Multiscale Modeling: Hyperbolic Relaxation and Kinetic Theory
This course provides an in-depth exploration of multiscale mathematical modelling methods, with a particular focus on hyperbolic systems, relaxation and kinetic models. It aims to formulate and analyse complex physical phenomena across different scales using advanced mathematical tools and numerical techniques.
Lecturer
Date
15th October, 2025 ~ 7th January, 2026
Location
| Weekday | Time | Venue | Online | ID | Password |
|---|---|---|---|---|---|
| Tuesday | 13:30 - 16:55 | A3-2-201 | ZOOM 2 | 638 227 8222 | BIMSA |
Reference
1. LeVeque, R. J., Hyperbolic Partial Differential Equations, Springer, 2002.
2. Jin, S., Efficient Asymptotic-Preserving Schemes for Multiscale Relaxation Systems, 2009.
3. E. W., Multiscale Modeling and Simulation in Science, 2009
2. Jin, S., Efficient Asymptotic-Preserving Schemes for Multiscale Relaxation Systems, 2009.
3. E. W., Multiscale Modeling and Simulation in Science, 2009
Audience
Undergraduate
, Advanced Undergraduate
, Graduate
, Postdoc
, Researcher
Video Public
No
Notes Public
No
Language
Chinese
, English
Lecturer Intro
Zhiting Ma obtained the B.S. degree from Lanzhou University in 2015 and Ph.D. degree from Department of Mathematical Sciences at Tsinghua University, China in 2021. Then, she worked as a postdoc at School of Mathematical Sciences, Peking University. Currently, she is an Assistant Professor in Beijing Institute of Mathematical Sciences and Applications (BIMSA). Her current research interests include kinetic theory, machine learning and hyperbolic relaxation systems.