A multigrid method for solving the Navier-Stokes/Boussinesq equations

Anisotropies occur naturally in computational fluid dynamics where the simulation of small-scale physical phenomena, such as boundary layers at high Reynolds numbers, causes the grid to be highly stretched, leading to a slowdown in convergence of multigrid methods. Several approaches aimed at making

In this note we continue our investigation [1] of multigrid methods as preconditioners to a Jacobian-free Newton-Krylov method [2,3]. We consider two different options for the formation of the coarse grid operators required in the multigrid preconditioner. The first option (Method 1) involves restri

to perhaps the fact that the turbulence model equations are solved only to obtain the eddy viscosity and also the Many researchers use a time-lagged or loosely coupled approach in solving the Navier-Stokes equations and two-equation turbuconvenience of simply adding separate routines to an exlence m

A fourth-order numerical method for solving the Navier±Stokes equations in streamfunctionavorticity formulation on a two-dimensional non-uniform orthogonal grid has been tested on the ¯uid ¯ow in a constricted symmetric channel. The family of grids is generated algebraically using a conformal transf