Mathematical Modeling and Simulation of Oscillatory Phenomena, 2nd Edition
A special issue of Mathematics (ISSN 2227-7390). This special issue belongs to the section "Dynamical Systems".
Deadline for manuscript submissions: 28 February 2025 | Viewed by 884
Special Issue Editors
Interests: difference and differential equations; partial differential equations; dynamic equation; time scales; control theory; biology applications
Special Issues, Collections and Topics in MDPI journals
Interests: qualitative theory; ordinary differential equations; functional differential equations; dynamical systems; mathematical modeling in physical/social/life sciences
Special Issues, Collections and Topics in MDPI journals
Special Issue Information
Dear Colleagues,
The second volume of our publication continues to delve into the fascinating realm of oscillatory phenomena across the various dynamical systems encountered within the fields of natural sciences and technology. Similarly to the first volume, oscillations remain a ubiquitous feature across diverse disciplines, including physiology, ecosystem dynamics, biochemistry, mechanics, and population dynamics. The prevalence of oscillations underscores the need for a robust theoretical framework, which continues to evolve under the banner of oscillation theory.
This Special Issue is dedicated to the modeling and simulation of nonlinear dynamical systems, where oscillation serves as a fundamental behavior. We invite contributions from researchers who are engaged in oscillation theory or those applying existing tools and methods to investigating oscillatory phenomena within real-world dynamical systems. Of particular interest are studies addressing time-delay systems, where the delay is recognized as a significant contributor to the oscillations in dynamical systems.
We eagerly anticipate submissions furthering our understanding of oscillatory properties and their relationship with various physical processes. Join us in exploring the intricate dynamics of oscillatory systems and their applications across diverse scientific disciplines. We eagerly await your contributions.
Prof. Dr. Tongxing Li
Dr. Irena Jadlovská
Guest Editors
Manuscript Submission Information
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Keywords
- mathematical model
- oscillation
- dynamical system
- delay
Related Special Issue
- Mathematical Modeling and Simulation of Oscillatory Phenomena in Mathematics (17 articles)
