Block algorithms are becoming increasingly popular in matrix computations. Since their basic unit of data is a submatrix rather than a scalar they have a higher level of granularity than point algorithms, and this makes them well-suited to high-performance computers. The numerical stability of the block algorithms in the new linear algebra program library LAPACK is investigated here. It is shown that these algorithms have backward error analyses in which the backward error bounds are commensurate with the error bounds for the underlying level 3 BLAS (BLAS3). One implication is that the block algorithms are as stable as the corresponding point algorithms when conventional BLAS3 are used. A second implication is that the use of BLAS3 base...
The effects of rounding errors on algorithms in numerical linear algebra have been much-studied for ...
We consider the problem of computing a scaling α such that the solution x of the scaled linear syste...
We introduce a new family of strong linearizations of matrix polynomials---which we call "block Kron...
The Level 3 BLAS (BLAS3) are a set of specifications of FORTRAN 77 subprograms for carrying out matr...
Many of the currently popular 'block algorithms' are scalar algorithms in which the operations have ...
Many of the currently popular ‘block algorithms’ are scalar algorithms in which the operations have ...
The Level 3 BLAS (BLAS3) are a set of specifications of Fortran 77 subprograms for carrying out mat...
The advent of supercomputers with hierarchical memory systems has imposed the use of block algorithm...
The goal of the LAPACK project is to provide efficient and portable software for dense numerical lin...
Fast algorithms for matrix multiplication, namely those that perform asymptotically fewer scalar ope...
AbstractBy a block representation of LU factorization for a general matrix introduced by Amodio and ...
International audienceIn this article, we address the problem of reproducibility of the blocked LU f...
We present the design and testing of an algorithm for iterative refinement of the solution of linear...
Abstract. We survey the numerical stability of some fast algorithms for solving systems of linear eq...
The largest dense linear systems that are being solved today are of order $n = 10^7$. Single precis...
The effects of rounding errors on algorithms in numerical linear algebra have been much-studied for ...
We consider the problem of computing a scaling α such that the solution x of the scaled linear syste...
We introduce a new family of strong linearizations of matrix polynomials---which we call "block Kron...
The Level 3 BLAS (BLAS3) are a set of specifications of FORTRAN 77 subprograms for carrying out matr...
Many of the currently popular 'block algorithms' are scalar algorithms in which the operations have ...
Many of the currently popular ‘block algorithms’ are scalar algorithms in which the operations have ...
The Level 3 BLAS (BLAS3) are a set of specifications of Fortran 77 subprograms for carrying out mat...
The advent of supercomputers with hierarchical memory systems has imposed the use of block algorithm...
The goal of the LAPACK project is to provide efficient and portable software for dense numerical lin...
Fast algorithms for matrix multiplication, namely those that perform asymptotically fewer scalar ope...
AbstractBy a block representation of LU factorization for a general matrix introduced by Amodio and ...
International audienceIn this article, we address the problem of reproducibility of the blocked LU f...
We present the design and testing of an algorithm for iterative refinement of the solution of linear...
Abstract. We survey the numerical stability of some fast algorithms for solving systems of linear eq...
The largest dense linear systems that are being solved today are of order $n = 10^7$. Single precis...
The effects of rounding errors on algorithms in numerical linear algebra have been much-studied for ...
We consider the problem of computing a scaling α such that the solution x of the scaled linear syste...
We introduce a new family of strong linearizations of matrix polynomials---which we call "block Kron...