An error complexity analysis of two algorithms for solving a unit-diagonal triangular system is given. The results show that the unusual sequential algorithm is optimal in terms of having the minimal maximum and cumulative error complexity measures. The parallel algorithm described by Sameh and Brent is shown to be essentially equivalent to the optimal sequential one. Some numerical experiments are also taught
We consider the problem of computing a scaling α such that the solution x of the scaled linear syste...
AbstractOur new sequential and parallel algorithms establish new record upper bounds on both arithme...
Large-scale applications and software systems are getting increasingly complex. To deal with this co...
Several parallel algorithms have been proposed for the solution of triangular systems. The stability...
A few parallel algorithms for solving triangular systems resulting from parallel factorization of sp...
International audienceOn modern parallel architectures, floating-point computations may become non-d...
AbstractThis paper explores the problem of solving triangular linear systems on parallel distributed...
[[abstract]]A fast parallel algorithm, which is generalized from the parallel algorithms for solving...
International audience-point computations are not deterministic on parallel environments.Therefore, ...
Matrix L is lower triangular if all entries above its main diagonal are zero, `ij = 0 for i < j M...
The Parallel Diagonal Dominant (PDD) algorithm is a highly efficient, ideally scalable tridiagonal s...
Abstract. A parallel algorithm is presented for triangular system solving on a distributed-memory MI...
AbstractAn error complexity analysis of a parallel LU decomposition algorithm is given. The results ...
In this paper, the numerical aspects of some methods for the solution of bidiagonal systems are anal...
Efficient triangular solvers for use on message passing multiprocessors are required, in several co...
We consider the problem of computing a scaling α such that the solution x of the scaled linear syste...
AbstractOur new sequential and parallel algorithms establish new record upper bounds on both arithme...
Large-scale applications and software systems are getting increasingly complex. To deal with this co...
Several parallel algorithms have been proposed for the solution of triangular systems. The stability...
A few parallel algorithms for solving triangular systems resulting from parallel factorization of sp...
International audienceOn modern parallel architectures, floating-point computations may become non-d...
AbstractThis paper explores the problem of solving triangular linear systems on parallel distributed...
[[abstract]]A fast parallel algorithm, which is generalized from the parallel algorithms for solving...
International audience-point computations are not deterministic on parallel environments.Therefore, ...
Matrix L is lower triangular if all entries above its main diagonal are zero, `ij = 0 for i < j M...
The Parallel Diagonal Dominant (PDD) algorithm is a highly efficient, ideally scalable tridiagonal s...
Abstract. A parallel algorithm is presented for triangular system solving on a distributed-memory MI...
AbstractAn error complexity analysis of a parallel LU decomposition algorithm is given. The results ...
In this paper, the numerical aspects of some methods for the solution of bidiagonal systems are anal...
Efficient triangular solvers for use on message passing multiprocessors are required, in several co...
We consider the problem of computing a scaling α such that the solution x of the scaled linear syste...
AbstractOur new sequential and parallel algorithms establish new record upper bounds on both arithme...
Large-scale applications and software systems are getting increasingly complex. To deal with this co...