Many of the currently popular 'block algorithms' are scalar algorithms in which the operations have been grouped and reordered into matrix operations. One genuine block algorithm in practical use is block LU factorization, and this has recently been shown by Demmel and Higham to be unstable in general. It is shown here that block LU factorization is stable if A is block diagonally dominant by columns. Moreover, for a general matrix the level of instability in block LU factorization can be founded in terms of the condition number kappa(A) and the growth factor for Gaussian elimination without pivoting. A consequence is that block LU factorization is stable for a matrix A that is symmetric positive definite or point diagonally dominant by row...
[EN] We propose a reproducible variant of the unblocked LU factorization for graphics processor unit...
International audienceWe present new algorithms to detect and correct errors in the lower-upper fact...
AbstractA new formulation for LU decomposition allows efficient representation of intermediate matri...
Many of the currently popular ‘block algorithms’ are scalar algorithms in which the operations have ...
Block algorithms are becoming increasingly popular in matrix computations. Since their basic unit of...
AbstractBy a block representation of LU factorization for a general matrix introduced by Amodio and ...
AbstractThe existence of block LU factorization without pivoting for complex symmetric block tridiag...
AbstractResults are given concerning the LU factorization of H-matrices, and Gaussian elimination wi...
AbstractIt is showed that if A is I-block diagonally dominant (II-block diagonally dominant), then t...
We present the block LU factorization with panel rank revealing pivoting (block LU_PRRP), a decompos...
International audienceWe present block LU factorization with panel rank revealing pivoting (block LU...
AbstractFor symmetric indefinite tridiagonal matrices, block LDLT factorization without interchanges...
We present block LU factorization with panel rank revealing pivoting (block LU PRRP), a decompositio...
AbstractWe present a necessary and sufficient condition for M-matrices in terms of a special diagona...
International audienceIn this article, we address the problem of reproducibility of the blocked LU f...
[EN] We propose a reproducible variant of the unblocked LU factorization for graphics processor unit...
International audienceWe present new algorithms to detect and correct errors in the lower-upper fact...
AbstractA new formulation for LU decomposition allows efficient representation of intermediate matri...
Many of the currently popular ‘block algorithms’ are scalar algorithms in which the operations have ...
Block algorithms are becoming increasingly popular in matrix computations. Since their basic unit of...
AbstractBy a block representation of LU factorization for a general matrix introduced by Amodio and ...
AbstractThe existence of block LU factorization without pivoting for complex symmetric block tridiag...
AbstractResults are given concerning the LU factorization of H-matrices, and Gaussian elimination wi...
AbstractIt is showed that if A is I-block diagonally dominant (II-block diagonally dominant), then t...
We present the block LU factorization with panel rank revealing pivoting (block LU_PRRP), a decompos...
International audienceWe present block LU factorization with panel rank revealing pivoting (block LU...
AbstractFor symmetric indefinite tridiagonal matrices, block LDLT factorization without interchanges...
We present block LU factorization with panel rank revealing pivoting (block LU PRRP), a decompositio...
AbstractWe present a necessary and sufficient condition for M-matrices in terms of a special diagona...
International audienceIn this article, we address the problem of reproducibility of the blocked LU f...
[EN] We propose a reproducible variant of the unblocked LU factorization for graphics processor unit...
International audienceWe present new algorithms to detect and correct errors in the lower-upper fact...
AbstractA new formulation for LU decomposition allows efficient representation of intermediate matri...