We consider the problem of permuting the rows and columns of a rectangular or square, unsymmetric sparse matrix to compute its block triangular form. This block triangular form is based on a canonical decomposition of bipartite graphs induced by a maximum matching and was discovered by Dulmage and Mendelsohn. We describe implementations of algorithms to compute the block triangular form and provide computational results on sparse matrices from test collections. Several applications of the block triangular form are also included
In this paper, an algorithm is constructed for finding the block triangular form of a nonnegative ma...
This paper proposes a set of Level 3 Basic Linear Algebra Subprograms and associated kernels for sp...
Many applications of scientific computing rely on computations on sparse matrices, thus the design ...
In this thesis we will present an effective method for solving systems of linear equations with larg...
We investigate the problem of permuting a sparse rectangular matrix into block-diagonal form. Block-...
A new partitioning algorithm that permutes sparse matrices to a specific block lower-triangular form...
AbstractThis paper addresses the finest block triangularization of nonsingular skewsymmetric matrice...
In solving large sparse linear least squares problems $Ax \cong b$, several different numeric metho...
AbstractThis paper considers an algorithm for finding a perfect matching, if there is one, in a bipa...
Given a rectangular matrix with more columns than rows, find a base of linear combinations of the ro...
International audienceWe present some observations on the block triangular form (btf) of structurall...
Abstract. We present some observations on the block triangular form (btf) of structurally symmetric,...
Abstract. This paper generalizes to the nonlinear case a standard way to solve general sparse system...
This paper describes Householder reduction of a rectangular sparse matrix to small band upper triang...
42 pages, available as LIP research report RR-2009-15Numerical linear algebra and combinatorial opti...
In this paper, an algorithm is constructed for finding the block triangular form of a nonnegative ma...
This paper proposes a set of Level 3 Basic Linear Algebra Subprograms and associated kernels for sp...
Many applications of scientific computing rely on computations on sparse matrices, thus the design ...
In this thesis we will present an effective method for solving systems of linear equations with larg...
We investigate the problem of permuting a sparse rectangular matrix into block-diagonal form. Block-...
A new partitioning algorithm that permutes sparse matrices to a specific block lower-triangular form...
AbstractThis paper addresses the finest block triangularization of nonsingular skewsymmetric matrice...
In solving large sparse linear least squares problems $Ax \cong b$, several different numeric metho...
AbstractThis paper considers an algorithm for finding a perfect matching, if there is one, in a bipa...
Given a rectangular matrix with more columns than rows, find a base of linear combinations of the ro...
International audienceWe present some observations on the block triangular form (btf) of structurall...
Abstract. We present some observations on the block triangular form (btf) of structurally symmetric,...
Abstract. This paper generalizes to the nonlinear case a standard way to solve general sparse system...
This paper describes Householder reduction of a rectangular sparse matrix to small band upper triang...
42 pages, available as LIP research report RR-2009-15Numerical linear algebra and combinatorial opti...
In this paper, an algorithm is constructed for finding the block triangular form of a nonnegative ma...
This paper proposes a set of Level 3 Basic Linear Algebra Subprograms and associated kernels for sp...
Many applications of scientific computing rely on computations on sparse matrices, thus the design ...