Many matrices that arise in the solution of signal processing problems have a special displacement structure. For example, adaptive filtering and direction-of-arrival estimation yield matrices of Toeplitz type. A recent method of Gohberg, Kailath and Olshevsky (GKO) allows fast Gaussian elimination with partial pivoting for such structured matrices. In this paper, a rounding error analysis is performed on the Cauchy and Toeplitz variants of the GKO method. It is shown the error growth depends on the growth in certain auxiliary vectors, the generators, which are computed by the GKO algorithms. It is also shown that in certain circumstances, the growth in the generators can be large, and so the error growth is much larger than would be encoun...
The stability of the Gauss-Jordan algorithm with partial pivoting for the solution of general system...
Recent work by Sweet and Brent on the fast factorization of Cauchy-like matrices through a fast vers...
Abstract Let A be any matrix and let A be a slight random perturbation of A. We prove that it is unl...
. Recent research shows that structured matrices such as Toeplitz and Hankel matrices can be transfo...
For the solution of a linear system Ax = b using Gaussian elimination, some new properties of scaled...
The results of an error analysis of Gaussian elimination with partial pivoting for band systems of l...
J.H. Wilkinson put Gaussian elimination (GE) on a sound numerical footing in the 1960's when he sho...
2.2 Partial or complete pivoting? Practical experience vs. error bounds...............
In an earlier paper [GKO95] we exploited the displacement structure of Cauchy-like matrices to deriv...
Abstract. The growth factor plays an important role in the error analysis of Gaussian elimination. I...
The growth factor plays an important role in the error analysis of Gaussian elimination. It is well ...
AbstractGaussian elimination is among the most widely used tools in scientific computing. Gaussian e...
AbstractIn an earlier paper we exploited the displacement structure of Cauchy-like matrices to deriv...
In the process of solving the linear epuation by the Gaussian Elimination or other comparable techni...
This paper considers elimination methods to solve dense linear systems, in particular a variant of G...
The stability of the Gauss-Jordan algorithm with partial pivoting for the solution of general system...
Recent work by Sweet and Brent on the fast factorization of Cauchy-like matrices through a fast vers...
Abstract Let A be any matrix and let A be a slight random perturbation of A. We prove that it is unl...
. Recent research shows that structured matrices such as Toeplitz and Hankel matrices can be transfo...
For the solution of a linear system Ax = b using Gaussian elimination, some new properties of scaled...
The results of an error analysis of Gaussian elimination with partial pivoting for band systems of l...
J.H. Wilkinson put Gaussian elimination (GE) on a sound numerical footing in the 1960's when he sho...
2.2 Partial or complete pivoting? Practical experience vs. error bounds...............
In an earlier paper [GKO95] we exploited the displacement structure of Cauchy-like matrices to deriv...
Abstract. The growth factor plays an important role in the error analysis of Gaussian elimination. I...
The growth factor plays an important role in the error analysis of Gaussian elimination. It is well ...
AbstractGaussian elimination is among the most widely used tools in scientific computing. Gaussian e...
AbstractIn an earlier paper we exploited the displacement structure of Cauchy-like matrices to deriv...
In the process of solving the linear epuation by the Gaussian Elimination or other comparable techni...
This paper considers elimination methods to solve dense linear systems, in particular a variant of G...
The stability of the Gauss-Jordan algorithm with partial pivoting for the solution of general system...
Recent work by Sweet and Brent on the fast factorization of Cauchy-like matrices through a fast vers...
Abstract Let A be any matrix and let A be a slight random perturbation of A. We prove that it is unl...