Velocity inertial subrange model: Difference between revisions

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== Testing citation==
== Testing citation==
<ref>{{Cite journal
<ref>{{Cite journal
|authors= c bl, a friend, a 3rd author
|authors= K. R. Sreenivasan
|journal= jfm
|journal= Phys. Fluids
|papertitle=  I love turbulence
|papertitle=  On the universality of the Kolmogorov constant
|year= 2021
|year= 1991
|doi= enter the doi part only
|doi= 10.1063/1.86 8656
}}</ref> Continue writing..
}}</ref> Continue writing..



Revision as of 19:44, 11 November 2021


Short definition of Velocity inertial subrange model
The inertial subrange separates the energy-containing production range from the viscous dissipation range.

This is the common definition for Velocity inertial subrange model, but other definitions may be discussed within the wiki.



Inertial subrange for steady-flows

This theoretical model predicts the spectral shape of velocities in wavenumber space.

ΨVj(k^)=ajCkε2/3k^5/3

Here k^ is expressed in rad/m and Vj represents the velocities V in direction j. Ck is the empirical Kolmogorov universal constant of C = 1.5 (see Sreenivasan 1995 for a review on the universality of this constant). Amongst the three direction, the spectra deviates by the constant aj:

  • In the longitudinal direction, i.e., the direction of mean advection (j=1), a1=1855
  • In the other directions a2=a3=43a1

Testing citation

[1] Continue writing..

Inertial subrange for flows influenced by surface waves

Need to add equations and figures from Lumley & Terray

Notes

  1. K. R. Sreenivasan. 1991. {{{paper_or_booktitle}}}. {{{journal_or_publisher}}}. doi:10.1063/1.86 8656