox.