We present a pivot-free deterministic algorithm for the inversion of block matrices. The method is based on the Moore-Penrose inverse and is applicable over certain general classes of rings. This improves on previous methods that required at least one invertible on-diagonal block, and that otherwise required row- or column-based pivoting, disrupting the block structure. Our method is applicable to any invertible matrix and does not require any particular blocks to invertible. This is achieved at the cost of two additional specialized matrix multiplications and, in some cases, requires the inversion to be performed in an extended ring
An iterative inversion algorithm for a class of square matrices is derived and tested. The inverted ...
Abstract — The matrix inversion lemma gives an explicit formula of the inverse of a positive-definit...
AbstractThe inversion problem for square matrices having the structure of a block Hankel-like matrix...
We present a pivot-free deterministic algorithm for the inversion of block matrices. The method is ...
AbstractThis paper proves that a block-based procedure for inverting a nonsingular matrix is cheaper...
A block matrix inversion is a tool that is useful in areas of control, estimation theory and signal ...
AbstractWe study a class of block structured matrices R={Rij}i,j=1N with a property that the solutio...
AbstractA new formulation for LU decomposition allows efficient representation of intermediate matri...
summary:In this paper an algorithm for calculating the inverse matrix of the matrix partitioned into...
An essentially new method for the inversion of n x n matrices, closely related to the method of comp...
We provide a new representation for the inverse of block tridiagonal and banded matrices. The new r...
The inversion problem for square matrices having the structure of a block Hankel-like matrix is stud...
summary:In this paper the problem of the inversion of a block matrix is considered. Formulas for the...
AbstractIn this paper, we give a fast algorithm to compute the parameters of an inversion formula fo...
Abstract—Block-banded matrices generalize banded matrices. We study the properties of positive defin...
An iterative inversion algorithm for a class of square matrices is derived and tested. The inverted ...
Abstract — The matrix inversion lemma gives an explicit formula of the inverse of a positive-definit...
AbstractThe inversion problem for square matrices having the structure of a block Hankel-like matrix...
We present a pivot-free deterministic algorithm for the inversion of block matrices. The method is ...
AbstractThis paper proves that a block-based procedure for inverting a nonsingular matrix is cheaper...
A block matrix inversion is a tool that is useful in areas of control, estimation theory and signal ...
AbstractWe study a class of block structured matrices R={Rij}i,j=1N with a property that the solutio...
AbstractA new formulation for LU decomposition allows efficient representation of intermediate matri...
summary:In this paper an algorithm for calculating the inverse matrix of the matrix partitioned into...
An essentially new method for the inversion of n x n matrices, closely related to the method of comp...
We provide a new representation for the inverse of block tridiagonal and banded matrices. The new r...
The inversion problem for square matrices having the structure of a block Hankel-like matrix is stud...
summary:In this paper the problem of the inversion of a block matrix is considered. Formulas for the...
AbstractIn this paper, we give a fast algorithm to compute the parameters of an inversion formula fo...
Abstract—Block-banded matrices generalize banded matrices. We study the properties of positive defin...
An iterative inversion algorithm for a class of square matrices is derived and tested. The inverted ...
Abstract — The matrix inversion lemma gives an explicit formula of the inverse of a positive-definit...
AbstractThe inversion problem for square matrices having the structure of a block Hankel-like matrix...