International audienceIn this article, a two-stage iterative algorithm is proposed to improve the convergence of Krylov based iterative methods, typically those of GMRES variants. The principle of the proposed approach is to build an external iteration over the Krylov method, and to frequently store its current residual (at each GMRES restart for instance). After a given number of outer iterations, a least-squares minimization step is applied on the matrix composed by the saved residuals, in order to compute a better solution and to make new iterations if required. It is proven that the proposal has the same convergence properties than the inner embedded method itself. Experiments using up to 16,394 cores also show that the proposed algorit...
In this paper we compare two recently proposed methods, FGMRES [5] and GMRESR [7], for the iterative...
Consider solving a sequence of linear systems A_{(i)}x^{(i)}=b^{(i)}, i=1, 2, ... where A₍ᵢ₎ ϵℂⁿᵡⁿ ...
Introduction One of the fundamental task of numerical computing is the ability to solve linear syst...
International audienceIn this paper, a two-stage iterative algorithm is proposed to improve the conv...
The Generalized Minimum Residual (GMRES) iterative method and variations of it are frequently used f...
We present an iterative method for solving linear systems, which has the property ofminimizing at ev...
International audienceKrylov methods such as GMRES are efficient iterative methods to solve large sp...
International audienceKrylov subspace methods are commonly used iterative methods for solving large ...
In a wide range of applications, solving the linear system of equations Ax = b is appeared. One of t...
AbstractThere are verities of useful Krylov subspace methods to solve nonsymmetric linear system of ...
AbstractRecently the GMRESR method for the solution of linear systems of equations has been introduc...
The GMRES(m) method is often used to compute Krylov subspace solutions of large sparse linear system...
Abstract. An iterative method LSMR is presented for solving linear systems Ax = b and least-squares ...
In this chapter we will present an overview of a number of related iterative methods for the solutio...
International audienceIn this paper, we revisit the Krylov multisplitting algorithm presented in Hua...
In this paper we compare two recently proposed methods, FGMRES [5] and GMRESR [7], for the iterative...
Consider solving a sequence of linear systems A_{(i)}x^{(i)}=b^{(i)}, i=1, 2, ... where A₍ᵢ₎ ϵℂⁿᵡⁿ ...
Introduction One of the fundamental task of numerical computing is the ability to solve linear syst...
International audienceIn this paper, a two-stage iterative algorithm is proposed to improve the conv...
The Generalized Minimum Residual (GMRES) iterative method and variations of it are frequently used f...
We present an iterative method for solving linear systems, which has the property ofminimizing at ev...
International audienceKrylov methods such as GMRES are efficient iterative methods to solve large sp...
International audienceKrylov subspace methods are commonly used iterative methods for solving large ...
In a wide range of applications, solving the linear system of equations Ax = b is appeared. One of t...
AbstractThere are verities of useful Krylov subspace methods to solve nonsymmetric linear system of ...
AbstractRecently the GMRESR method for the solution of linear systems of equations has been introduc...
The GMRES(m) method is often used to compute Krylov subspace solutions of large sparse linear system...
Abstract. An iterative method LSMR is presented for solving linear systems Ax = b and least-squares ...
In this chapter we will present an overview of a number of related iterative methods for the solutio...
International audienceIn this paper, we revisit the Krylov multisplitting algorithm presented in Hua...
In this paper we compare two recently proposed methods, FGMRES [5] and GMRESR [7], for the iterative...
Consider solving a sequence of linear systems A_{(i)}x^{(i)}=b^{(i)}, i=1, 2, ... where A₍ᵢ₎ ϵℂⁿᵡⁿ ...
Introduction One of the fundamental task of numerical computing is the ability to solve linear syst...