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2. Mandelbrot set - Wikipedia

   en.wikipedia.org/wiki/Mandelbrot_set

   A mosaic made by matching Julia sets to their values of c on the complex plane. The Mandelbrot set is a map of connected Julia sets. As a consequence of the definition of the Mandelbrot set, there is a close correspondence between the geometry of the Mandelbrot set at a given point and the structure of the corresponding Julia set. For instance ...

3. File:Julia Mandelbrot relationship map 300 (90,000 sets).png

   en.wikipedia.org/wiki/File:Julia_Mandelbrot...

   English: Collection of Julia sets laid out in a grid such that the centre of each image corresponds to the same position in the complex plane as the value of the set. When laid out like this the overall image resembles the Mandelbrot set. Here there are 300 sets in each direction for a total of 90,000 mini Julia sets. The dimensions are:

4. Misiurewicz point - Wikipedia

   en.wikipedia.org/wiki/Misiurewicz_point

   A preperiodic orbit. In mathematics, a Misiurewicz point is a parameter value in the Mandelbrot set (the parameter space of complex quadratic maps) and also in real quadratic maps of the interval [1] for which the critical point is strictly pre-periodic (i.e., it becomes periodic after finitely many iterations but is not periodic itself).

5. Connectedness locus - Wikipedia

   en.wikipedia.org/wiki/Connectedness_locus

   (where ) are often called 'Multibrot sets'. For these families, the bifurcation locus is the boundary of the connectedness locus. This is no longer true in settings, such as the full parameter space of cubic polynomials, where there is more than one free critical point. For these families, even maps with disconnected Julia sets may display ...

6. Plotting algorithms for the Mandelbrot set - Wikipedia

   en.wikipedia.org/wiki/Plotting_algorithms_for...

   Every pixel that contains a point of the Mandelbrot set is colored black. Every pixel that is colored black is close to the Mandelbrot set. Exterior distance estimate may be used to color whole complement of Mandelbrot set. The upper bound b for the distance estimate of a pixel c (a complex number) from the Mandelbrot set is given by [6] [7] [8]

7. File:Mandelbrot Components.svg - Wikipedia

   en.wikipedia.org/wiki/File:Mandelbrot_Components.svg

   The Douady-Hubbard-Sullivan theorem (DHS) states that the multiplier map of an attracting periodic orbit is a conformal isomorphism from a hyperbolic component of the Mandelbrot set onto the unit disk and it extends homeomorpically to the boundaries. [2]

8. Douady rabbit - Wikipedia

   en.wikipedia.org/wiki/Douady_rabbit

   Noting that is invariant under the substitution , the Mandelbrot set with respect to has additional horizontal symmetry. Since and are affine transformations of one another, or more specifically a similarity transformation, consisting of only scaling, rotation and translation, the filled Julia sets look similar for either form of the iteration given above.

9. File:Mandelbrot set, plotted with Matplotlib.svg - Wikipedia

   en.wikipedia.org/wiki/File:Mandelbrot_set...

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