The choice of the preconditioner is a key factor to accelerate the convergence of eigensolvers for large-size sparse eigenproblems. Although incomplete factorizations with partial fill-in prove generally effective in sequential computations, the efficient preconditioning of parallel eigensolvers is still an open issue. The present paper describes the use of block factorized sparse approximate inverse (BFSAI) preconditioning for the parallel solution of large-size symmetric positive definite eigenproblems with both a simultaneous Rayleigh quotient minimization and the Jacobi\u2013Davidson algorithm. BFSAI coupled with a block diagonal incomplete decomposition proves a robust and efficient parallel preconditioner in a number of test cases ari...
We exploit an optimization method, called deflation-accelerated conjugate gradient (DACG), which seq...
Factorized sparse approximate inverse (FSAI) preconditioners are robust algorithms for symmetric pos...
Block variants of the Jacobi-Davidson method for computing a few extreme eigenpairs of a large spars...
Preconditioning is a key factor to accelerate the convergence of sparse eigensolvers. The present co...
The present paper describes a parallel preconditioned algorithm for the solution of partial eigenval...
The present paper describes a parallel preconditioned algorithm for the solution of partial eigenval...
3A parallel algorithm based on the S-dimensional minimization of the Rayleigh quotient is proposed t...
We exploit an optimization method, called DACG, which sequentially computes the smallest eigenpairs ...
We propose a parallel preconditioner for the Newton method in the computation of the leftmost eigenp...
n this paper we analyze the parallel efficiency of the approximate inverse preconditioners AINV and ...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
Adaptive block factorized sparse approximate inverse (FSAI) (ABF) is a novel al- gebraic preconditio...
3Abstract A parallel algorithm based on the multidimensional minimization of the Rayleigh quotient i...
A preconditioned scheme for solving sparse symmetric eigenproblems is proposed. The solution strateg...
We exploit an optimization method, called deflation-accelerated conjugate gradient (DACG), which seq...
Factorized sparse approximate inverse (FSAI) preconditioners are robust algorithms for symmetric pos...
Block variants of the Jacobi-Davidson method for computing a few extreme eigenpairs of a large spars...
Preconditioning is a key factor to accelerate the convergence of sparse eigensolvers. The present co...
The present paper describes a parallel preconditioned algorithm for the solution of partial eigenval...
The present paper describes a parallel preconditioned algorithm for the solution of partial eigenval...
3A parallel algorithm based on the S-dimensional minimization of the Rayleigh quotient is proposed t...
We exploit an optimization method, called DACG, which sequentially computes the smallest eigenpairs ...
We propose a parallel preconditioner for the Newton method in the computation of the leftmost eigenp...
n this paper we analyze the parallel efficiency of the approximate inverse preconditioners AINV and ...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
Adaptive block factorized sparse approximate inverse (FSAI) (ABF) is a novel al- gebraic preconditio...
3Abstract A parallel algorithm based on the multidimensional minimization of the Rayleigh quotient i...
A preconditioned scheme for solving sparse symmetric eigenproblems is proposed. The solution strateg...
We exploit an optimization method, called deflation-accelerated conjugate gradient (DACG), which seq...
Factorized sparse approximate inverse (FSAI) preconditioners are robust algorithms for symmetric pos...
Block variants of the Jacobi-Davidson method for computing a few extreme eigenpairs of a large spars...