$Variants of Julia and Mandelbrot sets as fractals via Jungck-Ishikawa fixed point iteration system with s-convexity$

Variants of Julia and Mandelbrot sets as fractals via Jungck-Ishikawa fixed point iteration system with s-convexity

In this paper, we generate some non-classical variants of Julia and Mandelbrot sets, utilizing the Jungck-Ishikawa fixed point iteration system equipped with $ s $-convexity. We establish a novel escape criterion for complex polynomials of a higher degree of the form $ z^n + az^2 -bz + c $, where $...

Full description

Bibliographic Details
Main Authors:	Swati Antal, Anita Tomar, Darshana J. Prajapati, Mohammad Sajid
Format:	Article
Language:	English
Published:	AIMS Press 2022-04-01
Series:	AIMS Mathematics
Subjects:	escape criterion fixed point jungck-ishikawa orbit s-convexity
Online Access:	http://www.aimspress.com/article/doi/10.3934/math.2022611?viewType=HTML

Similar Items

Fractals as Julia Sets of Complex Sine Function via Fixed Point Iterations
by: Swati Antal, et al.
Published: (2021-12-01)

Fractals as Julia and Mandelbrot Sets of Complex Cosine Functions via Fixed Point Iterations
by: Anita Tomar, et al.
Published: (2023-02-01)

Fixed Point Results for Fractal Generation in Extended Jungck–SP Orbit
by: Xiangyang Li, et al.
Published: (2019-01-01)

Fixed point results of an implicit iterative scheme for fractal generations
by: Haixia Zhang, et al.
Published: (2021-09-01)

Boundaries of Filled Julia Sets in Generalized Jungck Mann Orbit
by: Dong Li, et al.
Published: (2019-01-01)

Mandelbrot and Julia Sets of Transcendental Functions Using Picard–Thakur Iteration
by: Ashish Bhoria, et al.
Published: (2023-10-01)

Fractal Generation via CR Iteration Scheme With S-Convexity
by: Young Chel Kwun, et al.
Published: (2019-01-01)

The equivalence between the (S,T)− stabilities of Jungck-type iterative schemes
by: Hudson Akewe, et al.
Published: (2021-03-01)

CR Iteration in Generation of Antifractals With s-Convexity
by: Dong Li, et al.
Published: (2020-01-01)

Stability, Data Dependence, and Convergence Results with Computational Engendering of Fractals via Jungck–DK Iterative Scheme
by: Liliana Guran, et al.
Published: (2023-05-01)

The Mann-Ishikawa iterations and the Mann-Ishikawa iterations with errors are equivalent models dealing with a non-Lipschitzian map
by: B. E. Rhoades, et al.
Published: (2005-08-01)

The Mann-Ishikawa iterations and the Mann-Ishikawa iterations with errors are equivalent models dealing with a non-Lipschitzian map
by: B. E. Rhoades, et al.
Published: (2005-08-01)

Mandelbrot Sets and Julia Sets in Picard-Mann Orbit
by: Cui Zou, et al.
Published: (2020-01-01)

Mandelbrot and Julia Sets via Jungck–CR Iteration With <inline-formula> <tex-math notation="LaTeX">$s$ </tex-math></inline-formula>–Convexity
by: Young Chel Kwun, et al.
Published: (2019-01-01)

Fuzzy Fixed Point Theorem for Some Types of Fuzzy Jungck Contractive Mappings In Hilbert Space
by: Buthainah A.A. Ahmed, et al.
Published: (2018-04-01)

Convergence theorems of modified Ishikawa iterations in Banach spaces
by: Shengquan Weng
Published: (2019-11-01)

Jungck theorem for triangular maps and related results
by: M. Grinc, et al.
Published: (2000-10-01)

The equivalence between the T-stabilities of modified Mann-Ishikawa and Mann-Ishikawa iterations
by: Ştefan M. Şoltuz
Published: (2006-08-01)

The equivalence between the T-stabilities of modified Mann-Ishikawa and Mann-Ishikawa iterations
by: Ştefan M. Şoltuz
Published: (2006-08-01)

On Jungck–Branciari–Wardowski Type Fixed Point Results
by: Biljana Carić, et al.
Published: (2021-01-01)

Fractal Generation in Modified Jungck–S Orbit
by: Young Chel Kwun, et al.
Published: (2019-01-01)

Convergence and Stability of the Ishikawa Iterative Process for a class of ϕ-quasinonexpansive Mappings
by: F. D. Ajibade, et al.
Published: (2022-08-01)

Remarks about a paper dealing with the equivalence of Mann and Ishikawa iterations
by: Ştefan M Şoltuz
Published: (2004-08-01)

Remarks about a paper dealing with the equivalence of Mann and Ishikawa iterations
by: Ştefan M Şoltuz
Published: (2004-08-01)

Picard-Jungck Operator for a Pair of Mappings and Simulation Type Functions
by: Sumit Chandok, et al.
Published: (2019-05-01)

Classical results via Mann-Ishikawa iteration
by: Ştefan M. Şoltuz, et al.
Published: (2007-08-01)

Classical results via Mann-Ishikawa iteration
by: Ştefan M. Şoltuz, et al.
Published: (2007-08-01)

The equivalence between the Krasnoselskij, Mann and Ishikawa iterations
by: B. E. Rhoades, et al.
Published: (2006-08-01)

The equivalence between T-stabilities of Krasnoselskij and Ishikawa iterations
by: Ştefan M. Şoltuz
Published: (2008-02-01)

The equivalence between the Krasnoselskij, Mann and Ishikawa iterations
by: B. E. Rhoades, et al.
Published: (2006-08-01)

The equivalence between T-stabilities of Krasnoselskij and Ishikawa iterations
by: Ştefan M. Şoltuz
Published: (2008-02-01)

Tricorns and Multicorns in Noor Orbit With s-Convexity
by: Young Chel Kwun, et al.
Published: (2019-01-01)

Anti Mandelbrot Sets via Jungck-M Iteration
by: Hengxiao Qi, et al.
Published: (2020-01-01)

On the Stability and Acceleration of Projection Algorithms
by: Zena H. Maibed, et al.
Published: (2023-01-01)

New technique for proving the equivalence of Mann and Ishikawa iterations
by: Ştefan M. Şoltuz
Published: (2005-02-01)

New technique for proving the equivalence of Mann and Ishikawa iterations
by: Ştefan M. Şoltuz
Published: (2005-02-01)

Multicorn Sets of <inline-formula><math display="inline"><semantics><mrow><msup><mrow><mover accent="true"><mi>z</mi><mo>¯</mo></mover></mrow><mi>k</mi></msup><mo>+</mo><msup><mi>c</mi><mi>m</mi></msup></mrow></semantics></math></inline-formula> via S-Iteration with <i>h</i>-Convexity
by: Asifa Tassaddiq, et al.
Published: (2023-06-01)

On the error estimation and T-stability of the Ishikawa iteration for strongly demicontractive mappings
by: Chao Wang, et al.
Published: (2019-03-01)

Strong and weak convergence of Ishikawa iterations for best proximity pairs
by: Gabeleh Moosa, et al.
Published: (2020-02-01)

Remarks about an inequality used for the equivalence between the convergence of Ishikawa and Mann iterations
by: Ştefan M. Şoltuz
Published: (2007-08-01)