Add to ORKGSolution of large-scale simultaneous linear equations have a high demand in various fields. For example, a linear system of the signal processing field and the autocorrelation matrix, etc.As the fast direct methods Trench-Zohar algorithms and E.H.Bareiss of algorithm is famous. In this paper, we studied Trench-Zohar direct method, and extend the algorithm to be able to adapt to a variety of matrix
Abstract. In this paper we present two parallel algorithms to solve non-symmetric Toeplitz systems o...
This thesis aims to design new fast algorithms for numerical computation via the Toeplitz matrices. ...
We implement an eigenvalue solving algorithm proposed by Ng and Trench, specialized for Toeplitz(-li...
Solution of large-scale simultaneous linear equations have a high demand in various fields. For exam...
Presented here is a stable algorithm that uses Zohar's formulation of Trench's algorithm and compute...
ABSTRACT. We present an ecient classic Trench-type algorithm for the inversion of real skew-symmetri...
AbstractWe present some recurrences that are the basis for an algorithm to invert an n×n Toeplitz sy...
Two properties of conjugate Toeplitz matrices are given: (1) an expression for the elements inside t...
In this work, a number of advances are described which we feel lead to better understanding and solu...
Abstract—Several signal processing applications can be formulated as the computation of the null vec...
AbstractTwo properties of conjugate Toeplitz matrices are given: (1) an expression for the elements ...
SIGLEAvailable from British Library Document Supply Centre- DSC:7673.7004(85/26) / BLDSC - British L...
AbstractWe present an inversion algorithm for the solution of a generic N X N Toeplitz system of lin...
Efficiently solving a large linear system of equations, Ax = b, is still a challenging problem. Such...
In this paper, we review Levinson and fast Choleski algorithms for solving sets of linear equations ...
Abstract. In this paper we present two parallel algorithms to solve non-symmetric Toeplitz systems o...
This thesis aims to design new fast algorithms for numerical computation via the Toeplitz matrices. ...
We implement an eigenvalue solving algorithm proposed by Ng and Trench, specialized for Toeplitz(-li...
Solution of large-scale simultaneous linear equations have a high demand in various fields. For exam...
Presented here is a stable algorithm that uses Zohar's formulation of Trench's algorithm and compute...
ABSTRACT. We present an ecient classic Trench-type algorithm for the inversion of real skew-symmetri...
AbstractWe present some recurrences that are the basis for an algorithm to invert an n×n Toeplitz sy...
Two properties of conjugate Toeplitz matrices are given: (1) an expression for the elements inside t...
In this work, a number of advances are described which we feel lead to better understanding and solu...
Abstract—Several signal processing applications can be formulated as the computation of the null vec...
AbstractTwo properties of conjugate Toeplitz matrices are given: (1) an expression for the elements ...
SIGLEAvailable from British Library Document Supply Centre- DSC:7673.7004(85/26) / BLDSC - British L...
AbstractWe present an inversion algorithm for the solution of a generic N X N Toeplitz system of lin...
Efficiently solving a large linear system of equations, Ax = b, is still a challenging problem. Such...
In this paper, we review Levinson and fast Choleski algorithms for solving sets of linear equations ...
Abstract. In this paper we present two parallel algorithms to solve non-symmetric Toeplitz systems o...
This thesis aims to design new fast algorithms for numerical computation via the Toeplitz matrices. ...
We implement an eigenvalue solving algorithm proposed by Ng and Trench, specialized for Toeplitz(-li...