The most effective software packages for solving mixed 0-1 linear programs use strong valid linear inequalities derived from polyhedral theory. We introduce a new procedure which enables one to take known valid inequalities for the knapsack polytope, and convert them into valid inequalities for the fixed-charge and single-node flow polytopes. The resulting inequalities are very different from the previously known inequalities (such as flow cover and flow pack inequalities), and define facets under certain conditions
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
We study the integer knapsack cover polyhedron which is the convex hull of the set of vectors x ∈ ℤ+...
In this survey we attempt to give a unified presentation of a variety of results on the lifting of...
A wide variety of important problems, in Operational Research and other fields, can be modelled as o...
We consider mixed 0-1 linear programs in which one is given a collection of (not necessarily disjoin...
In this paper we discuss the polyhedral structure of the integer single node flow set with two possi...
We consider a mixed integer set which generalizes two well-known sets: the single node fixed-charge ...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
AbstractPochet and Wolsey [Y. Pochet, L.A. Wolsey, Integer knapsack and flow covers with divisible c...
We consider a variant of the well-known Single Node Fixed-Charge Network (SNFCN) set where a set-up ...
AbstractIn this paper we discuss the polyhedral structure of several mixed integer sets involving tw...
AbstractThis note gives the complement of the class of ‘generalized flow cover’ inequalities for a s...
AbstractCover inequalities are commonly used cutting planes for the 0–1 knapsack problem. This paper...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
peer reviewedWe address the question to what extent polyhedral knowledge about individual knapsack...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
We study the integer knapsack cover polyhedron which is the convex hull of the set of vectors x ∈ ℤ+...
In this survey we attempt to give a unified presentation of a variety of results on the lifting of...
A wide variety of important problems, in Operational Research and other fields, can be modelled as o...
We consider mixed 0-1 linear programs in which one is given a collection of (not necessarily disjoin...
In this paper we discuss the polyhedral structure of the integer single node flow set with two possi...
We consider a mixed integer set which generalizes two well-known sets: the single node fixed-charge ...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
AbstractPochet and Wolsey [Y. Pochet, L.A. Wolsey, Integer knapsack and flow covers with divisible c...
We consider a variant of the well-known Single Node Fixed-Charge Network (SNFCN) set where a set-up ...
AbstractIn this paper we discuss the polyhedral structure of several mixed integer sets involving tw...
AbstractThis note gives the complement of the class of ‘generalized flow cover’ inequalities for a s...
AbstractCover inequalities are commonly used cutting planes for the 0–1 knapsack problem. This paper...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
peer reviewedWe address the question to what extent polyhedral knowledge about individual knapsack...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
We study the integer knapsack cover polyhedron which is the convex hull of the set of vectors x ∈ ℤ+...
In this survey we attempt to give a unified presentation of a variety of results on the lifting of...