Mandelbrot Set
The set obtained by the Quadratic Recurrence
 | (1) |
for which the orbit 
does not tend to infinity are in the Set. It marks the set of points in theComplex Plane such that the corresponding Julia Set is Connected and notComputable. The Mandelbrot set was originally called a Mu Molecule byMandelbrot.J. Hubbard and A. Douady proved that the Mandelbrot set is Connected. Shishikura (1994) provedthat the boundary of the Mandelbrot set is a Fractal with Hausdorff Dimension 2. However, it is not yet known ifthe Mandelbrot set is pathwise-connected. If it is pathwise-connected, then Hubbard and Douady's proof implies that theMandelbrot set is the image of a Circle and can be constructed from a Disk by collapsing certain arcs in theinterior (Douady 1986).
The Area of the set is known to lie between 1.5031 and 1.5702; it is estimated as 1.50659....
Decomposing the Complex coordinate 
and 
gives
 |  |  | (2) |
 | |  | (3) |
In practice, the limit is approximated by
 | (4) |
. A common choice is to define an Integer called the Count to be the largest 
such that
, where 
is usually taken as 
, and to color points of different Count different colors. The boundarybetween successive Counts defines a series of ``Lemniscates,''called Equipotential Curves by Peitgen and Saupe (1988), 
which have distinctiveshapes. The first few Lemniscates are  | |  | (5) |
 | |  | (6) |
 | |  | (7) |
 | |  | (8) |
When written in Cartesian Coordinates, the first three of these are
 | |  | (9) |
| |  | (10) |
| |  | |
 |  | (11) |
which are a Circle, an Oval, and a Pear Curve. In fact, the second Lemniscate
can be written in terms of a new coordinate system with 
as | (12) |
and 
. The Lemniscates grow increasingly convoluted with higher Count and approach the Mandelbrot set as theCount tends to infinity.
The kidney bean-shaped portion of the Mandelbrot set is bordered by a Cardioid with equations
 | (13) |
 | (14) |
and Radius 
. One region of theMandelbrot set containing spiral shapes is known as Sea Horse Valley because the shape resembles the tailof a sea horse.Generalizations of the Mandelbrot set can be constructed by replacing 
with 
or 
, where
is a Positive Integer and 
denotes the Complex Conjugate of 
. The following figures show the Fractals obtained for 
, 3, and 4 (Dickau). The plots on the right have replaced with and are sometimes called ``Mandelbar Sets.''
 |  |
 |  |
 |  |
References
Alfeld, P. ``The Mandelbrot Set.'' http://www.math.utah.edu/~alfeld/math/mandelbrot/mandelbrot1.html. Branner, B. ``The Mandelbrot Set.'' In Chaos and Fractals: The Mathematics Behind the Computer Graphics, Proc. Sympos. Appl. Math., Vol. 39 (Ed. R. L. Devaney and L. Keen). Providence, RI: Amer. Math. Soc., 75-105, 1989. Dickau, R. M. ``Mandelbrot (and Similar) Sets.''http://forum.swarthmore.edu/advanced/robertd/mandelbrot.html. Douady, A. ``Julia Sets and the Mandelbrot Set.'' In The Beauty of Fractals: Images of Complex Dynamical Systems (Ed. H.-O. Peitgen and D. H. Richter). Berlin: Springer-Verlag, p. 161, 1986. Eppstein, D. ``Area of the Mandelbrot Set.''http://www.ics.uci.edu/~eppstein/junkyard/mand-area.html. Fisher, Y. and Hill, J. ``Bounding the Area of the Mandelbrot Set.'' Submitted. Hill, J. R. ``Fractals and the Grand Internet Parallel Processing Project.'' Ch. 15 in Fractal Horizons: The Future Use of Fractals. New York: St. Martin's Press, pp. 299-323, 1996. Lauwerier, H. Fractals: Endlessly Repeated Geometric Figures. Princeton, NJ: Princeton University Press, pp. 148-151 and 179-180, 1991. Munafo, R. ``Mu-Ency--The Encyclopedia of the Mandelbrot Set.'' http://home.earthlink.net/~mrob/muency.html. Peitgen, H.-O. and Saupe, D. (Eds.). The Science of Fractal Images. New York: Springer-Verlag, pp. 178-179, 1988. Shishikura, M. ``The Boundary of the Mandelbrot Set has Hausdorff Dimension Two.'' Astérisque, No. 222, 7, 389-405, 1994.
- Finite Game
- Finite Group
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- Finite Group D4
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- Finite Group Z2Z2
- Finite Group Z2Z2Z2
- Finite Group Z2Z4
- Finite Group Z3
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