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Reseach Article

Superior Multibrots for Multicorns for Fractional Values

by Sunil Shukla, Ashish Negi, Sumiti Kapoor
International Journal of Computer Applications
Foundation of Computer Science (FCS), NY, USA
Volume 65 - Number 5
Year of Publication: 2013
Authors: Sunil Shukla, Ashish Negi, Sumiti Kapoor
10.5120/10917-5850

Sunil Shukla, Ashish Negi, Sumiti Kapoor . Superior Multibrots for Multicorns for Fractional Values. International Journal of Computer Applications. 65, 5 ( March 2013), 1-6. DOI=10.5120/10917-5850

@article{ 10.5120/10917-5850,
author = { Sunil Shukla, Ashish Negi, Sumiti Kapoor },
title = { Superior Multibrots for Multicorns for Fractional Values },
journal = { International Journal of Computer Applications },
issue_date = { March 2013 },
volume = { 65 },
number = { 5 },
month = { March },
year = { 2013 },
issn = { 0975-8887 },
pages = { 1-6 },
numpages = {9},
url = { https://ijcaonline.org/archives/volume65/number5/10917-5850/ },
doi = { 10.5120/10917-5850 },
publisher = {Foundation of Computer Science (FCS), NY, USA},
address = {New York, USA}
}
%0 Journal Article
%1 2024-02-06T21:18:27.307771+05:30
%A Sunil Shukla
%A Ashish Negi
%A Sumiti Kapoor
%T Superior Multibrots for Multicorns for Fractional Values
%J International Journal of Computer Applications
%@ 0975-8887
%V 65
%N 5
%P 1-6
%D 2013
%I Foundation of Computer Science (FCS), NY, USA
Abstract

The Multibrots for Multicorns is defined by the complex function where and is a constant. The Multibrot for Multicorns fractal is interesting, with striking shapes. In this paper we have presented different characteristics of Multibrot function for Multicorns using superior iterates, like fixed point, complex dynamics and its behaviour towards Julia set.

References
  1. Barcellos, A. and Barnsley, Michael F. , Reviews: Fractals Everywhere. Amer. Math. Monthly , No. 3, pp. 266-268, 1990.
  2. Barnsley, Michael F. , Fractals Everywhere. Academic Press, INC, New York, 1993.
  3. Edgar, Gerald A. , Classics on Fractals. Westview Press, 2004.
  4. Falconer, K. , Techniques in fractal geometry. John Wiley & Sons, England, 1997.
  5. Julia, G. , Sur 1' iteration des functions rationnelles. J Math Pure Appl. pp. 47-245.
  6. Kumar, Manish. and Rani, Mamta. , A new approach to superior Julia sets. J. nature. Phys. Sci, pp. 148-155, 2005.
  7. Negi, A. , Fractal Generation and Applications, Ph. D Thesis, Department of Mathematics, Gurukula Kangri Vishwavidyalaya, Hardwar, 2006.
  8. Orsucci, Franco F. and Sala, N. , Chaos and Complexity Research Compendium. Nova Science Publishers, Inc. , New York, 2011.
  9. Peitgen, H. O. , Jurgens, H. and Saupe, D. , Chaos and Fractals. New frontiers of science, 1992.
  10. Peitgen, H. O. , Jurgens, H. and Saupe, D. , Chaos and Fractals: New Frontiers of Science. Springer-Verlag, New York, Inc, 2004.
  11. Rani, M. , Iterative Procedures in Fractal and Chaos. Ph. D Thesis, Department of Computer Science. Gurukula Kangri Vishwavidyalaya, Hardwar, 2002.
Index Terms

Computer Science
Information Sciences

Keywords

Superior Multibrot Tricon and Multicorns