| 徐大海. 1992. Lagrange与Euler时间积分尺度之间关系的统计动力学物理模型[J]. 气象学报, 50(2):140-151, doi:10.11676/qxxb1992.017 |
| Lagrange与Euler时间积分尺度之间关系的统计动力学物理模型 |
| THE RANDOM DYNAMIC THEORY ON THE RELATION BETWEEN LAGRANGIAN AND EULERIAN TIME SCALE |
| 投稿时间:1990-05-11 修订日期:1990-09-29 |
| DOI:10.11676/qxxb1992.017 |
| 中文关键词: |
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| 摘要点击次数: 2363 |
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| 中文摘要: |
| 本文给出了平稳、均匀湍流中平衡涡度及非平衡涡度偏差的定义,建立了Euler及Lagra-nge湍流的随机动力微分方程,解出了各自相关函数。在各向同性及冻结湍流假设中使用Bla-ton公式按上述相关函数解出了Langrange时间尺度与Euler尺度比的表达式,其渐近值恰为全方向湍流度的倒数的1/√2倍即0.71/i。 |
| 英文摘要: |
| In this paper the "Bernoulli's Equilibrium Vorticity" and the "Deviation of the BEV" are defined and a random dynamic model, which can give both Lagrangian and Eulerian autocorrelation functions, are set up for wind velocity fluctuations in the stationary, homogeneous turbulence. Under Taylor}s hypothesis of "frizened eddies", the ratio of Lagrangian time scale to Eulerian is given as a function of the deviation of wind diraction, that has asymptotic form 0.71/i where i is the intensity of the turbulence, if the turbulence is isotropic. |
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