On the extension of Householder's method for weighted Moore-Penrose inverse
From MaRDI portal
Publication:1644552
DOI10.1016/j.amc.2014.01.021zbMath1410.65082OpenAlexW2003499591MaRDI QIDQ1644552
Alicia Cordero, Fazlollah Soleymani, Farahnaz Soleimani, Juan Ramón Torregrosa Sánchez
Publication date: 21 June 2018
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2014.01.021
Theory of matrix inversion and generalized inverses (15A09) Iterative numerical methods for linear systems (65F10) Direct numerical methods for linear systems and matrix inversion (65F05) Orthogonalization in numerical linear algebra (65F25)
Related Items (4)
From Zhang neural network to scaled hyperpower iterations ⋮ A new iterative method for finding approximate inverses of complex matrices ⋮ Some matrix iterations for computing generalized inverses and balancing chemical equations ⋮ A class of quadratically convergent iterative methods
Cites Work
- An iterative method for computing the approximate inverse of a square matrix and the Moore-Penrose inverse of a non-square matrix
- On the computation of weighted Moore-Penrose inverse using a high-order matrix method
- Efficient optimal eighth-order derivative-free methods for nonlinear equations
- An efficient matrix iteration for computing weighted Moore-Penrose inverse
- Generalized inverses. Theory and applications.
- A note on the stability of a \(p\)th order iteration for finding generalized inverses
- The generalized weighted Moore-Penrose inverse
- Chemical equation balancing: an integer programming approach
- An improved Newton iteration for the weighted Moore-Penrose inverse
- ON A FAST ITERATIVE METHOD FOR APPROXIMATE INVERSE OF MATRICES
- Generalizing the Singular Value Decomposition
- Wavelet-Like Bases for the Fast Solution of Second-Kind Integral Equations
- Unnamed Item
- Unnamed Item
- Unnamed Item
This page was built for publication: On the extension of Householder's method for weighted Moore-Penrose inverse
