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Wind-Driven Ocean Circulation in Shallow Water Lattice Boltzmann Model 被引量:2

Wind-Driven Ocean Circulation in Shallow Water Lattice Boltzmann Model
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摘要 A lattice Boltzmann (LB) model with overall second-order accuracy is applied to the 1.5-layer shallow water equation for a wind-driven double-gyre ocean circulation. By introducing the second-order integral approximation for the collision operator, the model becomes fully explicit. In this case, any iterative technique is not needed. The Coriolis force and other external forces are included in the model with second-order accuracy, which is consistent with the discretized accuracy of the LB equation. The numerical results show correct physics of the ocean circulation driven by the double-gyre wind stress with different Reynolds numbers and different spatial resolutions. An intrinsic low-frequency variability of the shallow water model is also found. The wind-driven ocean circulation exhibits subannual and interannual oscillations, which are comparable to those of models in which the conventional numerical methods are used. A lattice Boltzmann (LB) model with overall second-order accuracy is applied to the 1.5-layer shallow water equation for a wind-driven double-gyre ocean circulation. By introducing the second-order integral approximation for the collision operator, the model becomes fully explicit. In this case, any iterative technique is not needed. The Coriolis force and other external forces are included in the model with second-order accuracy, which is consistent with the discretized accuracy of the LB equation. The numerical results show correct physics of the ocean circulation driven by the double-gyre wind stress with different Reynolds numbers and different spatial resolutions. An intrinsic low-frequency variability of the shallow water model is also found. The wind-driven ocean circulation exhibits subannual and interannual oscillations, which are comparable to those of models in which the conventional numerical methods are used.
出处 《Advances in Atmospheric Sciences》 SCIE CAS CSCD 2005年第3期349-358,共10页 大气科学进展(英文版)
基金 The work was supported by the One Hundred Talents Project of the Chinese Academy of Sciences(Grant No.KCL14014) the Impacts of Ocean-Land-Atmosphere Interactions over the East Asian Mon soon Region on the Climate in China(EAMOLA)(Grant No:ZKCX2-SW-210) the National Outstanding Youth Science Foundation of China(Grant No.40325016).
关键词 lattice Boltzmann shallow water equation wind-driven ocean circulation Reynolds number spatial resolution low-frequency variability lattice Boltzmann, shallow water equation, wind-driven ocean circulation, Reynolds number, spatial resolution, low-frequency variability
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  • 1[1]Champman S, Cowling T G. The Mathematical Theory of Non-Uniform. Camberidge University Press 1970.
  • 2[2]Bird G A. Molecular Gas Dynamics and the Direct Simulation of Gas Flows. Oxford: Clarendon Press, 1994.
  • 3[3]Wolfram S. Cellular automaton fluidl: basic theory. J. Stat. Phys. , 1986,45:471-526.
  • 4[4]McNamara G, Alder B. Analysis of the Lattice Boltzmann Treatment of Hydronamics. Physica, 1993, A194:218-228.
  • 5[5]Alexander F J, Chen S, Sterling D. Lattice Boltzmann thermohydro dynamics. Phys. Rev., 1993,47:2249-2252.
  • 6[6]Holton J R. An Introduction to Dynamic Meteorology. New York: Academic Press, 1972.
  • 7[7]Bhatnagar P L, Gross E P, Krook M. A model for collision processes in Gases. Phys. Rev. , 1954,94:511-526.
  • 8[8]Feng S D,Tsutahara M. Some progresses in the lattice Boltzmann model. Chinese Physics, 2001,10(7):587-593.
  • 9[9]Tsutahara M, Feng S D, Kataoka T. Simulation of the stratified flows using the two-component lattice Boltzmann method. Comput. Phys. Commun . ,2000,129:131-137.
  • 10[10]Rothman D H, Zaleskl S. Lattice-Gas Cellar Automata. Camberidge University Press 1996.

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  • 1Aidun C K, Clausen J R. Lattice-Boltzmann method for complex flows[J]. Annual Review of Fluid Mechanics, 2010,42:439-472.
  • 2Kevin R T, Frank T T. Multilayer shallow water flow using lattice Boltzmann method with high performance computing[J]. Advances in Water Resources, 2009, 32: 1767-1776.
  • 3Salmon R. The lattice Boltzmann method as a basis for ocean circulation modeling[J]. Journal of Marine Research, 1999,57:503-535.
  • 4Qian Yuehong, DHumieres D, I.allemand P. I.attiee BGK models for Navier Stokes equation [J]. Europhysics Letters, 1992,17:479-484.
  • 5I.allemand P, I.uo I.ishi. Theory of the lattice Boltzmann method: Dispersion, dissipation, isotropy, Galllean invariance, and stability[J]. Physical Review E, 2000,61 : 6546-6562.
  • 6Chen HD, Kandasamy S, Orszag S, et al. Extended Boltzmann kinetic equation for turbulent flows [J]. Science, 2003,301:633-636.
  • 7Bouzidi M, Firdaouss M, Lallemand P. Momentum transfer of a Boltzmann-lattice fluid with boundaries [J]. Physics of Fluids, 2001,13:3452-3459.
  • 8Hou S, Sterling J, Chen S, et al. A lattice Bohzmann subgrid model for high Reynolds number flows [C]// I.awniczak AT, Kapral R, editors. Pattern formation and lattice gas automata. Fields Inst Commu, 1996,6: 151-66.
  • 9Nicoud F, Ducros F. Subgrid-scale stress modeling based on the square of the velocity gradient tensor [J]. Flow, Turbulence and Combustion, 1999, 62: 183- 200.
  • 10Ladd A J C. Numerical simulations of particulate suspensions via a discretized Bohzmann equation. Part 1= Theoretical foundation[J]. Journal of Fluid Mechanics, 1994,271:285-309.

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