Abstract: The research derived analytical relations between the components of a square matrix and it s inverse. The relations have been worked out, applying a hierarchical approach and non-iterative concept of coordination. The analytical relations have been assessed by computational performance. It has been proved that for large-scale matrices, these relations are computationaly efficient. Copyright © 2004 IFAC Key words: hierarchical systems theory, coordination, matrix inverse calculation
We address the numerically reliable computation of generalized inverses of rational matrices in desc...
This book begins with the fundamentals of the generalized inverses, then moves to more advanced topi...
The generalized inverse is proving to be a very useful tool in modern linear matrix theory in partic...
This self-contained monograph presents matrix algorithms and their analysis. The new technique enabl...
Abstract: An Orchestrator coordinates and controls computations at parallel and sequential computing...
With the invention of matrices came, of course, the solution of a system of the equations by the met...
The calculation of a square matrix determinant is a typical matrix algebra operation which, if appli...
Balancing chemical equations is shown to be equivalent to solving a system of linear, algebraic homo...
Determine the inverse matrix, when this exists, and solve a linear system of equations are tasks tha...
Also known as Mathematical sciences report A no. 243SIGLEAvailable from British Library Document Sup...
summary:We give a short introduction to a method for the data-sparse approximation of matrices resul...
Abstract Utilizing a new method to structure parallellotopes, a geometrical interpretation of the in...
Abstract. We propose an algorithm for extracting the diagonal of the inverse matrices arising from e...
An application of iterative methods for computing the Moore–Penrose inverse in balancing chemical eq...
To obtain the transfer equation in dynamic system theory, we need to calculate an inverse matrix. In...
We address the numerically reliable computation of generalized inverses of rational matrices in desc...
This book begins with the fundamentals of the generalized inverses, then moves to more advanced topi...
The generalized inverse is proving to be a very useful tool in modern linear matrix theory in partic...
This self-contained monograph presents matrix algorithms and their analysis. The new technique enabl...
Abstract: An Orchestrator coordinates and controls computations at parallel and sequential computing...
With the invention of matrices came, of course, the solution of a system of the equations by the met...
The calculation of a square matrix determinant is a typical matrix algebra operation which, if appli...
Balancing chemical equations is shown to be equivalent to solving a system of linear, algebraic homo...
Determine the inverse matrix, when this exists, and solve a linear system of equations are tasks tha...
Also known as Mathematical sciences report A no. 243SIGLEAvailable from British Library Document Sup...
summary:We give a short introduction to a method for the data-sparse approximation of matrices resul...
Abstract Utilizing a new method to structure parallellotopes, a geometrical interpretation of the in...
Abstract. We propose an algorithm for extracting the diagonal of the inverse matrices arising from e...
An application of iterative methods for computing the Moore–Penrose inverse in balancing chemical eq...
To obtain the transfer equation in dynamic system theory, we need to calculate an inverse matrix. In...
We address the numerically reliable computation of generalized inverses of rational matrices in desc...
This book begins with the fundamentals of the generalized inverses, then moves to more advanced topi...
The generalized inverse is proving to be a very useful tool in modern linear matrix theory in partic...