Next Article in Journal
Robust Global Trends during Pandemics: Analysing the Interplay of Biological and Social Processes
Next Article in Special Issue
Exploring Transition from Stability to Chaos through Random Matrices
Previous Article in Journal
Thermal Hydraulics Simulation of a Water Spray System for a Cooling Fluid Catalytic Cracking (FCC) Regenerator
 
 
Search for Articles:
Title / Keyword
Author / Affiliation / Email
Journal
Article Type
 
 
Advanced Search
 
Section
Special Issue
Volume
Issue
Number
Page
 
Journals
Dynamics
Volume 3
Issue 4
10.3390/dynamics3040040
dynamics-logo
Submit to this Journal Review for this Journal Propose a Special Issue
Article Menu

Article Menu

share Share announcement Help format_quote Cite question_answer Discuss in SciProfiles
first_page
settings
Order Article Reprints
Font Type:
Arial Georgia Verdana
Font Size:
Aa Aa Aa
Line Spacing:
Column Width:
Background:
Article

Unveiling Dynamical Symmetries in 2D Chaotic Iterative Maps with Ordinal-Patterns-Based Complexity Quantifiers

by
Benjamin S. Novak
1 and
Andrés Aragoneses
1,2,*
1
Department of Physics, Eastern Washington University, Cheney, WA 99004, USA
2
Department of Physics, Whitman College, Walla Walla, WA 99362, USA
*
Author to whom correspondence should be addressed.
Dynamics 2023, 3(4), 750-763; https://doi.org/10.3390/dynamics3040040
Submission received: 14 October 2023 / Revised: 6 November 2023 / Accepted: 6 November 2023 / Published: 9 November 2023
(This article belongs to the Special Issue Chaotic Dynamics in Discrete Time Systems)
Browse Figures
Versions Notes

Abstract

Effectively identifying and characterizing the various dynamics present in complex and chaotic systems is fundamental for chaos control, chaos classification, and behavior-transition forecasting, among others. It is a complicated task that becomes increasingly difficult as systems involve more dimensions and parameters. Here, we extend methods inspired in ordinal patterns to analyze 2D iterative maps to unveil underlying approximate symmetries of their dynamics. We distinguish different families of chaos within the systems, find similarities among chaotic maps, identify approximate temporal and dynamical symmetries, and anticipate sharp transitions in dynamics. We show how this methodology displays the evolution of the spatial correlations in a dynamical system as the control parameter varies. We prove the power of these techniques, which involve simple quantifiers as well as combinations of them, in extracting relevant information from the complex dynamics of 2D systems, where other techniques are less informative or more computationally demanding.
Keywords: complexity; complexity quantifiers; chaos; iterative maps; Hénon map; permutation entropy; Fisher information measure; route to chaos; TARDYS complexity; complexity quantifiers; chaos; iterative maps; Hénon map; permutation entropy; Fisher information measure; route to chaos; TARDYS

Share and Cite

MDPI and ACS Style

Novak, B.S.; Aragoneses, A. Unveiling Dynamical Symmetries in 2D Chaotic Iterative Maps with Ordinal-Patterns-Based Complexity Quantifiers. Dynamics 2023, 3, 750-763. https://doi.org/10.3390/dynamics3040040

AMA Style

Novak BS, Aragoneses A. Unveiling Dynamical Symmetries in 2D Chaotic Iterative Maps with Ordinal-Patterns-Based Complexity Quantifiers. Dynamics. 2023; 3(4):750-763. https://doi.org/10.3390/dynamics3040040

Chicago/Turabian Style

Novak, Benjamin S., and Andrés Aragoneses. 2023. "Unveiling Dynamical Symmetries in 2D Chaotic Iterative Maps with Ordinal-Patterns-Based Complexity Quantifiers" Dynamics 3, no. 4: 750-763. https://doi.org/10.3390/dynamics3040040

APA Style

Novak, B. S., & Aragoneses, A. (2023). Unveiling Dynamical Symmetries in 2D Chaotic Iterative Maps with Ordinal-Patterns-Based Complexity Quantifiers. Dynamics, 3(4), 750-763. https://doi.org/10.3390/dynamics3040040

Article Metrics

Back to TopTop