A new velocity–vorticity boundary integral formulation for Navier–Stokes equations

In this article, we propose a mixed method for the vorticity-velocity formulation of the stationary Stokes and Navier-Stokes equations in space dimension three, the unknowns being the vorticity and the velocity of the fluid. We give a similar variational formulation for the nonstationary Stokes equa

We develop and analyze a least-squares finite element method for the steady state, incompressible Navier-Stokes equations, written as a first-order system involving vorticity as new dependent variable. In contrast to standard L 2 least-squares methods for this system, our approach utilizes discrete

In this paper the high-order formulations described by Liao (In?. j . numer: methodspuids, 15,595412 (1992)) are proved to be stable for viscous flow under high Reynolds number. As an example, results for shear-dnven flow in a square cavity at Reynolds numbers up to 10,000 are given.

In the present work, we propose an indirect boundary-only integral equation approach for the numerical solution of the Navier-Stokes system of equations in a three-dimensional ow cavity. The formulation is based on an indirect integral representational formula for the permanent Stokes equations, and