The use of factorized sparse approximate inverse (FSAI) preconditioners in a standard multilevel framework for symmetric positive definite (SPD) matrices may pose a number of issues as to the definiteness of the Schur complement at each level. The present work introduces a robust multilevel approach for SPD problems based on FSAI preconditioning, which eliminates the chance of algorithmic breakdowns independently of the preconditioner sparsity. The multilevel FSAI algorithm is further enhanced by introducing descending and ascending low-rank corrections, thus giving rise to the multilevel FSAI with low-rank corrections (MFLR) preconditioner. The proposed algorithm is investigated in a number of test problems. The numerical results show that...
International audienceWe consider the problem of choosing low-rank factorizations in data sparse mat...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
An adaptive algorithm is presented to generate automatically the nonzero pattern of the block factor...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
Factorized sparse approximate inverse (FSAI) preconditioners are robust algorithms for symmetric pos...
AbstractKrylov methods preconditioned by Factorized Sparse Approximate Inverses (FSAI) are an effici...
The Factorized Sparse Approximate Inverse (FSAI) is an efficient technique for preconditioning paral...
The numerical simulations of real-world engineering problems create models with several millions or ...
The numerical simulation of modern engineering problems can easily incorporate millions or even bill...
The efficient solution to nonsymmetric linear systems is still an open issue, especially on parallel...
The efficient solution to non-symmetric linear systems is still an open issue on parallel computers....
Krylov methods preconditioned by Factorized Sparse Approximate Inverses (FSAI) are an efficient appr...
Adaptive block factorized sparse approximate inverse (FSAI) (ABF) is a novel al- gebraic preconditio...
In this paper we consider the problem of preconditioning symmetric positive definite matrices of th...
Randomized methods are becoming increasingly popular in numerical linear algebra. However, few attem...
International audienceWe consider the problem of choosing low-rank factorizations in data sparse mat...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
An adaptive algorithm is presented to generate automatically the nonzero pattern of the block factor...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
Factorized sparse approximate inverse (FSAI) preconditioners are robust algorithms for symmetric pos...
AbstractKrylov methods preconditioned by Factorized Sparse Approximate Inverses (FSAI) are an effici...
The Factorized Sparse Approximate Inverse (FSAI) is an efficient technique for preconditioning paral...
The numerical simulations of real-world engineering problems create models with several millions or ...
The numerical simulation of modern engineering problems can easily incorporate millions or even bill...
The efficient solution to nonsymmetric linear systems is still an open issue, especially on parallel...
The efficient solution to non-symmetric linear systems is still an open issue on parallel computers....
Krylov methods preconditioned by Factorized Sparse Approximate Inverses (FSAI) are an efficient appr...
Adaptive block factorized sparse approximate inverse (FSAI) (ABF) is a novel al- gebraic preconditio...
In this paper we consider the problem of preconditioning symmetric positive definite matrices of th...
Randomized methods are becoming increasingly popular in numerical linear algebra. However, few attem...
International audienceWe consider the problem of choosing low-rank factorizations in data sparse mat...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
An adaptive algorithm is presented to generate automatically the nonzero pattern of the block factor...