AbstractTo solve a sparse linear system of equations resulting from the finite element approximation of elliptic self-adjoint second-order boundary-value problems an algebraic multilevel iteration method is presented. The new method can be considered as an extension of methods, which have been defined by Axelsson and Eijkhout (1991) for nine-point matrices and later generalized by Axelsson and Neytcheva (1994) for the Stieltjes matrices, on a more wider class of sparse symmetric positive-definite matrices. The rate of convergence and the computational complexity of the method are analyzed. Experimental results on some standard test problems are presented and discussed
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
A local multilevel product algorithm and its additive version are analyzed for linear systems arisin...
Abstract. We discuss the construction of algebraic multilevel preconditioners for the conjugate grad...
AbstractTo solve a sparse linear system of equations resulting from the finite element approximation...
AbstractA class of new hybrid algebraic multilevel preconditioning methods is presented for solving ...
AbstractA multilevel method for the iterative solution of large sparse linear systems is introduced....
AbstractFor the large-scale system of linear equations with symmetric positive definite block coeffi...
AbstractFor large-scale system of linear equations with symmetric positive definite block coefficien...
This presentation is intended to review the state-of-the-art of iterative methods for solving large ...
In this thesis we consider the problems that arise in computational linear algebra when ...
summary:We propose a new type of multilevel method for solving eigenvalue problems based on Newton's...
A multi-level method for the solution of sparse linear systems is introduced. The definition of the ...
Contains fulltext : 18755.pdf ( ) (Open Access)Report no. 993621 p
In the second edition of this classic monograph, complete with four new chapters and updated referen...
An accelerated simultaneous iteration method is presented for the solution of the generalized eigenp...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
A local multilevel product algorithm and its additive version are analyzed for linear systems arisin...
Abstract. We discuss the construction of algebraic multilevel preconditioners for the conjugate grad...
AbstractTo solve a sparse linear system of equations resulting from the finite element approximation...
AbstractA class of new hybrid algebraic multilevel preconditioning methods is presented for solving ...
AbstractA multilevel method for the iterative solution of large sparse linear systems is introduced....
AbstractFor the large-scale system of linear equations with symmetric positive definite block coeffi...
AbstractFor large-scale system of linear equations with symmetric positive definite block coefficien...
This presentation is intended to review the state-of-the-art of iterative methods for solving large ...
In this thesis we consider the problems that arise in computational linear algebra when ...
summary:We propose a new type of multilevel method for solving eigenvalue problems based on Newton's...
A multi-level method for the solution of sparse linear systems is introduced. The definition of the ...
Contains fulltext : 18755.pdf ( ) (Open Access)Report no. 993621 p
In the second edition of this classic monograph, complete with four new chapters and updated referen...
An accelerated simultaneous iteration method is presented for the solution of the generalized eigenp...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
A local multilevel product algorithm and its additive version are analyzed for linear systems arisin...
Abstract. We discuss the construction of algebraic multilevel preconditioners for the conjugate grad...