2020.01-present: Lecture, Department of Applied Mathematics, University of Science and Technology Beijing (USTB), China;
2017. 07-2019. 12: Posdoc, Department of Applied Mathematics, University of Science and Technology Beijing (USTB), China;
2013.09-2017. 06: PhD, Division of Mechanics, Beijing Computational Science Research Center, China;

1. Weifeng Zhao, Juntao Huang, Wen-An Yong, Lattice Boltzmann method for stochastic convection-diffusion equations. SIAM/ASA Journal on Uncertainty Quantification 9(2):536-563 (2021).
2. Weifeng Zhao, Juntao Huang, Boundary treatment of implicit-explicit Runge-Kutta method for hyperbolic systems with source terms. Journal of  Computational Physics, 423(3):109828 (2020).
3. Weifeng Zhao, Juntao Huang, Steven Ruuth, Boundary treatment of high order Runge-Kutta methods for hyperbolic conservation laws. Journal of Computational Physics 421:109697 (2020)
4. Jin Zhao,Weifeng Zhao, Zhimin Zhang, Second-order boundary schemes for the lattice Boltzmann method with general propagation. Journal of Computational Physics 419:109669 (2020).
5. Weifeng Zhao, Wen-An Yong, Weighted L2-stability of a discrete kinetic approximation for the incompressible Navier–Stokes equations on bounded domains, Journal of Computational and Applied Mathematics, 376, 112820 (2020).
6. Weifeng Zhao, Wen-An Yong, Boundary Scheme for a Discrete Kinetic Approximation of the Navier–Stokes Equations, Journal of Scientific Computing, 82(3), 71 (2020).
7. Chang Guo, Weifeng Zhao, Ping Lin, On the collision matrix of the lattice Boltzmann method for anisotropic convection–diffusion equations, Applied Mathematics Letters, 105, 106304 (2020).
8. Weifeng Zhao, Juntao Huang, Wen-An Yong, Boundary Conditions for Kinetic Theory Based Models I: Lattice Boltzmann Models, Multiscale Modeling and Simulation, 17(2), 854-872 (2019).
9. Juntao Huang, Weifeng Zhao, Chi-Wang Shu, A Third-Order Unconditionally Positivity-Preserving Scheme for Production–Destruction Equations with Applications to  Non-equilibrium Flows, Journal of Scientific Computing, 79, 1015–1056(2019).
10. Mengxin Zhang, Weifeng Zhao, Ping Lin, Lattice Boltzmann method for general convection-diffusion equations: MRT model and boundary schemes, Journal of Computational Physics, 389, 147-163 (2019).
11. Weifeng Zhao, Wen-An Yong, Relaxation-rate formula for the entropic lattice Boltzmann model, Chinese Physics B, 28(11), 114701 (2019).
12. Weifeng Zhao, A phase-field-based lattice Boltzmann method for moving contact line  problems on curved stationary boundaries in two dimensions, International Journal of Modern Physics C, 30(6), 1950044 (2019).
13. Liang Wang, Weifeng Zhao, Xiaodong Wang, Lattice kinetic scheme for the Navier-Stokes equations coupled with convection-diffusion equations, Physical Review E, 98, 033308 (2018).
14. Weifeng Zhao, Liang Wang, Wen-An Yong, On a two-relaxation-time D2Q9 lattice Boltzmann model for the Navier–Stokes equations, Physica A: Statistical Mechanics and its Applications, 492, 1570-1580 (2018).
15. Weifeng Zhao, Wen-An Yong, Li-Shi Luo, Stability analysis of a class of globally hyperbolic moment system, Communications in Mathematical Sciences,, 15(3), 609-633 (2017).
16. Weifeng Zhao, Wen-An Yong, Single-node second-order boundary schemes for the lattice Boltzmann method, Journal of Computational Physics, 329, 1-15 (2017).
17. Weifeng Zhao, Wen-An Yong, Maxwell iteration for the lattice Boltzmann method with diffusive scaling, Physical Review E, 95, 033311 (2017).
18. Wen-An Yong, Weifeng Zhao, Li-Shi Luo, Theory of the Lattice Boltzmann method: Derivation of macroscopic equations via the Maxwell iteration, Physical Review E, 93, 033310 (2016).