AbstractWe study the set of 0–1 integer solutions to a single knapsack constraint and a set of non-overlapping cardinality constraints (MCKP), which generalizes the classical 0–1 knapsack polytope and the 0–1 knapsack polytope with generalized upper bounds. We derive strong valid inequalities for the convex hull of its feasible solutions using sequence-independent lifting. For problems with a single cardinality constraint, we derive two-dimensional superadditive lifting functions and prove that they are maximal and non-dominated under some mild conditions. We then show that these functions can be used to build strong valid inequalities for problems with multiple disjoint cardinality constraints. Finally, we present preliminary computational...
We address the question to what extent polyhedral knowledge about individual knapsack constraints ...
AbstractGiven a combinatorial optimization problem and a subset N of nonnegative integer numbers, we...
We present a polyhedral study of the complementarity knapsack problem. Traditionally, complementarit...
AbstractWe study the set of 0–1 integer solutions to a single knapsack constraint and a set of non-o...
In this paper, we study the set of 0-1 integer solutions to a single knapsack constraint and a set o...
AbstractIn this paper, we study the polyhedral structure of the set of 0–1 integer solutions to a si...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
AbstractCover inequalities are commonly used cutting planes for the 0–1 knapsack problem. This paper...
In this thesis, we introduce efficient lifting methods to generate strong cutting planes for unstruc...
Lifted cover inequalities are well-known cutting planes for 0-1 linear programs. We show how one of ...
We study the integer knapsack cover polyhedron which is the convex hull of the set of vectors x ∈ ℤ+...
Abstract. This paper considers the precedence constrained knapsack problem. More specifically, we ar...
AbstractA problem characteristic common to a number of important integer programming problems is tha...
112 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2004.We investigate the convex hul...
We address the question to what extent polyhedral knowledge about individual knapsack constraints ...
AbstractGiven a combinatorial optimization problem and a subset N of nonnegative integer numbers, we...
We present a polyhedral study of the complementarity knapsack problem. Traditionally, complementarit...
AbstractWe study the set of 0–1 integer solutions to a single knapsack constraint and a set of non-o...
In this paper, we study the set of 0-1 integer solutions to a single knapsack constraint and a set o...
AbstractIn this paper, we study the polyhedral structure of the set of 0–1 integer solutions to a si...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
AbstractCover inequalities are commonly used cutting planes for the 0–1 knapsack problem. This paper...
In this thesis, we introduce efficient lifting methods to generate strong cutting planes for unstruc...
Lifted cover inequalities are well-known cutting planes for 0-1 linear programs. We show how one of ...
We study the integer knapsack cover polyhedron which is the convex hull of the set of vectors x ∈ ℤ+...
Abstract. This paper considers the precedence constrained knapsack problem. More specifically, we ar...
AbstractA problem characteristic common to a number of important integer programming problems is tha...
112 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2004.We investigate the convex hul...
We address the question to what extent polyhedral knowledge about individual knapsack constraints ...
AbstractGiven a combinatorial optimization problem and a subset N of nonnegative integer numbers, we...
We present a polyhedral study of the complementarity knapsack problem. Traditionally, complementarit...