On the Kolmogorov Constants for the Second-Order Structure Function and the Energy Spectrum

Abstract

We examine the behavior of the Kolmogorov constants C2, Ck, and Ck1, which are, respectively, the prefactors of the second order longitudinal structure function, the three dimensional and one-dimensional longitudinal energy spectrum in the inertial range. We show that their ratios, C2/Ck1 and Ck/Ck1, exhibit clear dependence on the micro-scale Reynolds number Rλ, implying that they cannot all be independent of Rλ. In particular, it is found that (Ck1/C2-0.25) = 1.95Rλ-0.68. The study further reveals that the widely-used relation C2 = 4.02 Ck1 holds only asymptotically when Rλ <= 105. It is also found that C2 has much stronger Rλ-dependence than either Ck, or Ck1 if the latter indeed has a systematic dependence on Rλ. We further show that the variable dependence on Rλ of these three numbers can be attributed to the difference of the inertial range in real- and wavenumber-space, with inertial range in real-space known to be much shorter than that in wavenumber space.