Wellposedness for the Navier–Stokes flow in the exterior of a rotating obstacle

## Abstract Let T=ℝ×(‐1,1) and &ℴ⊂ℝ^2^ be a smoothly bounded open set, closure of which is contained in __T__. We consider the stationary Navier–Stokes flows in $\Omega {:=} T \backslash \bar{\scriptstyle{O}}$. In general, the pressure is determined up to a constant. Since Ω has two extremities, we

The steady incompressible Navier-Stokes equations in three dimensions are solved for neutral and stably stratified flow past three-dimensional obstacles of increasing spanwise width. The continuous equations are approximated using a finite volume discretisation on staggered grids with a flux-limited

A family of Navier-Stokes preconditioners is presented that may reduce the stiffness due to complicated interaction between convection and diffusion in viscous flows. Navier-Stokes preconditioning is developed based on a Fourier analysis of the discretized equations and a dispersion analysis of the