AbstractWe investigate a scheme, called pairing, for generating new valid inequalities for mixed integer programs by taking pairwise combinations of existing valid inequalities. The pairing scheme essentially produces a split cut corresponding to a specific disjunction, and can also be derived through the mixed integer rounding procedure. The scheme is in general sequence-dependent and therefore leads to an exponential number of inequalities. For some important cases, we identify combination sequences that lead to a manageable set of non-dominated inequalities. We illustrate the framework for some deterministic and stochastic integer programs and we present computational results showing the efficiency of adding the new generated inequalitie...
Lifting is a procedure for deriving valid inequalities for mixed-integer sets from valid inequalitie...
A separation heuristic for mixed integer programs is presented that theoretically allows one to deri...
We describe a computationally effective method for generating disjunctive inequalities for convex m...
We present a scheme for generating new valid inequalities for mixed integer programs by taking pair-...
AbstractWe investigate a scheme, called pairing, for generating new valid inequalities for mixed int...
Mixed-integer rounding (MIR) inequalities play a central role in the development of strong cutting p...
This tutorial presents a theory of valid inequalities for mixed integer linear sets. It introduces t...
This thesis focuses on the derivation of improved computational schemes for the optimization of mixe...
Several important NP-hard combinatorial optimization problems can be posed as packing/covering integ...
In this survey we attempt to give a uniÞed presentation of a variety of results on the lifting of va...
Recently a new technique for solving pure integer programming problems has been suggested It consist...
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...
We study the mixed 0-1 knapsack polytope, which is defined by a single knapsack constraint that cont...
A separation heuristic for mixed integer programs is presented that theoretically allows one to deri...
Lifting is a procedure for deriving valid inequalities for mixed-integer sets from valid inequalitie...
A separation heuristic for mixed integer programs is presented that theoretically allows one to deri...
We describe a computationally effective method for generating disjunctive inequalities for convex m...
We present a scheme for generating new valid inequalities for mixed integer programs by taking pair-...
AbstractWe investigate a scheme, called pairing, for generating new valid inequalities for mixed int...
Mixed-integer rounding (MIR) inequalities play a central role in the development of strong cutting p...
This tutorial presents a theory of valid inequalities for mixed integer linear sets. It introduces t...
This thesis focuses on the derivation of improved computational schemes for the optimization of mixe...
Several important NP-hard combinatorial optimization problems can be posed as packing/covering integ...
In this survey we attempt to give a uniÞed presentation of a variety of results on the lifting of va...
Recently a new technique for solving pure integer programming problems has been suggested It consist...
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...
We study the mixed 0-1 knapsack polytope, which is defined by a single knapsack constraint that cont...
A separation heuristic for mixed integer programs is presented that theoretically allows one to deri...
Lifting is a procedure for deriving valid inequalities for mixed-integer sets from valid inequalitie...
A separation heuristic for mixed integer programs is presented that theoretically allows one to deri...
We describe a computationally effective method for generating disjunctive inequalities for convex m...