When applying Gaussian elimination to a sparse matrix, it is desirable to avoid turning zeros into non-zeros to preserve the sparsity. The class of perfect elimination bipartite graphs is closely related to square matrices that Gaussian elimination can be applied to without turning any zero into a non-zero. Existing literature on the recognition of this class and finding suitable pivots mainly focusses on time complexity. For $n \times n$ matrices with m non-zero elements, the currently best known algorithm has a time complexity of $O(n^3/\log n)$. However, when viewed from a practical perspective, the space complexity also deserves attention: it may not be worthwhile to look for a suitable set of pivots for a sparse matrix if this requires...
We propose several techniques as alternatives to partial pivoting to stabilize sparse Gaussian elimi...
Presented on November 28, 2016 at 11:00 a.m. in the Klaus Advanced Computing Building, Room 1116E.Ra...
Bisimplicial edges in bipartite graphs are closely related to pivots in Gaussian elimination that av...
When applying Gaussian elimination to a sparse matrix, it is desirable to avoid turning zeros into n...
Abstract. When applying Gaussian elimination to a sparse matrix, it is desirable to avoid turning ze...
In Gaussian elimination it is often desirable to preserve existing zeros (sparsity). This is closely...
In Gaussian elimination it is often desirable to preserve existing zeros (sparsity). This is closely...
This paper surveys some of the recent research on the applications of the algebraic and combinatoria...
Abstract. In this paper we consider two structure prediction problems of interest in Gaussian elimin...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
AbstractA variant of the fraction free form of Gaussian elimination is presented. This algorithm red...
A variant of the fraction free form of Gaussian elimination is presented. This algorithm reduces the...
In the process of solving the linear epuation by the Gaussian Elimination or other comparable techni...
Existing sparse partial pivoting algorithms can spend asymptomatically more time manipulating data ...
AbstractIn this paper we consider the algorithms for transforming an n × n sparse matrix A into anot...
We propose several techniques as alternatives to partial pivoting to stabilize sparse Gaussian elimi...
Presented on November 28, 2016 at 11:00 a.m. in the Klaus Advanced Computing Building, Room 1116E.Ra...
Bisimplicial edges in bipartite graphs are closely related to pivots in Gaussian elimination that av...
When applying Gaussian elimination to a sparse matrix, it is desirable to avoid turning zeros into n...
Abstract. When applying Gaussian elimination to a sparse matrix, it is desirable to avoid turning ze...
In Gaussian elimination it is often desirable to preserve existing zeros (sparsity). This is closely...
In Gaussian elimination it is often desirable to preserve existing zeros (sparsity). This is closely...
This paper surveys some of the recent research on the applications of the algebraic and combinatoria...
Abstract. In this paper we consider two structure prediction problems of interest in Gaussian elimin...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
AbstractA variant of the fraction free form of Gaussian elimination is presented. This algorithm red...
A variant of the fraction free form of Gaussian elimination is presented. This algorithm reduces the...
In the process of solving the linear epuation by the Gaussian Elimination or other comparable techni...
Existing sparse partial pivoting algorithms can spend asymptomatically more time manipulating data ...
AbstractIn this paper we consider the algorithms for transforming an n × n sparse matrix A into anot...
We propose several techniques as alternatives to partial pivoting to stabilize sparse Gaussian elimi...
Presented on November 28, 2016 at 11:00 a.m. in the Klaus Advanced Computing Building, Room 1116E.Ra...
Bisimplicial edges in bipartite graphs are closely related to pivots in Gaussian elimination that av...