International audienceWe consider the problem of choosing low-rank factorizations in data sparse matrix approximations for preconditioning large-scale symmetric positive definite (SPD) matrices. These approximations are memory-efficient schemes that rely on hierarchical matrix partitioning and compression of certain sub-blocks of the matrix. Typically, these matrix approximations can be constructed very fast, and their matrix product can be applied rapidly as well. The common practice is to express the compressed sub-blocks by low-rank factorizations, and the main contribution of this work is the numerical and spectral analysis of SPD preconditioning schemes represented by $2\times2$ block matrices, whose off-diagonal sub-blocks are low-ran...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
Positive semi-definite matrices commonly occur as normal matrices of least squares problems in stati...
We consider the problem of choosing low-rank factorizations in data sparse matrix approximations for...
The dissertation presents some fast direct solvers and efficient preconditioners mainly for sparse m...
The aim of this survey is to review some recent developments in devising efficient preconditioners f...
International audienceWe consider ill-conditioned linear systems Ax = b that are to be solved iterat...
Factorization based preconditioning algorithms, most notably incomplete LU (ILU) factorization, have...
The use of factorized sparse approximate inverse (FSAI) preconditioners in a standard multilevel fra...
Randomized methods are becoming increasingly popular in numerical linear algebra. However, few attem...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
In this paper we review the technique of hierarchical matrices and put it into the context of black-...
We consider an incomplete Cholesky factorization preconditioner for the iterative solution of large ...
AbstractWe derive simple analytical upper bounds on the spectral condition number associated with th...
We introduce a preconditioner based on a hierarchical low-rank compression scheme of Schur complemen...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
Positive semi-definite matrices commonly occur as normal matrices of least squares problems in stati...
We consider the problem of choosing low-rank factorizations in data sparse matrix approximations for...
The dissertation presents some fast direct solvers and efficient preconditioners mainly for sparse m...
The aim of this survey is to review some recent developments in devising efficient preconditioners f...
International audienceWe consider ill-conditioned linear systems Ax = b that are to be solved iterat...
Factorization based preconditioning algorithms, most notably incomplete LU (ILU) factorization, have...
The use of factorized sparse approximate inverse (FSAI) preconditioners in a standard multilevel fra...
Randomized methods are becoming increasingly popular in numerical linear algebra. However, few attem...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
In this paper we review the technique of hierarchical matrices and put it into the context of black-...
We consider an incomplete Cholesky factorization preconditioner for the iterative solution of large ...
AbstractWe derive simple analytical upper bounds on the spectral condition number associated with th...
We introduce a preconditioner based on a hierarchical low-rank compression scheme of Schur complemen...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
Positive semi-definite matrices commonly occur as normal matrices of least squares problems in stati...