Keywords: Modelica; Cascaded Digital Lattice Boltzmann; 2-dimensional flows
Proceedings of the 10th International Modelica Conference; March 10-12; 2014; Lund; Sweden
[1] M. Bonvini, M.; Popovac, “Fluid flow modelling with Modelica,” Proceedings of the 7th International Conference on Mathematical Modelling, Vienna, Austria, 2012.
[2] D. D’Humieres, “Generalized lattice-Boltzmann equations,” Rarefied Gas Dynamics: Theory and Simulations, vol. 159, pp. 450–458, 1992.
[3] P. Lallemand and L.-S. Luo, “Theory of the lattice Boltzmann method: Dispersion, dissipation, isotropy, Galilean invariance, and stability,” Phys. Rev. E, vol. 61, pp. 6546–6562, Jun 2000.
[4] M. Geier, J. G. Korvink, and A. Greiner, “Cascaded digital lattice Boltzmann automata for high Reynolds number flow,” PHYSICAL REVIEW E 73, 2006.
[5] J. Brown, “Computational fluid dynamics in an equation-based, acausal modeling environment,” Master’s thesis, Atlanta, Ga. : Georgia Institute of Technology, 2010.
[6] Q. Zou and X. He, “On pressure and velocity boundary conditions for the lattice Boltzmann BGK model,” Physics of Fluids, vol. 9, no. 6, pp. 1591–1598, Jun. 1997.