GAO Zhi. Short- and Resonant-Range Interactions Between Scales in Turbulence and Their Applications[J]. Applied Mathematics and Mechanics, 2004, 25(8): 837-846.
Citation: GAO Zhi. Short- and Resonant-Range Interactions Between Scales in Turbulence and Their Applications[J]. Applied Mathematics and Mechanics, 2004, 25(8): 837-846.

Short- and Resonant-Range Interactions Between Scales in Turbulence and Their Applications

  • Received Date: 2002-02-24
  • Rev Recd Date: 2004-01-09
  • Publish Date: 2004-08-15
  • Interactions between different scales in turbulence were studied starting from the incompressible Navier-Stokes equations. The integral and differential formulae of the short-range viscous stresses, which express the short-range interactions between contiguous scales in turbulence, were given. A concept of the resonant-range interactions between extreme contiguous scales was introduced and the differential formula of the resonant-range viscous stresses was obtained. The short- and resonant-range viscous stresses were applied to deduce the large-eddy simulation (LES) equations as well as the multiscale equations, which are approximately closed and do not contain any empirical constants or relations. The properties and advantages of using the multiscale equations to compute turbulent flows were discussed. The short-range character of the interactions between the scales in turbulence means that the multiscale simulation is a very valuable technique for the calculation of turbulent flows. A few numerical examples were also given.
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  • [1]
    是勋刚.湍流[M].天津:天津大学出版社,1994.
    [2]
    Lumley J L.Whither turbulence? Turbulence at the crossroads[J].Lecture Notes in Physics,1989,357:313—374.
    [3]
    Frish V, Orszag S A.Turbulence: challenges for theory and experiment[J].Physics Today,1990,10(1):23—32.
    [4]
    Hinze J O.Turbulence[M].2nd Ed.New York:McGraw-Hill Book Co,1975.
    [5]
    Domaradzki J A,Saiki E M.A subgrid-scale model based on the estimation of unresolved scales of turbulence[J].Phys Fluids,1997,9(7):2148—2164. doi: 10.1063/1.869334
    [6]
    ZHOU Ye,Speziale C G.Advances in the fundamental aspects of turbulence: energy transfer, interacting scales, and self-preservation in isotropic decay [J].Appl Mech Rev,1998,51(4):267—301. doi: 10.1115/1.3099004
    [7]
    GAO Zhi,ZHUANG Feng-gan.Time-space scale effects in computing numerically flowfields and a new approach to flow numerical simulation[J].Lecture Notes in Physics,1995,453:256—262.
    [8]
    WANG Wei-guo,GAO Zhi,ZHUANG Feng-gan.A numerical comparison of the large and small scale (LSS) equations with the Navier-Stokes equations: the three dimensional evolution of a planar mixing layer flow[A].In:ZHUANG Feng-gan Ed.Proceedings of the International Symposium on Computational Fluid Dynamics[C].Beijing:International Academic Publisher,1997,484—490.
    [9]
    高智.湍流计算的多尺度模型与尺度间相互作用规律[J].自然科学进展,2003,13(11):1147—1153.
    [10]
    Hughes T J R,Mazze L,Oberai A A.The multiscale formulation of large eddy simulation: Decay of homogenous isotropic turbulence[J].Phys Fluids,2001,13(2):505—512. doi: 10.1063/1.1332391
    [11]
    周光炯,严宗毅,许世雄,等.流体力学[M].第二版.北京:高等教育出版社,2000.
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