Application of Parallel Algebraic Multigrid Algorithms in Geophysics

We study the convergence rate of multilevel algorithms from an algebraic point of view. This requires a detailed analysis of the constant in the strengthened Cauchy-Schwarz inequality between the coarse-grid space and a so-called complementary space. This complementary space may be spanned by standa

The algebraic multigrid method (AMG) can be applied as a preconditioner for the conjugate gradient method. Since no special hierarchical mesh structure has to be specified, this method is very well suited for the implementation into a standard finite element program. A general concept for the parall

Multigrid techniques have been shown to significantly improve the convergence rate of the nonlinear relaxation algorithms used in computer vision for the extraction of low-level image features. It is also well known that the computations involved with relaxation algorithms are regular and local, and