AbstractLinear least squares problems are commonly solved by QR factorization. When multiple solutions need to be computed with only minor changes in the underlying data, knowledge of the difference between the old data set and the new can be used to update an existing factorization at reduced computational cost. We investigate the viability of implementing QR updating algorithms on GPUs and demonstrate that GPU-based updating for removing columns achieves speed-ups of up to 13.5× compared with full GPU QR factorization. We characterize the conditions under which other types of updates also achieve speed-ups
The LAPACK routines \( \texttt{GEQRT2}\) and \(\texttt{GEQRT3}\) can be used to compute the QR decom...
We present the techniques of adaptive blocking and incremental condition estimation which we believ...
Least squares problems occur in many branches of science. Typically there may be a large number of d...
Linear least squares problems are commonly solved by QR factorization. When multiple solutions need ...
AbstractLinear least squares problems are commonly solved by QR factorization. When multiple solutio...
The least squares problem is an extremely useful device to represent an approximate solution to over...
The least squares problem is an extremely useful device to represent an approximate solution to over...
In a least squares problem we wish to oeffic jjRx f jj22 QR factorizations are computationally expe...
QR decomposition is a computationally intensive linear al-gebra operation that factors a matrix A in...
The processing of digital sound signals often requires the computation of the QR factorization of a ...
Low-rank matrices arise in many scientific and engineering computations. Both computational and stor...
QR factorization is a ubiquitous operation in many engineering and scientific applications. In this ...
QR factorization is a ubiquitous operation in many engineering and scientific applications. In this ...
The QR factorization is one of the most important operations in dense linear algebra, offering a num...
Abstract—The general purpose graphics processing units (GPGPU) are increasingly deployed for scienti...
The LAPACK routines \( \texttt{GEQRT2}\) and \(\texttt{GEQRT3}\) can be used to compute the QR decom...
We present the techniques of adaptive blocking and incremental condition estimation which we believ...
Least squares problems occur in many branches of science. Typically there may be a large number of d...
Linear least squares problems are commonly solved by QR factorization. When multiple solutions need ...
AbstractLinear least squares problems are commonly solved by QR factorization. When multiple solutio...
The least squares problem is an extremely useful device to represent an approximate solution to over...
The least squares problem is an extremely useful device to represent an approximate solution to over...
In a least squares problem we wish to oeffic jjRx f jj22 QR factorizations are computationally expe...
QR decomposition is a computationally intensive linear al-gebra operation that factors a matrix A in...
The processing of digital sound signals often requires the computation of the QR factorization of a ...
Low-rank matrices arise in many scientific and engineering computations. Both computational and stor...
QR factorization is a ubiquitous operation in many engineering and scientific applications. In this ...
QR factorization is a ubiquitous operation in many engineering and scientific applications. In this ...
The QR factorization is one of the most important operations in dense linear algebra, offering a num...
Abstract—The general purpose graphics processing units (GPGPU) are increasingly deployed for scienti...
The LAPACK routines \( \texttt{GEQRT2}\) and \(\texttt{GEQRT3}\) can be used to compute the QR decom...
We present the techniques of adaptive blocking and incremental condition estimation which we believ...
Least squares problems occur in many branches of science. Typically there may be a large number of d...