http://orcid.org/0000-0002-9666-5730
References
- Anupindi, K., Lai, W., & Frankel, S. (2014). Characterization of oscillatory instability in lid driven cavity flows using lattice boltzmann method. Computers & Fluids, 92, 7–21.
- Bhatnagar, P., Gross, E., & Krook, M. (1954). A model for collision processes in gases. I. Small amplitude processes in charged and neutral one-component systems. Physical Review, 94(3), 511–525.
- Bouffanais, R., Deville, M., & Leriche, E. (2007). Large-eddy simulation of the flow in a lid-driven cubical cavity. Physics of Fluids, 19(5), 055108.
- Cabot, W. (1994). Local dynamic subgrid-scale models in channel flow (pp. 143–160). Stanford, CA: CTR Annual Research Briefs, Center for Turbulence Research, NASA Ames/Standford University.
- Chang, H., Hong, P., Lin, L., & Lin, C. (2013). Simulations of flow instability in three dimensional deep cavities with multi relaxation time lattice boltzmann method on graphic processing units. Computers & Fluids, 88, 866–871.
- Chen, S., & Martinez, D. (1996). On boundary conditions in lattice boltzmann methods. Physics of Fluids, 8(9), 2527.
- d’Humieres, D. (1992). Generalized lattice boltzmann equations. Progress in Astronautics and Aeronautics, 159, 450–458.
- Du, R., & Shi, B. (2010). Incompressible multi-relaxation-time lattice boltzmann model in 3-d space. Journal of Hydrodynamics, 22(6), 782–787.
- Feldman, Y., & Gelfgat, A. (2010). Oscillatory instability of a 3d lid-driven flow in a cube. Physics of Fluids, 22(9), 093602.
- Germano, M., Piomelli, P., Moin, P., & Cabot, W. (1991). A dynamic subgrid-scale eddy viscosity model. Physics of Fluids A, 3(7), 1760–1765.
- Ghia, U., Ghia, K., & Shin, C. (1982). High-re solutions for incompressible flow using the navier-stokes equations and a multigrid method. Journal of Computational Physics, 48(3), 387–411.
- Guo, Z., & Shu, C. (2013). Lattice boltzmann method and its applications in engineering. Singapore: World Scientific Publishing.
- Hammami, F., Ben-Cheikh, N., Campo, A., Ben-Beya, B., & Lili, T. (2012). Prediction of unsteady states in lid-driven cavities filled with an incompressible viscous fluid. International Journal of Modern Physics C, 23(4), 1250030.
- Harris, S. (2011). An introduction to the theory of the boltzmann equation. Mineola, NY: Dover Publications.
- Kruger, T., Kusumaatmaja, H., Kuzmin, A., Shardt, O., Silva, G., & Viggen, E. (2017). The lattice boltzmann method principles and practice. Switzerland: Springer International Publishing.
- Kuhlmann, H., & Albensoeder, S. (2014). Stability of the steady three-dimensional lid-driven flow in a cube and the supercritical flow dynamics. Physics of Fluids, 26(2), 024104.
- Ladd, A. (1994). Numerical simulations of particulate suspensions via a discretized boltzmann equation. Part 1. Theoretical foundation. Journal of Fluid Mechanics, 271, 285–309.
- Leriche, E., & Gavrilakis, S. (2000). Direct numerical simulation of the flow in a lid-driven cubical cavity. Physics of Fluids, 12(6), 1363.
- Loiseau, J., Robinet, J., & Leriche, E. (2016). Intermittency and transition to chaos in the cubical lid-driven cavity flow. Fluid Dynamics Research, 48(6), 061421.
- Marie, S., Ricot, D., & Sagaut, P. (2009). Comparison between lattice boltzmann method and navierstokes high order schemes for computational aeroacoustics. Journal of Computational Physics, 228(4), 1056–1070.
- MathWorks. (2017). Matlab user’s guide. Upper Saddle River, New Jersey: Prentice Hall.
- McNamara, G., & Zanetti, G. (1988). Use of the boltzmann equation to simulate lattice gas automata. Physical Review Letters, 61(20), 2332–2335.
- Ming, L., Xiao-Peng, C., & Premnath, K. (2012). Comparative study of the large eddy simulations with the lattice boltzmann method using the wall-adapting local eddy-viscosity and vreman subgrid scale models. Chinese Physics Letters, 29(10), 104706.
- Murdock, J., Ickes, J., & Yang, S. (2017). Transition flow with an incompressible lattice boltzmann method. Advances in Applied Mathematics and Mechanics, 9(5), 1271–1288.
- Murdock, J., & Yang, S. (2016). Alternative and explicit derivation of the lattice boltzmann equation for the unsteady incompressible navier-stokes equation. International Journal of Computational Engineering Research, 6(12), 47–59.
- Mynam, M., & Pathak, A. (2013). Lattice boltzmann simulation of steady and oscillatory flows in lid-driven cubic cavity. International Journal for Numerical Methods in Fluids, 24(12), 1340005.
- Nicoud, F., & Ducros, F. (1999). Subgrid-scale stress modelling based on the square of the velocity gradient tensor. Flow, Turbulence and Combustion, 62(3), 183–200.
- Pope, S. B. (2000). Turbulent flows. Cambridge, UK: Cambridge University Press.
- Prasad, A., & Koseff, J. (1989). Reynolds number and end-wall effects on a lid-driven cavity flow. Physics of Fluids A, 1(2), 208–218.
- Premnath, K., & Abraham, J. (2007). Three-dimensional multi-relaxation time (mrt) lattice- boltzmann models for multiphase flow. Journal of Computational Physics, 224(2), 539–559.
- Ren, F., Song, B., & Haibao, H. (2018). Lattice boltzmann simulations of turbulent channel flow and heat transport by incorporating the vreman model. Applied Thermal Engineering, 129, 463–471.
- Shankar, P., & Deshpande, M. (2000). Fluid mechanics in the driven cavity. Annual Review of Fluid Mechanics, 32, 93–136.
- Shen, J. (1991). Hopf bifurcation of the unsteady regularized driven cavity flow. Journal of Computational Physics, 95(1), 228–245.
- Shetty, D., Fisher, T., Chunekar, A., & Frankel, S. (2010). High-order incompressible large- eddy simulation of fully inhomogeneous turbulent flows. Journal of Computational Physics, 229(23), 8802–8822.
- Si, H., & Shi, Y. (2015). Study on lattice boltzmann method/large eddy simulation and its application at high reynolds number flow. Advances in Mechanical Engineering, 7(3), 1–8.
- Smagorinsky, J. (1963). General circulation experiments with the primitive equations. Monthly Weather Review, 91, 99–164.
- Tolke, J. (2009). Implementation of a lattice boltzmann kernel using the compute unified device architecture developed by nvidia. Computing and Visualization in Science, 13(29), 29–39.
- Vreman, A. (2004). An eddy-viscosity subgrid-scale model for turbulent shear flow: Algebraic theory and applications. Physics of Fluids, 16(10), 3670–3681.
- Wong, K., & Baker, A. (2002). A 3d incompressible navierstokes velocityvorticity weak form finite element algorithm. International Journal for Numerical Methods in Fluids, 38, 99–123.