A preconditioned scheme for solving sparse symmetric eigenproblems is proposed. The solution strategy relies upon the DACG algorithm, which is a Preconditioned Conjugate Gradient algorithm for minimizing the Rayleigh Quotient. A comparison with the well established ARPACK code shows that when a small number of the leftmost eigenpairs is to be computed, DACG is more efficient than ARPACK. Effective convergence acceleration of DACG is shown to be performed by a suitable approximate inverse preconditioner (AINV). The performance of such a preconditioner is shown to be safe, i.e. not highly dependent on a drop tolerance parameter. On sequential machines, AINV preconditioning proves a practicable alternative to the effective incomplete Cholesky ...
A new metod (NI-DACG) for the partial eigensolution of large sparse symmetric FE eigenproblems is pr...
A preconditioned simultaneous iteration method is described for the solution of the generalized eige...
This paper is concerned with a new approach to preconditioning for large, sparse linear systems. A p...
We exploit an optimization method, called DACG, which sequentially computes the smallest eigenpairs ...
n this paper we analyze the parallel efficiency of the approximate inverse preconditioners AINV and ...
We exploit an optimization method, called deflation-accelerated conjugate gradient (DACG), which seq...
A preconditioned scheme, DACG, is proposed for compute in parallel the leftmost eigenpairs of the ge...
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...
An efficient parallel approach for the computation of the eigenvalue of smallest absolute magnitude ...
Abstract A parallel algorithm based on the multidimensional minimization of the Rayleigh quotient is...
A parallel algorithm based on the S-dimensional minimization of the Rayleigh quotient is proposed to...
We exploit an optimization method, called DACG, which sequentially computes the smallest eigenpairs...
The choice of the preconditioner is a key factor to accelerate the convergence of eigensolvers for l...
The efficient parallel solution to large sparse linear systems of equations Ax = b is a central issu...
A new metod (NI-DACG) for the partial eigensolution of large sparse symmetric FE eigenproblems is pr...
A preconditioned simultaneous iteration method is described for the solution of the generalized eige...
This paper is concerned with a new approach to preconditioning for large, sparse linear systems. A p...
We exploit an optimization method, called DACG, which sequentially computes the smallest eigenpairs ...
n this paper we analyze the parallel efficiency of the approximate inverse preconditioners AINV and ...
We exploit an optimization method, called deflation-accelerated conjugate gradient (DACG), which seq...
A preconditioned scheme, DACG, is proposed for compute in parallel the leftmost eigenpairs of the ge...
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...
An efficient parallel approach for the computation of the eigenvalue of smallest absolute magnitude ...
Abstract A parallel algorithm based on the multidimensional minimization of the Rayleigh quotient is...
A parallel algorithm based on the S-dimensional minimization of the Rayleigh quotient is proposed to...
We exploit an optimization method, called DACG, which sequentially computes the smallest eigenpairs...
The choice of the preconditioner is a key factor to accelerate the convergence of eigensolvers for l...
The efficient parallel solution to large sparse linear systems of equations Ax = b is a central issu...
A new metod (NI-DACG) for the partial eigensolution of large sparse symmetric FE eigenproblems is pr...
A preconditioned simultaneous iteration method is described for the solution of the generalized eige...
This paper is concerned with a new approach to preconditioning for large, sparse linear systems. A p...