[1] Zhenhua Chai and Baochang Shi*. Multiple-relaxation-time lattice Boltzmann method for the Navier-Stokes and nonlinear convection-diffusion equations: Modeling, analysis, and elements. Physical Review E, 2020, 102(2): 023306.
[2] Xinmeng Chen, Zhenhua Chai, Huili Wang and Baochang Shi*. A finite-difference lattice Boltzmann method with second-order accuracy of time and space for incompressible flow. Computers & Mathematics with Applications, 2020, 80(12): 3066-3081.
[3] Jiao Liu, Zhenhua Chai* and Baochang Shi. A lattice Boltzmann model for the nonlinear thermistor equations. International Journal of Modern Physics C, 2020, 31(03): 2050043.
[4] Fang Shan, Zhenhua Chai* and Baochang Shi. A theoretical study on the capillary rise of non-Newtonian power-law fluids. Applied Mathematical Modelling, 2020, 81: 768-786.
[5] Jinlong Shang, Zhenhua Chai, Huili Wang and Baochang Shi*. Discrete unified gas kinetic scheme for nonlinear convection-diffusion equations. Physical Review E, 2020, 101(2): 023306.
[6] Yao Wu, Yong Zhao, Zhenhua Chai and Baochang Shi*. Discrete effects on some boundary schemes of multiple-relaxation-time lattice Boltzmann model for convection–diffusion equations. Computers & Mathematics with Applications, 2020, 80(3): 531-551.
[7] Xiaolei Yuan, Zhenhua Chai, Huili Wang, Baochang Shi*. A generalized lattice Boltzmann model for fluid flow system and its application in two-phase flows. Computers & Mathematics with Applications, 2020, 79(6): 1759-1780.
[8] Xiaolei Yuan, Huili Wang, Zhenhua Chai, Baochang Shi*. Phase-field-based lattice Boltzmann model for immiscible incompressible N-phase flows. Physical Review E, 2020, 101(6): 063310.
[9] Yong Zhao, Gerald G. Pereira, Shibo Kuang, Zhenhua Chai and Baochang Shi*. A generalized lattice Boltzmann model for solid–liquid phase change with variable density and thermophysical properties. Applied Mathematics Letters, 2020, 104: 106250.
[10] Yong Zhao, Yao Wu, Zhenhua Chai and Baochang Shi*. A block triple-relaxation-time lattice Boltzmann model for nonlinear anisotropic convection-diffusion equations. Computers and Mathematics with Applications, 2019, 79: 2550-2573.
