Key points are not available for this paper at this time.
The energy spectrum equation due to the modified zero-fourth-cumulant approximation is solved numerically for large Reynolds numbers R =10 4 ∼10 6 and dealt with analytically. The energy spectrum is found to satisfy different similarity laws in three wavenumber ranges. In the energy-containing range k = O (1), it satisfies an inviscid similarity law and takes the k -5/3 intertial form at higher wavenumbers. In the intermediate range k = O ((ν t ) -1/2 ), it takes the k -2 and k -1 forms at lower and higher wavenumbers respectively. In the energy-dissipation range k = O ( ε 1/4 ν -3/4 ), it satisfies Kolmogorov's similarity law and takes the asymptotic form exp (- b k ) for k →∞. The energy, the skewness, the microscale and the microscale Reynolds number are calculated numerically, and their similarity laws are derived analytically.
Tatsumi et al. (Sat,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: