A note on computing the generalized inverse \(A_{T,S}^{(2)}\) of a matrix \(A\)
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Publication:700896
DOI10.1155/S0161171202013169zbMath1016.65019MaRDI QIDQ700896
Publication date: 15 October 2002
Published in: International Journal of Mathematics and Mathematical Sciences (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/50174
numerical examplesNewton-Raphson methoditerative methods\(\{2\}\)-inverse of a matrixgeneralized inverse matrix
Numerical solutions to overdetermined systems, pseudoinverses (65F20) Theory of matrix inversion and generalized inverses (15A09)
Related Items (12)
Neural network approach to computing outer inverses based on the full rank representation ⋮ Generalized Schultz iterative methods for the computation of outer inverses ⋮ Generalized inverse \(A^{(2)}_{T,S}\) and a rank equation ⋮ Interpolation algorithm of Leverrier-Faddev type for polynomial matrices ⋮ Representation and approximate for generalized inverse \(A_{T,S}^{(2)}\): revisited ⋮ Computing the outer and group inverses through elementary row operations ⋮ Existence and Representations of Solutions to Some Constrained Systems of Matrix Equations ⋮ A note on the representation and approximation of the outer inverse \(A_{T,S}^{(2)}\) of a matrix \(A\) ⋮ A class of numerical algorithms for computing outer inverses ⋮ A note on the perturbation of an outer inverse ⋮ On continuity of the generalized inverse \(A^{(2)}_{T,S}\) ⋮ Integral and limit representations of the outer inverse in Banach space
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