arallel strategies based on Givens rotations are proposed for updating the QR decomposition of an n × n matrix after a rank-k change (k < n). The complexity analyses of the Givens algorithms are based on the total number of Givens rotations applied to a 2-element vector. The algorithms, which are extensions of the rank-1 updating method, achieve the updating using approximately 2(k + n) compound disjoint Givens rotations (CDGRs) with elements annihilated by rotations in adjacent planes. Block generalization of the serial rank-1 algorithms are also presented. The algorithms are rich in level 3 BLAS operations, making them suitable for implementation on large scale parallel systems. The performance of some of the algorithms on a 2-D SIMD (sin...
The fixed-point hardware architecture of the QR decomposition is constrained by a several issues tha...
A Jacobi-type updating algorithm for the SVD or URV decomposition is developed, which is related to ...
AbstractIn an earlier paper we introduced the classes of polynomial and rank structures, both of the...
Parallel strategies are proposed for updating the QR decomposition of an m × n matrix after adding k...
n this paper we propose new stable parallel algorithms based on Householder transformations and comp...
Abstract A Greedy Givens algorithm for computing the rank-1 updating of the QR decomposition is prop...
This manuscript focuses on the development of a parallel QR-factorization of structured rank matrice...
QR decomposition (QRD) is a widely used Numerical Linear Algebra (NLA) kernel with applications rang...
This paper introduces an algorithm for computing a QR decomposition of a polynomial matrix. The algo...
We show how both the tridiagonal and bidiagonal QR algorithms can be restructured so that they be- ...
Given an $m \times n$ matrix M with $m \geqslant n$, it is shown that there exists a permutation $\P...
We present a parallel algorithm for the QR factorization with column pivoting of a sparse matrix by ...
A novel algorithm for calculating the QR decomposition (QRD) of polynomial matrix is proposed. The a...
Computationally efficient parallel algorithms for downdating the least squares estimator of the ordi...
This article describes a suite of codes as well as associated testing and timing drivers for computi...
The fixed-point hardware architecture of the QR decomposition is constrained by a several issues tha...
A Jacobi-type updating algorithm for the SVD or URV decomposition is developed, which is related to ...
AbstractIn an earlier paper we introduced the classes of polynomial and rank structures, both of the...
Parallel strategies are proposed for updating the QR decomposition of an m × n matrix after adding k...
n this paper we propose new stable parallel algorithms based on Householder transformations and comp...
Abstract A Greedy Givens algorithm for computing the rank-1 updating of the QR decomposition is prop...
This manuscript focuses on the development of a parallel QR-factorization of structured rank matrice...
QR decomposition (QRD) is a widely used Numerical Linear Algebra (NLA) kernel with applications rang...
This paper introduces an algorithm for computing a QR decomposition of a polynomial matrix. The algo...
We show how both the tridiagonal and bidiagonal QR algorithms can be restructured so that they be- ...
Given an $m \times n$ matrix M with $m \geqslant n$, it is shown that there exists a permutation $\P...
We present a parallel algorithm for the QR factorization with column pivoting of a sparse matrix by ...
A novel algorithm for calculating the QR decomposition (QRD) of polynomial matrix is proposed. The a...
Computationally efficient parallel algorithms for downdating the least squares estimator of the ordi...
This article describes a suite of codes as well as associated testing and timing drivers for computi...
The fixed-point hardware architecture of the QR decomposition is constrained by a several issues tha...
A Jacobi-type updating algorithm for the SVD or URV decomposition is developed, which is related to ...
AbstractIn an earlier paper we introduced the classes of polynomial and rank structures, both of the...