Nonlinear PDEs & analysis
Examining nonlinear partial differential equations and their applications in various scientific fields through interdisciplinary research.
The project aimed to explore nonlinear partial differential equations (PDEs), which are crucial for modelling complex systems in weather prediction, animal behaviour, and cosmology. These equations serve as a fundamental tool bridging mathematics with various scientific fields, both basic and applied. The research also investigated nonlinear analysis, a key area of study, which helps in understanding and solving PDEs, revealing insights into intricate patterns and behaviours. This interdisciplinary approach enhances our ability to predict and control natural phenomena, offering deep insights into the workings of the universe. By leveraging the power of PDEs and Nonlinear Analysis, scientists and mathematicians can address diverse challenges across multiple domains.
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Original project funded for three years from 2012
Key topics
- Nonlinear analysis
- Mathematical modeling
- Interdisciplinary science
Directors
Zhoupin Xin
Professor at the Chinese University of Hong Kong
Daomin Cao
Professor Situation unknown
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