Computing the pseudoinverse of specific Toeplitz matrices using rank-one updates
From MaRDI portal
Publication:1793737
DOI10.1155/2016/9065438zbMath1400.65018OpenAlexW2507463589WikidataQ57717603 ScholiaQ57717603MaRDI QIDQ1793737
Predrag S. Stanimirović, Igor Stojanović, Vasilios N. Katsikis
Publication date: 12 October 2018
Published in: Mathematical Problems in Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2016/9065438
Numerical solutions to overdetermined systems, pseudoinverses (65F20) Theory of matrix inversion and generalized inverses (15A09) Direct numerical methods for linear systems and matrix inversion (65F05)
Related Items (1)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Modified SMS method for computing outer inverses of Toeplitz matrices
- Computing \(\{2,4\}\) and \(\{2,3\}\)-inverses by using the Sherman-Morrison formula
- The solution of linear systems by using the Sherman-Morrison formula
- Digital image reconstruction in the spectral domain utilizing the Moore-Penrose inverse
- Applications of the Moore-Penrose inverse in digital image restoration
- General forms for the recursive determination of generalized inverses: Unified approach
- Solving Toeplitz least squares problems by means of Newton's iteration
- Computing Moore-Penrose inverses of Toeplitz matrices by Newton's iteration
- Relationships between generalized inverses of a matrix and generalized inverses of its rank-one-modifications
- The minimum-norm least-squares solution of a linear system and symmetric rank-one updates
- Fast computing of the Moore-Penrose inverse matrix
- Deblurring Images
- AN APPROXIMATE MATRIX INVERSION PROCEDURE BY PARALLELIZATION OF THE SHERMAN–MORRISON FORMULA
- The generalized inverses of perturbed matrices
- Preconditioning Sparse Nonsymmetric Linear Systems with the Sherman--Morrison Formula
- A Class of Methods for Solving Nonlinear Simultaneous Equations
- An Algorithm for the Inversion of Finite Toeplitz Matrices
- Application of the partitioning method to specific Toeplitz matrices
- Some Applications of the Pseudoinverse of a Matrix
- Generalized Inversion of Modified Matrices
- An efficient implementation of the ensemble Kalman filter based on an iterative Sherman-Morrison formula
This page was built for publication: Computing the pseudoinverse of specific Toeplitz matrices using rank-one updates
