The representations and computations of generalized inverses \(A^{(1)}_{T,S}\), \(A^{(1,2)}_{T,S}\) and the group inverse
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Publication:1697272
DOI10.1007/s10092-017-0222-7zbMath1385.65033OpenAlexW2604694588MaRDI QIDQ1697272
Publication date: 15 February 2018
Published in: Calcolo (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10092-017-0222-7
Numerical solutions to overdetermined systems, pseudoinverses (65F20) Theory of matrix inversion and generalized inverses (15A09) Complexity and performance of numerical algorithms (65Y20) Direct numerical methods for linear systems and matrix inversion (65F05)
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Cites Work
- Gauss-Jordan elimination methods for the Moore-Penrose inverse of a matrix
- On integral representation of the generalized inverse \(A_{T,S}^{(2)}\).
- A characterization and representation of the generalized inverse \(A_{T,S}^{(2)}\) and its applications
- Generalized inverses. Theory and applications.
- Representation and approximation of the outer inverse \(A_{T,S}^{(2)}\) of a matrix \(A\)
- Gauss-Jordan elimination method for computing outer inverses
- Computing the outer and group inverses through elementary row operations
- The representation and computation of generalized inverse \(A^{(2)}_{T,S}\)
- Matrix left symmetry factor and its applications in generalized inverses \(A_{T,S}^{(2,4)}\)
- The representation of generalized inverse \(A_{T,S}^{(2,3)}\) and its applications
- Innovation based on Gaussian elimination to compute generalized inverse \(A_{T,S}^{(2)}\)
- A note of computation for M-P inverseA†
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