A finite element multigrid preconditioner for Chebyshev–collocation methods

This paper analyzes triangular finite elements for the preconditioning of Chebyshev collocation solutions of elliptic boundary value problems. Results are given for scalar model problems and for both Stokes and Navier-Stokes equations.

The Method of Weighted Residuals (MWR) is a powerful tool in solving boundary value problems. A particular MWR is the "collocation method". The main theme of this paper is eigenvalue calculations with the collocation method. The bench mark problems considered are second andfourth order dtflerential

## Abstract This paper is concerned with the iterative solution of the boundary element equations arising from standard Galerkin boundary element discretizations of first‐kind boundary integral operators of positive and negative order. We construct efficient preconditioners on the basis of so‐calle