Symmetry and Stability Analysis in Nonlinear Dynamics and Chaos Theory for Complex Systems
A special issue of Symmetry (ISSN 2073-8994). This special issue belongs to the section "Mathematics".
Deadline for manuscript submissions: closed (28 February 2024) | Viewed by 737
Special Issue Editors
2. Basic Science Department, Faculty of Computers and Information, Suez Canal University, New Campus, Ismailia 41522, Egypt
Interests: dynamical systems; chaotic dynamics; bifurcation analysis; fractional calculus; mathematical modeling
Interests: bifurcation analysis; oscillation of differential equations; dynamical systems; mathematical modelling
Interests: epidemiological and within-host models; dynamical systems; fractional order models
Special Issues, Collections and Topics in MDPI journals
Special Issue Information
Dear Colleagues,
Many researchers have recently become interested in the development of appropriate mathematical tools for studying the qualitative properties of complex systems. This evolution has accelerated the study of complex dynamics of real-world models, as well as their symmetry, stability, bifurcation, chaos, and chaos control. The bifurcation scenario is intriguing because every change in the state involves either breaking symmetry or increasing the complexity of the dynamics. Furthermore, recent advancements in the phenomenon of bifurcation, as well as numerical bifurcation computer packages for analyzing real-world models described as integer-order and fractional-order systems, provide a wide range of extremely important tools for investigating these real complex systems.
The aim of this Special Issue is to encourage the publication of original research papers in a wide variety of fields on topics including the following:
- Bifurcation and stability analysis of real complex systems.
- Analysis of fractional-order systems models in biological, economic, and engineering systems.
- Symmetry-breaking bifurcation for dynamic models.
- Fractional-order systems and time delay systems in machine learning schemes and paradigms.
- Analysis of functional differential equation models in models in biology, epidemics, and engineering systems
Prof. Dr. Abdelalim Elsadany
Prof. Dr. Elmetwally M. E. Elabbasy
Prof. Dr. Carla M. A. Pinto
Guest Editors
Manuscript Submission Information
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