A self-correcting matrix iteration for the Moore-Penrose generalized inverse
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Publication:1923224
DOI10.1016/0024-3795(94)00306-8zbMath0856.65039OpenAlexW2023713450MaRDI QIDQ1923224
Publication date: 24 February 1997
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0024-3795(94)00306-8
Related Items (5)
Generalized Schultz iterative methods for the computation of outer inverses ⋮ A Grassmann integral equation ⋮ Iterative method for computing the Moore-Penrose inverse based on Penrose equations ⋮ Scalar correction method for finding least-squares solutions on Hilbert spaces and its applications ⋮ A note on the stability of a \(p\)th order iteration for finding generalized inverses
Cites Work
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- On the acceleration of Kaczmarz's method for inconsistent linear systems
- Iterative refinement of approximations to a generalized inverse of a matrix
- Neumann-type expansion of reflexive generalized inverses of a matrix and the hyperpower iterative method
- An Improved Newton Iteration for the Generalized Inverse of a Matrix, with Applications
- Scaling for Numerical Stability in Gaussian Elimination
- Anwendung des Schulz‐Verfahrens zur Nachkorrektur einer näherungsweise berechneten verallgemeinerten Inversen einer Matrix
- An Iterative Method for Computing the Generalized Inverse of an Arbitrary Matrix
- A Note on an Iterative Method for Generalized Inversion of Matrices
- On Iterative Computation of Generalized Inverses and Associated Projections
- On the Numerical Properties of an Iterative Method for Computing the Moore–Penrose Generalized Inverse
- Contributions to the Theory of Generalized Inverses
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