Analysis of a projection method for the Stokes problem using an -Stokes approach

Abstract

We generalize pressure boundary conditions of an -Stokes problem. Our -Stokes problem connects the classical Stokes problem and the corresponding pressure-Poisson equation using one parameter >0. For the Dirichlet boundary condition, it is proven in K. Matsui and A. Muntean (2018) that the solution for the -Stokes problem converges to the one for the Stokes problem as tends to 0, and to the one for the pressure-Poisson problem as tends to ∞. Here, we extend these results to the Neumann and mixed boundary conditions. We also establish error estimates in suitable norms between the solutions to the -Stokes problem, the pressure-Poisson problem and the Stokes problem, respectively. Several numerical examples are provided to show that several such error estimates are optimal in . Our error estimates are improved if one uses the Neumann boundary conditions. In addition, we show that the solution to the -Stokes problem has a nice asymptotic structure.