This scheme is equivalent to the CoBlended scheme except that the Courant
number is evaluated for cells using the same approach as use in the
finite-volume solvers and then interpolated to the faces rather than being
estimated directly at the faces based on the flux. This is a more
consistent method for evaluating the Courant number but suffers from the
need to interpolate which introduces a degree of freedom. However, the
interpolation scheme for "Co" is run-time selected and may be specified in
"interpolationSchemes" and "localMax" might be most appropriate.
Example of the cellCoBlended scheme specification using LUST for Courant
numbers less than 1 and linearUpwind for Courant numbers greater than 10:
\verbatim
divSchemes
{
.
.
div(phi,U) Gauss cellCoBlended 1 LUST grad(U) 10 linearUpwind grad(U);
.
.
}
interpolationSchemes
{
.
.
interpolate(Co) localMax;
.
.
}
\endverbatim