Tuowei Chen
time: 2025-11-17

CHEN Tuowei

Position: Assistant Professor

Email: chentuowei@scut.edu.cn

Research Interests

  • Nonlinear Partial Differential Equations

  • Computational fluid dynamics

Education and Work Experience

Education Experience:

  • 2016/09-2022/06: Fudan University, Mathematics (Ph.D.)

  • 2012/09-2016/06: Fudan University, Mathematics and Applied Mathematics (B.S.)

Work Experience:

  • 2025/10-Present: South China University of Technology, School of Mathematics, Assistant Professor

  • 2024/09-2025/09: Hong Kong University of Science and Technology, Department of Mathematics, Postdoctoral Fellow (Co-advisor: Kun Xu)

  • 2022/07-2024/07: Institute of Applied Physics and Computational Mathematics, Postdoctoral Fellow (Co-advisor: Qiangchang Ju and Jiequan Li)

Research Achievement

  • T. Chen and Z. Du (2025). A second-order relaxation flux solver for compressible Navier-Stokes equations based on generalized Riemann problem method. Journal of Computational Physics, 541, 114314.

  • T. Chen and Q. Ju (2025). The global existence and low Mach number limit for full Navier-Stokes equations around the Couette flow in a finite channel, Science China Mathematics, 68(8): 1979-2002.

  • T. Chen and J. Li (2025). Relaxation schemes for entropy dissipative systems of viscous conservation laws, Communications in Computational Physics, 38(4): 953-986.

  • T. Chen and Z. Du (2025). Generalized Riemann problem method for the Kapila model of compressible multiphase flows. Physics of Fluids, 37, 076149.

  • T. Chen and Y. Pu (2024). On a relaxation approximation of the 2-D incompressible MHD equations, Applicable Analysis, 103(15), 2777-2790.

  • T. Chen and Y. Zhang (2021). Initial boundary value problems for two-dimensional isentropic compressible Navier-Stokes equations with rotating effect terms, Journal of Mathematical Analysis and Applications, 504(2), 125430.

  • T. Chen and Y. Zhang (2021). Free boundary problem for one-dimensional compressible Navier-Stokes equations with temperature dependent viscosity and heat conductivity, Mathematical Methods in the Applied Sciences, 44(17):13273-13286.

  • T. Chen and Y. Zhang (2021). A strong solution of Navier-Stokes equations with a rotation effect for isentropic compressible fluids, Acta Mathematica Scientia. Series B, 41(5):1579-1605.