Influence matrix technique for the numerical spectral simulation of viscous incompressible flows

A spatial discretization of the incompressible Navier-Stokes equation is presented in which the velocity is decomposed using poloidal and toroidal scalars whose spatial dependence is given in terms of spherical harmonics and Chebychev polynomials. The radial resolution needs to be large enough at an

for linear partial differential equations in cylinders, which was applied to solve some nonlinear problems. In this paper the numerical simulation of the steady incompressible viscous flow in a no-slip channel is considered. A sequence The purpose of this paper is to design nonlocal artificial of ap

come several intrinsic limitations of spectral methods, allowing for the use of the latter in a wider context . The primitive variable formulation of the unsteady incompressible Navier-Stokes equations in three space dimensions is discretized The most obvious application of spectral multidomain wit

In recent years multigrid algorithms have been applied to increasingly difficult systems of partial differential equations and major improvements in both speed of convergence and robustness have been achieved. Problems involving several interacting fluids are of great interest in many industrial app

In this work a comparative study of two versions of the projection algorithm used either for time integration or as an iterative method to solve the three-dimensional incompressible Navier -Stokes equations is presented. It is also shown that these projection algorithms combined with the finite elem