The Biconjugate A-Orthogonal Residual (BiCOR) method carried out in finite precision arithmetic by means of the biconjugate A-orthonormalization procedure may possibly tend to suffer from two sources of numerical instability, known as two kinds of breakdowns, similarly to those of the Biconjugate Gradient (BCG) method. This paper naturally exploits the composite step strategy employed in the development of the composite step BCG (CSBCG) method into the BiCOR method to cure one of the breakdowns called as pivot breakdown. Analogously to the CSBCG method, the resulting interesting variant, with only a minor modification to the usual implementation of the BiCOR method, is able to avoid near pivot breakdowns and compute all the well-defined BiC...
We propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) methods ...
AbstractThe bi-cg method and its variants such as cgs, bi-cgstab, and bi-cgstab2 for solving nonsymm...
. Many iterative methods for solving linear equations Ax = b aim for accurate approximations to x, a...
The Biconjugate A-Orthogonal Residual (BiCOR) method carried out in finite precision arithmetic by m...
The Biconjugate A-Orthogonal Residual (BiCOR) method carried out in finite precision arithmetic by m...
In the present paper, we introduce a new extension of the conjugate residual (CR) method for solving...
An interesting stabilizing variant of the biconjugate A-orthogonal residual (BiCOR) method is invest...
In the present paper, we introduce a new extension of the conjugate residual (CR) for solving non-He...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
AbstractIn this paper, we describe the derivation of the biconjugate residual (BCR) method from the ...
The biconjugate gradient (BCG) method is the natural generalization of the classical conjugate gradi...
AbstractWe propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) ...
In this study, we derive a new iterative algorithm (including its preconditioned version) which is a...
. In this paper we analyze the BiCG algorithm in finite precision arithmetic and suggest reasons for...
AbstractThe Conjugate Gradient (CG) method and the Conjugate Residual (CR) method are Krylov subspac...
We propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) methods ...
AbstractThe bi-cg method and its variants such as cgs, bi-cgstab, and bi-cgstab2 for solving nonsymm...
. Many iterative methods for solving linear equations Ax = b aim for accurate approximations to x, a...
The Biconjugate A-Orthogonal Residual (BiCOR) method carried out in finite precision arithmetic by m...
The Biconjugate A-Orthogonal Residual (BiCOR) method carried out in finite precision arithmetic by m...
In the present paper, we introduce a new extension of the conjugate residual (CR) method for solving...
An interesting stabilizing variant of the biconjugate A-orthogonal residual (BiCOR) method is invest...
In the present paper, we introduce a new extension of the conjugate residual (CR) for solving non-He...
The Biconjugate A-orthogonal residual stabilized method named as BiCORSTAB was proposed by Jing et a...
AbstractIn this paper, we describe the derivation of the biconjugate residual (BCR) method from the ...
The biconjugate gradient (BCG) method is the natural generalization of the classical conjugate gradi...
AbstractWe propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) ...
In this study, we derive a new iterative algorithm (including its preconditioned version) which is a...
. In this paper we analyze the BiCG algorithm in finite precision arithmetic and suggest reasons for...
AbstractThe Conjugate Gradient (CG) method and the Conjugate Residual (CR) method are Krylov subspac...
We propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) methods ...
AbstractThe bi-cg method and its variants such as cgs, bi-cgstab, and bi-cgstab2 for solving nonsymm...
. Many iterative methods for solving linear equations Ax = b aim for accurate approximations to x, a...