Mathematical Problems for Complex Systems
1Xinjiang University, Xinjiang, China
2University of Rhode Island, Kingston, USA
3Linyi University, Shandong, China
4Chongqing Jiaotong University, Chongqing, China
5Southeast University, Nanjing, China
Mathematical Problems for Complex Systems
Description
As most of the practical systems have a high complexity, complex systems have become a rapidly growing area of mathematics and have attracted many researchers. The study of complex systems has not only an important theoretical interest, but also is motivated by problems from applied mathematics including physics, chemistry, astronomy, technology, natural, and social sciences. It should be noted that some major problems have not been fully investigated, such as the behavior of stability, synchronization, and bifurcation and chaos control for complex systems, as well as their applications in, for example, communication and bioinformatics.
This special issue aims to bring together the advanced methodologies to understanding the mathematical issues of complex systems from a dynamic system perspective.
Potential topics include, but are not limited to:
- Mathematical modelling of complex systems
- Mathematical analysis of different kinds of complex systems
- Qualitative analysis of complex dynamical systems
- Numerical methods for complex dynamical systems
- Stability analysis of complex dynamical systems
- Bifurcation and chaos of complex dynamical systems
- Control of complex systems
- Applications of complex systems to real world