Add to ORKGThe facet of Knapsack ploytope, i.e. convex hull of 0-1 points satisfying a given linear inequality has been presented in this current paper. Such type of facets plays an important role in set covering set partitioning, matroidal-intersection vertex- packing, generalized assignment and other combinatorial problems. Strong covers for facets of Knapsack ploytope has been developed in the first part of the present paper. Generating family of valid cutting planes that satisfy inequality with 0-1 variables through algorithms are the attraction of this paper
AbstractWe study facets of the k-partition polytope Pk,n, the convex hull of edges cut by r-partitio...
In this paper we prove two lifting theorems for the clique partitioning polytope, which provide suff...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
W1TR~tO-rA present a procedure which generates all the facets of a 0-1 programming polytope P with p...
AbstractCover inequalities are commonly used cutting planes for the 0–1 knapsack problem. This paper...
none4siWe provide a simple description in terms of linear inequalities of the convex hull of the non...
We provide a simple description in terms of linear inequalities of the convex hull of the nonnegativ...
We provide a simple description in terms of linear inequalities of the convex hull of the nonnegativ...
We provide a simple description in terms of linear inequalities of the convex hull of the nonnegativ...
We present a polyhedral study of the complementarity knapsack problem. Traditionally, complementarit...
A systematic way for tightening an IP formulation is by employing classes of linear inequalities tha...
Given a linear inequality in 0–1 variables we attempt to obtain the faces of the integer hull of 0–1...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
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 ...
AbstractWe study facets of the k-partition polytope Pk,n, the convex hull of edges cut by r-partitio...
In this paper we prove two lifting theorems for the clique partitioning polytope, which provide suff...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
W1TR~tO-rA present a procedure which generates all the facets of a 0-1 programming polytope P with p...
AbstractCover inequalities are commonly used cutting planes for the 0–1 knapsack problem. This paper...
none4siWe provide a simple description in terms of linear inequalities of the convex hull of the non...
We provide a simple description in terms of linear inequalities of the convex hull of the nonnegativ...
We provide a simple description in terms of linear inequalities of the convex hull of the nonnegativ...
We provide a simple description in terms of linear inequalities of the convex hull of the nonnegativ...
We present a polyhedral study of the complementarity knapsack problem. Traditionally, complementarit...
A systematic way for tightening an IP formulation is by employing classes of linear inequalities tha...
Given a linear inequality in 0–1 variables we attempt to obtain the faces of the integer hull of 0–1...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...
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 ...
AbstractWe study facets of the k-partition polytope Pk,n, the convex hull of edges cut by r-partitio...
In this paper we prove two lifting theorems for the clique partitioning polytope, which provide suff...
A cardinality constrained knapsack problem is a continuous knapsack problem in which no more than a ...