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Complex and Inverse Complex Dynamics of Fractals using Ishikawa Iteration
| International Journal of Computer Applications |
| Foundation of Computer Science (FCS), NY, USA |
| Volume 40 - Number 12 |
| Year of Publication: 2012 |
| Authors: Ashish Negi, Shashank Lingwal, Yashwant Singh Chauhan |
10.5120/5013-7335
|
Ashish Negi, Shashank Lingwal, Yashwant Singh Chauhan . Complex and Inverse Complex Dynamics of Fractals using Ishikawa Iteration. International Journal of Computer Applications. 40, 12 ( February 2012), 1-9. DOI=10.5120/5013-7335
Abstract
Complex graphics of dynamical system have been a subject of intense research nowadays. The fractal geometry is the base of these beautiful graphical images. Many researchers and authors have worked to study the complex nature of the two most popular sets in fractal geometry, the Julia set and the Mandelbrot set, and proposed their work in various forms using existing tools and techniques. Still researches are being conducted to study and reveal the new concepts unexplored in the complexities of these two most popular sets of fractal geometry. Recently, Ashish Negi, Rajeshri Rana and Yashwant S. Chauhan are among those researchers who have contributed a lot in the area of Fractal Geometry applications. In this paper we review the recently done work on complex and inverse complex functions for producing beautiful fractal graphics. The reviewed work mainly emphasizes on the study of the nature of complex and inverse complex functional dynamics using Ishikawa iterates and existence of relative superior Mandel-bar set.
References
- Yashwant S Chauhan, Rajeshri Rana, and Ashish Negi, “Complex Dynamics of Ishikawa Iterates for Non Integer Values”, International Journal of Computer Applications (0975-8887) Volume 9- No.2,October 2010
- Yashwant S. Chauhan, Rajeshri Rana, Ashish Negi, “Mandel-Bar Sets of Inverse Complex Function”, International Journal of Computer Applications (0975-8887) Volume 9- No.2, November 2010
- W.D.Crowe, R.Hasson, P.J.Rippon, and P.E.D. Strain-Clark, “On the structure of the Mandel-bar set”, Nonlinearity(2)(4)(1989), 541-553. MR1020441
- Robert L. Devaney, “A First Course in Chaotic Dynamical System: Theory and Experiment”, Addison-Wesley, 1992. MR1202237
- S.Dhurandar, V.C.Bhavsar and U.G.Gujar, “Analysis of z-plane fractal images from for ” Computers and Graphics 17,1(1993), 89-94
- U.G. Gujar and V.C. Bhavsar, “Fractals from in complex c-Plane”, Computers and Graphics 15, 3 (1991), 441-449
- U.G. Gujar, V.C. Bhavsar and N. Vangala, “Fractals from in complex z-Plane”, Computers and Graphics 15, 4 (1991), 45-49
- S. Ishikawa, “Fixed Points by a new iteration method”, Proc. Amer. Math. Soc.44 (1974), 147-150
- G. Julia, “Sur 1’ iteration des functions rationnelles”, J Math Pure Appli. 8 (1918), 737-747
- Eike Lau and Dierk Schleicher, “Symmetries of fractals revisited.”, Math. Intelligencer (18)(1)(1996), 45-51.
- B. B. Mandelbrot, “The Fractal Geometry of Nature”, W. H. Freeman, New York,1983.
- J. Milnor, “Dynamics in one complex variable; Introductory lectures”, Vieweg (1999).
- Rajeshri Rana, Yashwant S. Chauhan, Ashish Negi, “Inverse Complex Function Dynamics of Ishikawa Iterates”, International Journal of Computer Applications (0975-8887) Volume 9- No.1, November 2010
- K.W. Shirriff, “An investigation of fractals generated by ”, Computers and Graphics 13, 4 (1993), 603-607
- N.Shizuo and Dierk Schleicher, “Non-local connectivity of the Tricorn and Multicorns”, Dynamical system and chaos (1) (Hachioji, 1994), 200-203, World Sci. Publ., River Edge, NJ, 1995 MR1479931
- N. Shizuo and Dierk Schleicher, “On multicorns and unicorns: I. Antiholomorphic dynamics. Hyperbolic components and real cubic polynomials”, Internat. J. Bifur. Chaos Appl. Sci. Engrg, (13)(10)(2003), 2825-2844.
- R. Winters, “Bifurcations in families of Antiholomorphic and biquadratic maps”, Thesis, Boston Univ. (1990).
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