Fractal Structures of General Mandelbrot Sets and Julia Sets Generated from Complex Non-Analytic Iteration Fm(z)=z¯m+c

De Jun Yan; Xiao Dan Wei; Hong Peng Zhang; Nan Jiang; Xiang Dong Liu

doi:10.4028/www.scientific.net/AMM.347-350.3019

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HomeApplied Mechanics and MaterialsApplied Mechanics and Materials Vols. 347-350Fractal Structures of General Mandelbrot Sets and...

Fractal Structures of General Mandelbrot Sets and Julia Sets Generated from Complex Non-Analytic Iteration F_m(z)=z¯^m+c

Abstract:

In this paper we use the same idea as the complex analytic dynamics to study general Mandelbrot sets and Julia sets generated from the complex non-analytic iteration . The definition of the general critical point is given, which is of vital importance to the complex non-analytic dynamics. The general Mandelbrot set is proved to be bounded, axial symmetry by real axis, and have (m+1)-fold rotational symmetry. The stability condition of periodic orbits and the boundary curve of stability region of one-cycle are given. And the general Mandelbrot sets are constructed by the escape-time method and the periodic scanning algorithm, which present a better understanding of the structure of the Mandelbrot sets. The filled-in Julia sets Km,c have m-fold structures. Similar to the complex analytic dynamics, the general Mandelbrot sets are kinds of mathematical dictionary or atlas that map out the behavior of the filled-in Julia sets for different values of c.

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Periodical:

Applied Mechanics and Materials (Volumes 347-350)

Pages:

3019-3023

DOI:

https://doi.org/10.4028/www.scientific.net/AMM.347-350.3019

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Online since:

August 2013

Authors:

De Jun Yan, Xiao Dan Wei, Hong Peng Zhang, Nan Jiang, Xiang Dong Liu

Keywords:

Complex Non-Analytic Iteration, Critical Point, General Mandelbrot Set, Julia Set

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