Add to ORKGThis paper introduces a scheme of deriving strong cutting planes for a general integer programming problem. The scheme is related to ChvatalGomory cutting planes and important special cases such as odd hole and clique inequalities for the stable set polyhedron or families of inequalities for the knapsack polyhedron. We analyze how relations between covering and incomparability numbers associated with the matrix can be used to bound coefficients in these inequalities. For the intersection of several knapsack polyhedra, incomparabilities between the column vectors of the associated matrix will be shown to transfer into inequalities of the associated polyhedron. Our scheme has been incorporated into the mixed integer programming code SIP. Abou...
This paper deals with a family of conjunctive inequalities. Such inequalities are needed to describe...
We address the question to what extent polyhedral knowledge about individual knapsack constraints ...
Many problems arising in OR/MS can be formulated as mixed-integer linear programs (MILPs): see the a...
This survey presents cutting planes that are useful or potentially useful in solving mixed integer p...
This survey presents cutting planes that are useful or potentially useful in solving mixed integer p...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
The author recently introduced a new class of cutting planes for integer programs called Fenchel cut...
AbstractGomory's cutting-plane technique can be viewed as a recursive procedure for proving the vali...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
The cutting-plane approach to integer programming was initiated more that 40 years ago: Gomory intro...
AbstractThis paper first describes a theory and algorithms for asymptotic integer programs. Next, a ...
This chapter discusses polyhedral approaches in combinatorial optimization. Using a cutting-plane al...
A cutting-plane procedure for integer programming (IP) problems usually involves invoking a black-bo...
We address the question to what extent polyhedral knowledge about individual knapsack constraints su...
This paper deals with a family of conjunctive inequalities. Such inequalities are needed to describe...
We address the question to what extent polyhedral knowledge about individual knapsack constraints ...
Many problems arising in OR/MS can be formulated as mixed-integer linear programs (MILPs): see the a...
This survey presents cutting planes that are useful or potentially useful in solving mixed integer p...
This survey presents cutting planes that are useful or potentially useful in solving mixed integer p...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
The author recently introduced a new class of cutting planes for integer programs called Fenchel cut...
AbstractGomory's cutting-plane technique can be viewed as a recursive procedure for proving the vali...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
The cutting-plane approach to integer programming was initiated more that 40 years ago: Gomory intro...
AbstractThis paper first describes a theory and algorithms for asymptotic integer programs. Next, a ...
This chapter discusses polyhedral approaches in combinatorial optimization. Using a cutting-plane al...
A cutting-plane procedure for integer programming (IP) problems usually involves invoking a black-bo...
We address the question to what extent polyhedral knowledge about individual knapsack constraints su...
This paper deals with a family of conjunctive inequalities. Such inequalities are needed to describe...
We address the question to what extent polyhedral knowledge about individual knapsack constraints ...
Many problems arising in OR/MS can be formulated as mixed-integer linear programs (MILPs): see the a...