Accurate computation of periodic regions' centers in the general \(M\)-set with integer index number
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Publication:1958779
DOI10.1155/2010/653816zbMath1196.28020OpenAlexW1996022279WikidataQ58650858 ScholiaQ58650858MaRDI QIDQ1958779
He Yijie, Sun Yuanyuan, Xing-Yuan Wang
Publication date: 29 September 2010
Published in: Discrete Dynamics in Nature and Society (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/224593
Related Items (3)
Application of Fixed Point Iterative Methods to Construct Fractals and Anti-fractals ⋮ Calculation of the structure of a shrub in the Mandelbrot set ⋮ Julia sets and Mandelbrot sets in Noor orbit
Cites Work
- Unnamed Item
- An approach to the ordering of one-dimensional quadratic maps.
- Equivalence between subshrubs and chaotic bands in the Mandelbrot set
- Accurate computation of component centers in the degree-\(n\) bifurcation set
- Determination of Mandelbrot set's hyperbolic component centres
- Research on fractal structure of generalized M--J sets utilized Lyapunov exponents and periodic scanning techniques
- ANALYSIS OF C-PLANE FRACTAL IMAGES FROM z ← zα + c FOR (α < 0)
- Mixing Markov Chains and Their Images
- RESEARCH ON BROWNIAN MOVEMENT BASED ON GENERALIZED MANDELBROT–JULIA SETS FROM A CLASS COMPLEX MAPPING SYSTEM
- Predicting continuum breakdown in hypersonic viscous flows
- On the dynamics of polynomial-like mappings
- GENERALIZED MANDELBROT SETS FOR MEROMORPHIC COMPLEX AND QUATERNIONIC MAPS
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