A geometrical approach on generalized inverses by Neumann-type series

Innovation based on Gaussian elimination to compute generalized inverse \(A_{T,S}^{(2)}\) ⋮ An efficient matrix iteration family for finding the generalized outer inverse ⋮ A fast computational algorithm for computing outer pseudo-inverses with numerical experiments ⋮ From Zhang neural network to scaled hyperpower iterations ⋮ A simplified lattice Boltzmann implementation of the quasi-static approximation in pipe flows under the presence of non-uniform magnetic fields ⋮ New proofs of two representations and minor of generalized inverse \(A_{T,S}^{(2)}\) ⋮ A note on the representation and approximation of the outer inverse \(A_{T,S}^{(2)}\) of a matrix \(A\) ⋮ Several representations of generalized inverse and their application ⋮ Finding generalized inverses by a fast and efficient numerical method ⋮ Some matrix iterations for computing generalized inverses and balancing chemical equations ⋮ On hyperpower family of iterations for computing outer inverses possessing high efficiencies ⋮ An efficient computation of generalized inverse of a matrix ⋮ Factorizations of hyperpower family of iterative methods via least squares approach ⋮ ZNN models for computing matrix inverse based on hyperpower iterative methods ⋮ Full-rank representation of generalized inverse \(A_{T,S}^{(2)}\) and its application ⋮ A class of numerical algorithms for computing outer inverses ⋮ Two closed novel formulas for the generalized inverse \(A_{T,S}^{(2)}\) of a complex matrix with given rank ⋮ An efficient class of iterative methods for computing generalized outer inverse \({M_{T,S}^{(2)}}\) ⋮ Unified frameworks for high order Newton-Schulz and Richardson iterations: a computationally efficient toolkit for convergence rate improvement ⋮ An extended direct factorization method for inverse scattering with limited aperture data ⋮ A class of Kung-Traub-type iterative algorithms for matrix inversion ⋮ Formal analysis of the Schulz matrix inversion algorithm: a paradigm towards computer aided verification of general matrix flow solvers ⋮ A class of quadratically convergent iterative methods ⋮ Further efficient hyperpower iterative methods for the computation of generalized inverses \(A_{T,S}^{(2)}\) ⋮ A note on the stability of a \(p\)th order iteration for finding generalized inverses

• Neumann-type expansion of reflexive generalized inverses of a matrix and the hyperpower iterative method
• A characterization and representation of the generalized inverse \(A_{T,S}^{(2)}\) and its applications
• The hyperpower iteration revisited
• Group inverse and group involutory Matrices^∗
• A Note on an Iterative Method for Generalized Inversion of Matrices
• A Hyperpower Iterative Method for Computing Matrix Products Involving the Generalized Inverse
• Contributions to the Theory of Generalized Inverses
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