# Reynolds-Averaged Navier Stokes Equations

### From Thermal-FluidsPedia

The **Reynolds-averaged Navier–Stokes (RANS) equations** are time-averaged (1)
equations of motion for fluid flow. They are primarily used while dealing with turbulent flows. These equations can be used with approximations based on knowledge of the properties of flow turbulence to give approximate averaged solutions to the Navier–Stokes equations.
For a stationary, incompressible flow of Newtonian fluid, these equations can be written in Einstein notation as:

The left hand side of this equation represents the change in mean momentum of fluid element owing to the unsteadiness in the mean flow and the convection by the mean flow. This change is balanced by the mean body force, the isotropic stress owing to the mean pressure field, the viscous stresses, and apparent stress owing to the fluctuating velocity field, generally referred to as the Reynolds stress. This nonlinear Reynolds stress term requires additional modeling to close the RANS equation for solving, and has led to the creation of many different turbulence models.

## Derivation of RANS equations

The basic tool required for the derivation of the RANS equations from the instantaneous Navier–Stokes equations is the *Reynolds decomposition*. Reynolds decomposition refers to separation of the flow variable (like velocity *u*) into the mean (time-averaged) component () and the fluctuating component (). (2).
Thus,

^{[1]}

where is the position vector.

The following rules will be useful while deriving the RANS. If *f* and *g* are two flow variables (like density (ρ), velocity (*u*), pressure (*p*), etc.) and *s* is one of the independent variables (*x*,*y*,*z*, or *t*) then,

Now the Navier–Stokes equations of motion ^{[2]} for an incompressible Newtonian fluid are:

Substituting,

- , etc.
^{[3]}

and taking a time-average of these equations yields,

The momentum equation can also be written as,^{[4]}

On further manipulations this yields,

where, is the mean rate of strain tensor.

Finally, since integration in time removes the time dependence of the resultant terms, the time derivative must be eliminated, leaving:

## References

(1) The true time average () of a variable (*x*) is defined by

For this to be a well-defined term, the limit () must be independent of the initial condition at *t*_{0}. In the case of a chaotic dynamical system, which the equations under turbulent conditions are thought to be, this means that the system can have only one strange attractor, a result that has yet to be proved for the Navier-Stokes equations. However, assuming the limit exists (which it does for any bounded system, which fluid velocities certainly are), there exists some *T* such that integration from *t*_{0} to *T* is arbitrarily close to the average. This means that given transient data over a sufficiently large time, the average can be numerically computed within some small error. However, there is no analytical way to obtain an upper bound on *T*.

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