A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a generalized factored sparse approximate inverse (FSAI) with an incomplete LU (ILU) factorization. The generalized FSAI, called block FSAI, is derived by requiring the preconditioned matrix to resemble a block-diagonal matrix in the sense of the minimal Frobenius norm. An incomplete block Jacobi algorithm is then effectively used to accelerate the convergence of a Krylov subspace method. The block FSAI-ILU preconditioner proves superior to both FSAI and the incomplete block Jacobi by themselves in a number of realistic finite element test cases and is fully scalable for a given number of blocks
The Factorized Sparse Approximate Inverse (FSAI) is an efficient technique for preconditioning paral...
We describe a novel technique for computing a sparse incomplete factorization of a general symmetric...
The present paper describes a parallel preconditioned algorithm for the solution of partial eigenval...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
The efficient solution to nonsymmetric linear systems is still an open issue, especially on parallel...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
Adaptive block factorized sparse approximate inverse (FSAI) (ABF) is a novel al- gebraic preconditio...
The efficient solution to non-symmetric linear systems is still an open issue on parallel computers....
Factorized sparse approximate inverse (FSAI) preconditioners are robust algorithms for symmetric pos...
Krylov methods preconditioned by Factorized Sparse Approximate Inverses (FSAI) are an efficient appr...
An adaptive algorithm is presented to generate automatically the nonzero pattern of the block factor...
Preconditioning is a key factor to accelerate the convergence of sparse eigensolvers. The present co...
The choice of the preconditioner is a key factor to accelerate the convergence of eigensolvers for l...
The use of factorized sparse approximate inverse (FSAI) preconditioners in a standard multilevel fra...
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...
We describe a novel technique for computing a sparse incomplete factorization of a general symmetric...
The present paper describes a parallel preconditioned algorithm for the solution of partial eigenval...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
The efficient solution to nonsymmetric linear systems is still an open issue, especially on parallel...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
Adaptive block factorized sparse approximate inverse (FSAI) (ABF) is a novel al- gebraic preconditio...
The efficient solution to non-symmetric linear systems is still an open issue on parallel computers....
Factorized sparse approximate inverse (FSAI) preconditioners are robust algorithms for symmetric pos...
Krylov methods preconditioned by Factorized Sparse Approximate Inverses (FSAI) are an efficient appr...
An adaptive algorithm is presented to generate automatically the nonzero pattern of the block factor...
Preconditioning is a key factor to accelerate the convergence of sparse eigensolvers. The present co...
The choice of the preconditioner is a key factor to accelerate the convergence of eigensolvers for l...
The use of factorized sparse approximate inverse (FSAI) preconditioners in a standard multilevel fra...
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...
We describe a novel technique for computing a sparse incomplete factorization of a general symmetric...
The present paper describes a parallel preconditioned algorithm for the solution of partial eigenval...