Random butterfly matrices were introduced by Parker in 1995 to remove the need for pivoting when using Gaussian elimination. The growing applications of butterfly matrices have often eclipsed the mathematical understanding of how or why butterfly matrices are able to accomplish these given tasks. To help begin to close this gap using theoretical and numerical approaches, we explore the impact on the growth factor of preconditioning a linear system by butterfly matrices. These results are compared to other common methods found in randomized numerical linear algebra. In these experiments, we show preconditioning using butterfly matrices has a more significant dampening impact on large growth factors than other common preconditioners and a sma...
We identify a class of random, dense $n\times n$ matrices for which LU factorization with any form ...
It has been recently shown that large growth factors might occur in Gaussian Elimination with Partia...
It is known that without pivoting Gaussian elimination can run significantly faster, partic-ularly f...
Several de¯nitions of growth factors for Gaussian elimination are compared. Some new piv- oting stra...
AbstractSeveral definitions of growth factors for Gaussian elimination are compared. Some new pivoti...
The recursive structure of butterfly matrices has been exploited to accelerate common methods in com...
The growth factor plays an important role in the error analysis of Gaussian elimination. It is well ...
Also appeared as Lapack Working Note 285We consider the solution of sparse linear systems using dire...
Abstract. The growth factor plays an important role in the error analysis of Gaussian elimination. I...
Abstract Let A be any matrix and let A be a slight random perturbation of A. We prove that it is unl...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2004.Includes bibliogr...
It is known that pivoting-free Gaussian elimination is numerically unsafe but can run signifi-cantly...
In the first part of this dissertation, we explore a novel randomized pivoting strategy to efficient...
AbstractNeville elimination is a direct method for solving linear systems. Several pivoting strategi...
AbstractGaussian elimination is among the most widely used tools in scientific computing. Gaussian e...
We identify a class of random, dense $n\times n$ matrices for which LU factorization with any form ...
It has been recently shown that large growth factors might occur in Gaussian Elimination with Partia...
It is known that without pivoting Gaussian elimination can run significantly faster, partic-ularly f...
Several de¯nitions of growth factors for Gaussian elimination are compared. Some new piv- oting stra...
AbstractSeveral definitions of growth factors for Gaussian elimination are compared. Some new pivoti...
The recursive structure of butterfly matrices has been exploited to accelerate common methods in com...
The growth factor plays an important role in the error analysis of Gaussian elimination. It is well ...
Also appeared as Lapack Working Note 285We consider the solution of sparse linear systems using dire...
Abstract. The growth factor plays an important role in the error analysis of Gaussian elimination. I...
Abstract Let A be any matrix and let A be a slight random perturbation of A. We prove that it is unl...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2004.Includes bibliogr...
It is known that pivoting-free Gaussian elimination is numerically unsafe but can run signifi-cantly...
In the first part of this dissertation, we explore a novel randomized pivoting strategy to efficient...
AbstractNeville elimination is a direct method for solving linear systems. Several pivoting strategi...
AbstractGaussian elimination is among the most widely used tools in scientific computing. Gaussian e...
We identify a class of random, dense $n\times n$ matrices for which LU factorization with any form ...
It has been recently shown that large growth factors might occur in Gaussian Elimination with Partia...
It is known that without pivoting Gaussian elimination can run significantly faster, partic-ularly f...