- Fractal lake
In
geometry , and less formally, in mostFractal art software,Fact|date=June 2008 the fractal lake of an 'orbits' (or "escape-time")fractal , is the part of thecomplex plane for which the orbit (a sequence ofcomplex number s) that is generated by iterating a given function does not "escape" from theunit circle .Fact|date=June 2008 The lake may be connected or disjoint, and it may also have zeroarea .Orbits that are initialized inside the lake are either eventually captured by zero, captured by another point inside the unit circle, or may oscillate through a set of
finite values indefinitely without ever converging to a fixed point. These points are described as being "Inside" the lake. Inside points are often detected for the purposes of using a different coloring method, in fractal rendering software [ [http://spanky.triumf.ca/WWW/fractint/color_params.html Inside/Outside coloring in Fractint] ]By this definition, the points of the
Mandelbrot set form a "fractal lake", which is why the Mandelbrot set is also sometimes known as the "Mandelbrot Lake" [ [http://hpux.cs.utah.edu/hppd/cgi-bin/wwwtar?/hpux/X11/Misc/xmfract-1.4/xmfract-1.4-hppa-10.10.depot.gz+xmfract/xmfract-RUN/opt/xmfract/bin/help/help.164+text WWWTar Query ] ] , or the "lake of the Mandelbrot Fractal".Many complex valued functions with an
attractor at the origin define a fractal when this aspect of their orbits' behavior is categorized. Some of the orbits are attracted to the origin; some are periodic; some are attracted to other attractors, including possibly an attractor at infinity.For a given function there is a Julia fractal for each point on the complex plane. The Julia sets that correspond to points inside the Mandelbrot set are connected; those that correspond to points outside of the Mandelbrot set are disconnected.
ee also
*
Mandelbrot set
*Julia set
*Nova fractal
*Filled Julia set
*Connectedness locus
*Lakes of Wada Notes
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