This paper presents multigrid (MG) techniques for nonlinear eigenvalue problems (EP) and emphasizes an MG algorithm for a nonlinear Schrodinger EP. The algorithm overcomes the mentioned difficulties combining the following techniques: an MG projection coupled with backrotations for separation of solutions and treatment of difficulties related to clusters of close and equal eigenvalues; MG subspace continuation techniques for treatment of the nonlinearity; an MG simultaneous treatment of the eigenvectors at the same time with the nonlinearity and with the global constraints. The simultaneous MG techniques reduce the large number of self consistent iterations to only a few or one MG simultaneous iteration and keep the solutions in a right nei...
AbstractThis paper gives an overview for the method of subspace corrections. The method is first mot...
The separation of vectors by multigrid (MG) algorithms is applied to the study of convergence and to...
AbstractWe present a new implementation of the two-grid method for computing extremum eigenpairs of ...
What is common among electronic structure calculation, design of MEMS devices, vibrational analysis ...
Recently the direct application of a multigrid technique for computing the smallest eigenvalue and i...
Three multigrid algorithms are described that can solve the symmetric generalized eigenvalue problem...
The problem of calculating the stability of steady state solutions of differential equations is trea...
The periods of the theorem for the algebraic multigrid projection (MGP) for eigenvalue problems, and...
Classical relaxation techniques are related to numerical methods for solution of ordinary differenti...
We combine the multigrid (MG) method with state-of-the-art concepts from the variational formulation...
We investigate multi-grid methods for solving linear systems arising from arc-length continuation te...
Multigrid methods can be formulated as an algorithm for an abstract problem that is independent of t...
Inhaltsverzeichnis 1.Einleitung1 2.Vorüberlegungen 2.1 Problemstellung 4 2.2 Variationsformu...
Eigenproblems and their nonlinear generalizations appear as important problems in a wide variety of ...
ABSTRACT. Multigrid techniques can successfully be applied to mesh eigenvalue prob-lems for elliptic...
AbstractThis paper gives an overview for the method of subspace corrections. The method is first mot...
The separation of vectors by multigrid (MG) algorithms is applied to the study of convergence and to...
AbstractWe present a new implementation of the two-grid method for computing extremum eigenpairs of ...
What is common among electronic structure calculation, design of MEMS devices, vibrational analysis ...
Recently the direct application of a multigrid technique for computing the smallest eigenvalue and i...
Three multigrid algorithms are described that can solve the symmetric generalized eigenvalue problem...
The problem of calculating the stability of steady state solutions of differential equations is trea...
The periods of the theorem for the algebraic multigrid projection (MGP) for eigenvalue problems, and...
Classical relaxation techniques are related to numerical methods for solution of ordinary differenti...
We combine the multigrid (MG) method with state-of-the-art concepts from the variational formulation...
We investigate multi-grid methods for solving linear systems arising from arc-length continuation te...
Multigrid methods can be formulated as an algorithm for an abstract problem that is independent of t...
Inhaltsverzeichnis 1.Einleitung1 2.Vorüberlegungen 2.1 Problemstellung 4 2.2 Variationsformu...
Eigenproblems and their nonlinear generalizations appear as important problems in a wide variety of ...
ABSTRACT. Multigrid techniques can successfully be applied to mesh eigenvalue prob-lems for elliptic...
AbstractThis paper gives an overview for the method of subspace corrections. The method is first mot...
The separation of vectors by multigrid (MG) algorithms is applied to the study of convergence and to...
AbstractWe present a new implementation of the two-grid method for computing extremum eigenpairs of ...