OPTIMAL-ORDER NONNESTED MULTIGRID METHODS FOR SOLVING FINITE ELEMENT EQUATIONS I: ON QUASI-UNIFORM MESHES

We prove that the multigrid method works with optimal computational order even when the multiple meshes are not nested. When a coarse mesh is not a submesh of the finer one, the coarse-level correction usually does not have the a(-, •) projection property and does amplify the iterative error in some components. Nevertheless, the low-frequency components of the error can still be caught by the coarse-level correction. Since the (amplified) highfrequency errors will be damped out by the fine-level smoothing efficiently, the optimal work order of the standard multigrid method can still be maintained. However, unlike the case of nested meshes, a nonnested multigrid method with one smoothing does not converge in general, no matter whether it is a K-cycle or a W-cyc\t method. It is shown numerically that the convergence rates of nonnested multigrid methods are not necessarily worse than those of nested ones. Since nonnested multigrid methods accept quite arbitrarily related meshes, we may then combine the efficiencies of adaptive refinements and of multigrid algorithms.

[1]  Harry Yserentant,et al.  The Convergence of Multi-Level Methods for Solving Finite-Element Equations in the Presence of Singularities , 1986 .

[2]  Randolph E. Bank,et al.  An optimal order process for solving finite element equations , 1981 .

[3]  J. Pasciak,et al.  The analysis of multigrid algorithms with nonnested spaces or noninherited quadratic forms , 1991 .

[4]  Shangyou Zhang Optimal-order nonnested multigrid methods for solving finite element equations. I. On quasi-uniform meshes , 1990 .

[5]  S. C. Brenner,et al.  An Optimal-Order Multigrid Method for P1 Nonconforming Finite Elements , 1989 .

[6]  Philippe G. Ciarlet,et al.  The finite element method for elliptic problems , 2002, Classics in applied mathematics.

[7]  I. Babuška,et al.  Direct and inverse error estimates for finite elements with mesh refinements , 1979 .

[8]  P. Peisker A multilevel algorithm for the biharmonic problem , 1985 .

[9]  Juhani Pitkäranta,et al.  A multigrid version of a simple finite element method for the Stokes problem , 1985 .

[10]  Wolfgang Hackbusch,et al.  Multigrid Methods II , 1986 .

[11]  R. Verfürth A combined conjugate gradient - multi-grid algorithm for the numerical solution of the Stokes problem , 1984 .

[12]  R. Verfürth A Multilevel Algorithm for Mixed Problems , 1984 .

[13]  Dietrich Braess,et al.  A conjugate gradient method and a multigrid algorithm for Morley s finite element approximation of the biharmonic equation , 1987 .

[14]  L. R. Scott,et al.  Finite element interpolation of nonsmooth functions satisfying boundary conditions , 1990 .

[15]  Jan Mandel,et al.  Multigrid convergence for nonsymmetric, indefinite variational problems and one smoothing step , 1986 .

[16]  P. Grisvard Elliptic Problems in Nonsmooth Domains , 1985 .

[17]  R. Verfúrth,et al.  Multilevel algorithms for mixed problems. II. Treatment of the mini-element , 1988 .