Add to ORKGWe propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) methods (referred to as the hybrid BiCR variants) for solving linear systems with nonsymmetric coefficient matrices. The recurrence formulas used to update an approximation and a residual vector are the same as those used in the corresponding hybrid BiCG method, but the recurrence coefficients are different; they are determined so as to compute the coefficients of the residual polynomial of BiCR. From our experience it appears that the hybrid BiCR variants often converge faster than their BiCG counterpart. Numerical experiments show that our proposed hybrid BiCR variants are more effective and less affected by rounding errors. The factor in the loss ...
AbstractIn this paper, we describe the derivation of the biconjugate residual (BCR) method from the ...
In this study, we derive a new iterative algorithm (including its preconditioned version) which is a...
. Many iterative methods for solving linear equations Ax = b aim for accurate approximations to x, a...
We propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) methods ...
AbstractWe propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) ...
AbstractThe Conjugate Gradient (CG) method and the Conjugate Residual (CR) method are Krylov subspac...
In the present paper, we introduce a new extension of the conjugate residual (CR) method for solving...
In the past few years new methods have been proposed that can be seen as combinations of standard Kr...
In the present paper, we introduce a new extension of the conjugate residual (CR) method for solving...
. In this paper we analyze the BiCG algorithm in finite precision arithmetic and suggest reasons for...
The Induced Dimension Reduction(s) (IDR(s)) method has recently been developed. Sleijpen et al. have...
. The Conjugate Gradient Squared (CGS) is a well-known and widely used iterative method for solving ...
Any residual polynomial of hybrid Bi-Conjugate Gradient (Bi-CG) methods, as Bi-CG STABilized (Bi-CGS...
The Biconjugate A-Orthogonal Residual (BiCOR) method carried out in finite precision arithmetic by m...
Abstract For solving non-Hermitian linear systems, a famous method is Bi-Conjugate Gradient method (...
AbstractIn this paper, we describe the derivation of the biconjugate residual (BCR) method from the ...
In this study, we derive a new iterative algorithm (including its preconditioned version) which is a...
. Many iterative methods for solving linear equations Ax = b aim for accurate approximations to x, a...
We propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) methods ...
AbstractWe propose Bi-Conjugate Residual (BiCR) variants of the hybrid Bi-Conjugate Gradient (BiCG) ...
AbstractThe Conjugate Gradient (CG) method and the Conjugate Residual (CR) method are Krylov subspac...
In the present paper, we introduce a new extension of the conjugate residual (CR) method for solving...
In the past few years new methods have been proposed that can be seen as combinations of standard Kr...
In the present paper, we introduce a new extension of the conjugate residual (CR) method for solving...
. In this paper we analyze the BiCG algorithm in finite precision arithmetic and suggest reasons for...
The Induced Dimension Reduction(s) (IDR(s)) method has recently been developed. Sleijpen et al. have...
. The Conjugate Gradient Squared (CGS) is a well-known and widely used iterative method for solving ...
Any residual polynomial of hybrid Bi-Conjugate Gradient (Bi-CG) methods, as Bi-CG STABilized (Bi-CGS...
The Biconjugate A-Orthogonal Residual (BiCOR) method carried out in finite precision arithmetic by m...
Abstract For solving non-Hermitian linear systems, a famous method is Bi-Conjugate Gradient method (...
AbstractIn this paper, we describe the derivation of the biconjugate residual (BCR) method from the ...
In this study, we derive a new iterative algorithm (including its preconditioned version) which is a...
. Many iterative methods for solving linear equations Ax = b aim for accurate approximations to x, a...