Using dual techniques to derive componentwise and mixed condition numbers for a linear function of a linear least squares solution

Baboulin, Marc; Gratton, Serge

doi:10.1007/s10543-009-0213-4

Cited by 24 publications

(34 citation statements)

References 25 publications

(27 reference statements)

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“…Similarly, for linear operators from G to E, the norm induced from the dual norms · E * and · G * , is denoted by · G * ,E * . For the adjoint operators and dual norms, we have the following result [3]:…”

Section: Definitionmentioning

confidence: 99%

“…Let v * be the dual norm of v and satisfy the usual inner product on R p , we are interested in the dual norm · v * of the product norm · v which satisfies the scalar product in E. The following result can be found in [3].…”

Section: Definitionmentioning

confidence: 99%

“…In particular, for the full rank linear least squares problem, [14] and [2] present the condition number when the perturbations in both the data and solution are measured by norms. In [3], the perturbation in the data is componentwise, whereas the perturbation in the solution can be either componentwise or normwise, leading to componentwise or mixed condition numbers.…”

Section: Introductionmentioning

confidence: 99%

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A condition analysis of the weighted linear least squares problem using dual norms

Diao

Liang

Qiao

2017

Linear and Multilinear Algebra

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In this paper, based on the theory of adjoint operators and dual norms, we define condition numbers for a linear solution function of the weighted linear least squares problem. The explicit expressions of the normwise and componentwise condition numbers derived in this paper can be computed at low cost when the dimension of the linear function is low due to dual operator theory. Moreover, we use the augmented system to perform a componentwise perturbation analysis of the solution and residual of the weighted linear least squares problems. We also propose two efficient condition number estimators. Our numerical experiments demonstrate that our condition numbers give accurate perturbation bounds and can reveal the conditioning of individual components of the solution. Our condition number estimators are accurate as well as efficient.

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Section: Definitionmentioning

confidence: 99%

Section: Definitionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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A condition analysis of the weighted linear least squares problem using dual norms

Diao

Liang

Qiao

2017

Linear and Multilinear Algebra

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“…Let

Ā MathClass-rel= A MathClass-bin+ Δ A MathClass-rel\in {double-struckR}^{m MathClass-bin\times n}

be a matrix perturbed from A . Pursuing an upper bound for

MathClass-rel∥ Ā^{MathClass-bin†} MathClass-rel∥

plays a significant role in investigating the perturbation behavior of linear least squares problems .…”

Section: Introductionmentioning

confidence: 99%

“…Let N A D A C A 2 R m n be a matrix perturbed from A. Pursuing an upper bound for k N A k plays a significant role in investigating the perturbation behavior of linear least squares problems [1,2,[4][5][6][7][8][9][10].…”

Section: Introductionmentioning

confidence: 99%

A note on stable perturbations of Moore–Penrose inverses

Zhao

Wei

2011

Numerical Linear Algebra App

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On condition numbers for Moore–Penrose inverse and linear least squares problem involving Kronecker products

Diao

Wang

Wei

et al. 2012

Numerical Linear Algebra App

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SUMMARYIn this paper, we investigate the normwise, mixed, and componentwise condition numbers and their upper bounds for the Moore-Penrose inverse of the Kronecker product and more general matrix function compositions involving Kronecker products. We also present the condition numbers and their upper bounds for the associated Kronecker product linear least squares solution with full column rank. In practice, the derived upper bounds for the mixed and componentwise condition numbers for Kronecker product linear least squares solution can be efficiently estimated using the Hager-Higham Algorithm.

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Using dual techniques to derive componentwise and mixed condition numbers for a linear function of a linear least squares solution

Cited by 24 publications

References 25 publications

A condition analysis of the weighted linear least squares problem using dual norms

A condition analysis of the weighted linear least squares problem using dual norms

A note on stable perturbations of Moore–Penrose inverses

On condition numbers for Moore–Penrose inverse and linear least squares problem involving Kronecker products

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