Summary. In this paper, the adaptive filtering method is introduced and analysed. This method leads to robust algorithms for the solution of systems of linear equations which arise from the discretisation of partial differential equations with strongly varying coefficients. These iterative algorithms are based on the tangential frequency filtering decompositions (TFFD). During the iteration with a preliminary preconditioner, the adaptive test vector method calculates new test vectors for the TFFD. The adaptive test vector iterative method allows the combination of the tangential frequency decomposition and other iterative methods such as multi-grid. The connection with the TFFD improves the robustness of these iterative methods with respect to varying coefficients. Interface problems as well as problems with stochastically distributed properties are considered. Realistic numerical experiments confirm the efficiency of the presented algorithms.
[1]
Eduard Stiefel,et al.
Über einige Methoden der Relaxationsrechnung
,
1952
.
[2]
H. Brakhage.
Über die numerische Behandlung von Integralgleichungen nach der Quadraturformelmethode
,
1960
.
[3]
R. P. Fedorenko.
A relaxation method for solving elliptic difference equations
,
1962
.
[4]
Wolfgang Hackbusch,et al.
Multi-grid methods and applications
,
1985,
Springer series in computational mathematics.
[5]
Gabriel Wittum,et al.
Linear iterations as smoothers in multigrid methods: Theory with applications to incomplete decompositions
,
1989,
IMPACT Comput. Sci. Eng..
[6]
Allan L. Gutjahr,et al.
Cross‐correlated random field generation with the direct Fourier Transform Method
,
1993
.
[7]
A. Reusken,et al.
Multigrid with Matrix-dependent Transfer Operators for Convection-diffusion Problems
,
1994
.