In this paper we investigate whether matrices arising from linear or integer programming problems can be decomposed into so-called bordered block diagonal form. More precisely, given some matrix A, we try to assign as many rows as possible to some number β of blocks of size κ such that no two rows assigned to different blocks intersect in a common column. Bordered block diagonal form is desirable because it can guide and speed up the solution process for linear and integer programming problems. We show that various matrices from the LP- and MIP-libraries Netlib and Miplib can indeed be decomposed into this form by computing optimal decompositions or decompositions with proven quality. These computations are done with a branch-and-cut algori...
We consider the problem of partitioning a matrix of m rows and n columns of non-negative integers in...
International audienceIn the context of the block Cimmino algorithm, we study preprocessing strategi...
One of the most important breakthroughs in the area of Mixed Integer Linear Programming (MILP) is th...
AbstractA new formulation for LU decomposition allows efficient representation of intermediate matri...
This work investigates the problem of permuting a sparse rectangular matrix into block diagonal form...
A recent development in the field of discrete optimization is the combined use of (binary) decision ...
We develop a finite decomposition method for solving a wide class of non-convex mixed-integer progra...
Both cutting plane methods and traditional decomposition methods are procedures that compute a bound...
The comparison of two algorithms for solving bordered linear systems is considered. The matrix of th...
AbstractWe introduce a general technique for creating an extended formulation of a mixed-integer pro...
We study the theoretical complexity of mixed integer programming algorithms. We first discuss the re...
The thesis argues the case for exploiting certain structures in integer linear programs.\ud \ud Inte...
Abstract. In this paper, we give a finite disjunctive programming procedure to obtain the convex hul...
Mixed-integer Gomory cuts have become an integral part of state-of-the-art software for solving mixe...
The Gröbner basis method for solving systems of polynomial equations became very popular in the comp...
We consider the problem of partitioning a matrix of m rows and n columns of non-negative integers in...
International audienceIn the context of the block Cimmino algorithm, we study preprocessing strategi...
One of the most important breakthroughs in the area of Mixed Integer Linear Programming (MILP) is th...
AbstractA new formulation for LU decomposition allows efficient representation of intermediate matri...
This work investigates the problem of permuting a sparse rectangular matrix into block diagonal form...
A recent development in the field of discrete optimization is the combined use of (binary) decision ...
We develop a finite decomposition method for solving a wide class of non-convex mixed-integer progra...
Both cutting plane methods and traditional decomposition methods are procedures that compute a bound...
The comparison of two algorithms for solving bordered linear systems is considered. The matrix of th...
AbstractWe introduce a general technique for creating an extended formulation of a mixed-integer pro...
We study the theoretical complexity of mixed integer programming algorithms. We first discuss the re...
The thesis argues the case for exploiting certain structures in integer linear programs.\ud \ud Inte...
Abstract. In this paper, we give a finite disjunctive programming procedure to obtain the convex hul...
Mixed-integer Gomory cuts have become an integral part of state-of-the-art software for solving mixe...
The Gröbner basis method for solving systems of polynomial equations became very popular in the comp...
We consider the problem of partitioning a matrix of m rows and n columns of non-negative integers in...
International audienceIn the context of the block Cimmino algorithm, we study preprocessing strategi...
One of the most important breakthroughs in the area of Mixed Integer Linear Programming (MILP) is th...