AbstractThe relatively robust representations (RRR) algorithm computes the eigendecomposition of a symmetric tridiagonal matrix T with an O(n2) complexity. This article discusses how this method can be extended to the bidiagonal SVD B=UΣVT. It turns out that using the RRR algorithm as a black box to compute BTB=VΣ2VT and BBT=UΣ2UT separately may give poor results for ∥BV−UΣ∥. The use of the standard Jordan–Wielandt representation can fail as well if clusters of tiny singular values are present. A solution is to work on BTB and to keep factorizations of BBT implicitly. We introduce a set of coupling transformations which allow us to replace the representation u=1σBv by a more stable representation u=Xv, where X is a diagonal matrix. Numerica...
We have developed algorithms to count singular values of a bidiagonal matrix which are greater than ...
We present new O(n 3 ) algorithms to compute very accurate SVDs of Cauchy matrices, Vandermonde ma...
AbstractA new bidiagonal reduction method is proposed for X∈Rm×n. For m⩾n, it decomposes X into the ...
AbstractThe relatively robust representations (RRR) algorithm computes the eigendecomposition of a s...
We describe the design and implementation of a new algorithm for computing the singular value decomp...
We show how both the tridiagonal and bidiagonal QR algorithms can be restructured so that they be- ...
AbstractWe present an idea for reducing a rectangular matrix A to bidiagonal form which is based on ...
The orthogonal qd-algorithm is presented to compute the singular value decomposition of a bidiago...
AbstractThe dqds algorithm was introduced in 1994 to compute singular values of bidiagonal matrices ...
The paper discusses the following topics: attractions of the real tridiagonal case, relative eigenva...
International audienceWe study tiled algorithms for going from a " full " matrix to a condensed " ba...
AbstractA Jacobi-type updating algorithm for the SVD or the URV decomposition is developed, which is...
The stable similarity reduction of a nonsymmetric square matrix to tridiagonal form has been a long-...
AbstractLet LDLt be the triangular factorization of an unreduced symmetric tridiagonal matrix T−τI. ...
We consider algorithms for going from a ``full'' matrix to a condensed``band bidiagonal'' form using...
We have developed algorithms to count singular values of a bidiagonal matrix which are greater than ...
We present new O(n 3 ) algorithms to compute very accurate SVDs of Cauchy matrices, Vandermonde ma...
AbstractA new bidiagonal reduction method is proposed for X∈Rm×n. For m⩾n, it decomposes X into the ...
AbstractThe relatively robust representations (RRR) algorithm computes the eigendecomposition of a s...
We describe the design and implementation of a new algorithm for computing the singular value decomp...
We show how both the tridiagonal and bidiagonal QR algorithms can be restructured so that they be- ...
AbstractWe present an idea for reducing a rectangular matrix A to bidiagonal form which is based on ...
The orthogonal qd-algorithm is presented to compute the singular value decomposition of a bidiago...
AbstractThe dqds algorithm was introduced in 1994 to compute singular values of bidiagonal matrices ...
The paper discusses the following topics: attractions of the real tridiagonal case, relative eigenva...
International audienceWe study tiled algorithms for going from a " full " matrix to a condensed " ba...
AbstractA Jacobi-type updating algorithm for the SVD or the URV decomposition is developed, which is...
The stable similarity reduction of a nonsymmetric square matrix to tridiagonal form has been a long-...
AbstractLet LDLt be the triangular factorization of an unreduced symmetric tridiagonal matrix T−τI. ...
We consider algorithms for going from a ``full'' matrix to a condensed``band bidiagonal'' form using...
We have developed algorithms to count singular values of a bidiagonal matrix which are greater than ...
We present new O(n 3 ) algorithms to compute very accurate SVDs of Cauchy matrices, Vandermonde ma...
AbstractA new bidiagonal reduction method is proposed for X∈Rm×n. For m⩾n, it decomposes X into the ...