AbstractThree regions arising as surrogates in certain network design problems are the knapsack set X = xϵZn+: ∑nj=1 Cjxj⩾ b, the simple capacitated flow set Y = (y, x) ϵR1+ × Zn+: y ⩽ b, y ⩽ ∑nj=1 CjXj, and the set Z = (y, x) ϵ Rn+ × Zn+: ∑nj=1yj ⩽ b, yj ⩽ Cjxj for j = 1,…,n where the capacity Cj+1 is an integer multiple Cj for all j. We present algorithms for optimization over the sets X and Y, as well as different descriptions of the convex hulls and fast combinatorial algorithms for separation. Some partial results are given for the set Z and another extension
Solution techniques for combinatorial optimization and integer programming problems are core discipl...
Integer Programming is used to solve numerous optimization problems. This class of mathematical mode...
Combinatorial optimization problems appear in many disciplines ranging from management and logistic...
AbstractThree regions arising as surrogates in certain network design problems are the knapsack set ...
AbstractPochet and Wolsey [Y. Pochet, L.A. Wolsey, Integer knapsack and flow covers with divisible c...
We study two continuous knapsack sets (Formula presented.) and (Formula presented.) with (Formula pr...
AbstractThe objective function and constraint of the knapsack problem are aggregated and an equivale...
AbstractIn this paper we discuss the polyhedral structure of several mixed integer sets involving tw...
Cataloged from PDF version of article.We propose a simple and a quite efficient separation procedure...
Valid inequalities for 0-1 knapsack polytopes often prove useful when tackling hard 0-1 Linear Progr...
AbstractWe consider sharing problems, i.e., the minimization of separable objectives ƒ(x) = max{ƒj(x...
AbstractCover inequalities are commonly used cutting planes for the 0–1 knapsack problem. This paper...
This paper presents both approximate and exact merged knapsack cover inequalities, a class of cuttin...
We consider the multiple non-linear knapsack problem with separable non-convex functions. The proble...
Every knapsack problem may be relaxed to a cyclic group problem. In 1969, Gomory found the subadditi...
Solution techniques for combinatorial optimization and integer programming problems are core discipl...
Integer Programming is used to solve numerous optimization problems. This class of mathematical mode...
Combinatorial optimization problems appear in many disciplines ranging from management and logistic...
AbstractThree regions arising as surrogates in certain network design problems are the knapsack set ...
AbstractPochet and Wolsey [Y. Pochet, L.A. Wolsey, Integer knapsack and flow covers with divisible c...
We study two continuous knapsack sets (Formula presented.) and (Formula presented.) with (Formula pr...
AbstractThe objective function and constraint of the knapsack problem are aggregated and an equivale...
AbstractIn this paper we discuss the polyhedral structure of several mixed integer sets involving tw...
Cataloged from PDF version of article.We propose a simple and a quite efficient separation procedure...
Valid inequalities for 0-1 knapsack polytopes often prove useful when tackling hard 0-1 Linear Progr...
AbstractWe consider sharing problems, i.e., the minimization of separable objectives ƒ(x) = max{ƒj(x...
AbstractCover inequalities are commonly used cutting planes for the 0–1 knapsack problem. This paper...
This paper presents both approximate and exact merged knapsack cover inequalities, a class of cuttin...
We consider the multiple non-linear knapsack problem with separable non-convex functions. The proble...
Every knapsack problem may be relaxed to a cyclic group problem. In 1969, Gomory found the subadditi...
Solution techniques for combinatorial optimization and integer programming problems are core discipl...
Integer Programming is used to solve numerous optimization problems. This class of mathematical mode...
Combinatorial optimization problems appear in many disciplines ranging from management and logistic...