Kármán–Howarth equation
In isotropic turbulence the Kármán-Howarth equation (after Theodore von Kármán and Leslie Howarth 1938), which is derived from the Navier-Stokes equations, is used to describe the evolution of non-dimensional longitudinal autocorrelation.
Mathematical description[1]
Consider a two-point correlation for homogeneous turbulence . For isotropic turbulence the correlation function can be expressed in terms of two scalar functions
where is the root mean square turbulent velocity and are turbulent fluctuating velocity in all three directions. From continuity equation we have , so
Thus uniquely determines the two-point correlation function. Theodore von Kármán and Leslie Howarth derived the evolution equation for from Navier-Stokes equation as
where uniquely determines the triple correlation function i.e., .
See also
- Kármán–Howarth–Monin equation (Andrei Monin's anisotropic generalization of the Kármán–Howarth relation)
References
- ↑ Pope, Stephen B. "Turbulent flows." (2001): 2020.