We consider ill-conditioned linear systems $Ax =$ b that are to be solved iteratively, and assume that a low accuracy LU factorization $A \approx \widehat{L}\widehat{U}$ is available for use in a preconditioner. We have observed that for ill-conditioned matrices $A$ arising in practice, $A^{-1}$ tends to be numerically low rank, that is, it has a small number of large singular values. Importantly, the error matrix $E = \widehat{U}^{-1}\widehat{L}^{-1}A - I$ tends to have the same property. To understand this phenomenon we give bounds for the distance from $E$ to a low-rank matrix in terms of the corresponding distance for $A^{-1}$. We then design a novel preconditioner that exploits the low-rank property of the error to accele...
In this paper, we address the problem of preconditioning sequences of large sparse indefinite system...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
We consider ill-conditioned linear systems $Ax =$ b that are to be solved iteratively, and assume t...
We present a new method for the a priori approximation of the orders of magnitude of the entries in ...
AbstractThis paper presents a class of preconditioning techniques which exploit rational function ap...
Iterative refinement is a long-standing technique for improving the accuracy of a computed solution ...
In this chapter, we give a brief overview of a particular class of preconditioners known as incomple...
Factorization based preconditioning algorithms, most notably incomplete LU (ILU) factorization, have...
International audienceWe consider the problem of choosing low-rank factorizations in data sparse mat...
We introduce a novel approach to exploit mixed precision arithmetic for low-rank approximations. Our...
We consider the LU factorization of an $n\times n$ matrix $A$ represented as a block low-rank (BLR) ...
. In this chapter, we give a brief overview of a particular class of preconditioners known as incomp...
International audienceWe consider the LU factorization of an $n\times n$ matrix $A$ represented as a...
Incomplete LU factorization is a valuable preconditioning approach for sparse iterative solvers. An ...
In this paper, we address the problem of preconditioning sequences of large sparse indefinite system...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
We consider ill-conditioned linear systems $Ax =$ b that are to be solved iteratively, and assume t...
We present a new method for the a priori approximation of the orders of magnitude of the entries in ...
AbstractThis paper presents a class of preconditioning techniques which exploit rational function ap...
Iterative refinement is a long-standing technique for improving the accuracy of a computed solution ...
In this chapter, we give a brief overview of a particular class of preconditioners known as incomple...
Factorization based preconditioning algorithms, most notably incomplete LU (ILU) factorization, have...
International audienceWe consider the problem of choosing low-rank factorizations in data sparse mat...
We introduce a novel approach to exploit mixed precision arithmetic for low-rank approximations. Our...
We consider the LU factorization of an $n\times n$ matrix $A$ represented as a block low-rank (BLR) ...
. In this chapter, we give a brief overview of a particular class of preconditioners known as incomp...
International audienceWe consider the LU factorization of an $n\times n$ matrix $A$ represented as a...
Incomplete LU factorization is a valuable preconditioning approach for sparse iterative solvers. An ...
In this paper, we address the problem of preconditioning sequences of large sparse indefinite system...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...