The Generalized Mandelbrot–Julia Set Form a Class of Complex Cosine Map

Poonam Negi; Yashwant S. Chauhan; Priti Dimri

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Reseach Article

The Generalized Mandelbrot–Julia Set Form a Class of Complex Cosine Map

by Poonam Negi, Yashwant S. Chauhan, Priti Dimri

International Journal of Computer Applications

Foundation of Computer Science (FCS), NY, USA

Volume 96 - Number 15

Year of Publication: 2014

Authors: Poonam Negi, Yashwant S. Chauhan, Priti Dimri

10.5120/16867-6761

Poonam Negi, Yashwant S. Chauhan, Priti Dimri . The Generalized Mandelbrot–Julia Set Form a Class of Complex Cosine Map. International Journal of Computer Applications. 96, 15 ( June 2014), 1-8. DOI=10.5120/16867-6761

@article{ 10.5120/16867-6761,

author = { Poonam Negi, Yashwant S. Chauhan, Priti Dimri },

title = { The Generalized Mandelbrot–Julia Set Form a Class of Complex Cosine Map },

journal = { International Journal of Computer Applications },

issue_date = { June 2014 },

volume = { 96 },

number = { 15 },

month = { June },

year = { 2014 },

issn = { 0975-8887 },

pages = { 1-8 },

numpages = {9},

url = { https://ijcaonline.org/archives/volume96/number15/16867-6761/ },

doi = { 10.5120/16867-6761 },

publisher = {Foundation of Computer Science (FCS), NY, USA},

address = {New York, USA}

}

%0 Journal Article

%1 2024-02-06T22:22:21.073668+05:30

%A Poonam Negi

%A Yashwant S. Chauhan

%A Priti Dimri

%T The Generalized Mandelbrot–Julia Set Form a Class of Complex Cosine Map

%J International Journal of Computer Applications

%@ 0975-8887

%V 96

%N 15

%P 1-8

%D 2014

%I Foundation of Computer Science (FCS), NY, USA

Abstract

The dynamics of transcendental function is one of emerging and interesting field of research nowadays. In this paper we have constructed a series of generalized Mandelbrot and Julia set from cosine function using Agarwal iteration.

References

Agarwal, R. P. , O'Regan, D. and Sahu, D. R. : Iterative construction of fixed points of nearly symptotically nonexpansive mappings, Journal of Nonlinear and Convex Analysis 8(1) (2007), 61-79.
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U. G. Gujar, V. C. Bhavsar and N. Vangala, "Fractals from in the Complex z-Plane", Computers and Graphics 16, 1 (1992), 45-49.
Kumar, Manish. and Rani, Mamta. , A new approach to superior Julia sets. J. nature. Phys. Sci, pp. 148-155, 2005.
Mandelbrot B. B. , "The Fractal Geometry of Nature, W. H. Freeman", New York. ISBN 0-7167-1186-9.
Peitgen, H. O. , Jurgens, H. and Saupe, D. , Chaos and Fractals. New frontiers of science, 1992.
Peitgen, H. O. , Jurgens, H. and Saupe, D. , Chaos and Fractals: New Frontiers of Science. Springer-Verlag, New York, Inc, 2004.
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Index Terms

Computer Science

Information Sciences

Keywords

Agarwal Iteration Complex Dynamics Fixed Point Julia set Mandelbrot Set.