Add to ORKGThe biconjugate gradient (BCG) method is the natural generalization of the classical conjugate gradient algorithm for Hermitian positive definite matrices to general non-Hermitian linear systems. Unfortunately, the original BCG algorithm is susceptible to possible breakdowns and numerical instabilities. Recently, Freund and Nachtigal have proposed a novel BCG type approach, the quasi-minimal residual method (QMR), which overcomes the problems of BCG. Here, an implementation is presented of QMR based on an s-step version of the nonsymmetric look-ahead Lanczos algorithm. The main feature of the s-step Lanczos algorithm is that, in general, all inner products, except for one, can be computed in parallel at the end of each block; this is unlike...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
In the present paper, we introduce a new extension of the conjugate residual (CR) for solving non-He...
The biconjugate gradient (BCG) method is the natural generalization of the classical conjugate gradi...
AbstractIn this paper, we describe the derivation of the biconjugate residual (BCR) method from the ...
The Lanczos algorithm can be used both for eigenvalue problems and to solve linear systems. However,...
this paper, we have presented an implementation of the look-ahead Lanczos algorithm for non-Hermitia...
It is shown how the look-ahead Lanczos process (combined with a quasi-minimal residual QMR) approach...
Starting from a specific implementation of the Lanczos biorthogonalization algorithm, an iterative p...
The Lanczos algorithm is among the most frequently used iterative techniques for computing a few dom...
The authors have proposed a new Krylov subspace iteration, the quasi-minimal residual algorithm (QMR...
For the solution of large sparse systems of linear equations with general non-Hermitian coefficient ...
AbstractThe global bi-conjugate gradient (Gl-BCG) method is an attractive matrix Krylov subspace met...
AbstractThe Conjugate Gradient (CG) method and the Conjugate Residual (CR) method are Krylov subspac...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
In the present paper, we introduce a new extension of the conjugate residual (CR) for solving non-He...
The biconjugate gradient (BCG) method is the natural generalization of the classical conjugate gradi...
AbstractIn this paper, we describe the derivation of the biconjugate residual (BCR) method from the ...
The Lanczos algorithm can be used both for eigenvalue problems and to solve linear systems. However,...
this paper, we have presented an implementation of the look-ahead Lanczos algorithm for non-Hermitia...
It is shown how the look-ahead Lanczos process (combined with a quasi-minimal residual QMR) approach...
Starting from a specific implementation of the Lanczos biorthogonalization algorithm, an iterative p...
The Lanczos algorithm is among the most frequently used iterative techniques for computing a few dom...
The authors have proposed a new Krylov subspace iteration, the quasi-minimal residual algorithm (QMR...
For the solution of large sparse systems of linear equations with general non-Hermitian coefficient ...
AbstractThe global bi-conjugate gradient (Gl-BCG) method is an attractive matrix Krylov subspace met...
AbstractThe Conjugate Gradient (CG) method and the Conjugate Residual (CR) method are Krylov subspac...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
In the present paper, we introduce a new extension of the conjugate residual (CR) for solving non-He...