Burning Ship fractal

The Burning Ship fractal, first described and created by Michael Michelitsch and Otto E. Rössler in 1992, is generated by iterating the function:

$z_{n%2B1} = (|\operatorname{Re} \left(z_n\right)|%2Bi|\operatorname{Im} \left(z_n\right)|)^2 %2B c, \quad z_0=0$

in the complex plane $\mathbb{C}$ which will either escape or remain bounded. The difference between this calculation and that for the Mandelbrot set is that the real and imaginary components are set to their respective absolute values before squaring at each iteration. The mapping is non-analytic because its real and imaginary parts do not obey the Cauchy–Riemann equations.^[1]

References

^ Michael Michelitsch and Otto E. Rössler (1992). "The "Burning Ship" and Its Quasi-Julia Sets". In: Computers & Graphics Vol. 16, No. 4, pp. 435–438, 1992. Reprinted in Clifford A. Pickover Ed. (1998). Chaos and Fractals: A Computer Graphical Journey — A 10 Year Compilation of Advanced Research. Amsterdam, Netherlands: Elsevier. ISBN 0-444-50002-2

External links

About properties and symmetries of the Burning Ship fractal, featured by Theory.org,
Burning Ship Fractal, Description generated by a C source code.
Burning Ship with its Mset of higher powers and Julia Sets
Burningship, Video,
Fractal webpage includes the first representations and the original paper cited above on the Burning Ship fractal.
3D representations of the Burning Ship fractal

Burning Ship fractal

See also

References

External links