We study two continuous knapsack sets Y! and Y " with n integer, one unbounded continuous and m bounded continuous variables in either! or " form. When the coefficients of the integer variables are integer and divisible, we show in both cases that the convex hull is the intersection of the bound constraints and 2m polyhedra arising from a continuous knapsack set with a single unbounded continuous variable. The latter polyhedra are in turn completely described by an exponential family of partition inequalities. A polynomial size extended formulation is known in the! case. We provide an extended formulation for the " case. It follows that, given a specific objective function, optimization over both Y! and Y " can be carrie...
In this work we propose a continuous approach for solving one of the most studied problems in combin...
We present a polyhedral study of the complementarity knapsack problem. Traditionally, complementarit...
AbstractIn this paper, we study the polyhedral structure of the set of 0–1 integer solutions to a si...
We study two continuous knapsack sets Y≥ and Y≤ with n integer, one unbounded continuous and m bound...
We study the convex hull of the continuous knapsack set which consists of a single inequality constr...
We study the convex hull of the continuous knapsack set which consists of a single inequality constr...
We study the convex hull of the feasible set of the semi-continuous knapsack problem, in which the v...
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 ...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
AbstractIn this paper we discuss the polyhedral structure of several mixed integer sets involving tw...
We consider the single item capacitated lot–sizing problem, a well-known produc-tion planning model ...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
none4siWe provide a simple description in terms of linear inequalities of the convex hull of the non...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
In this work we propose a continuous approach for solving one of the most studied problems in combin...
We present a polyhedral study of the complementarity knapsack problem. Traditionally, complementarit...
AbstractIn this paper, we study the polyhedral structure of the set of 0–1 integer solutions to a si...
We study two continuous knapsack sets Y≥ and Y≤ with n integer, one unbounded continuous and m bound...
We study the convex hull of the continuous knapsack set which consists of a single inequality constr...
We study the convex hull of the continuous knapsack set which consists of a single inequality constr...
We study the convex hull of the feasible set of the semi-continuous knapsack problem, in which the v...
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 ...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
AbstractIn this paper we discuss the polyhedral structure of several mixed integer sets involving tw...
We consider the single item capacitated lot–sizing problem, a well-known produc-tion planning model ...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
none4siWe provide a simple description in terms of linear inequalities of the convex hull of the non...
Constraints arising in practice often contain many 0-1 variables and one or a small number of contin...
In this work we propose a continuous approach for solving one of the most studied problems in combin...
We present a polyhedral study of the complementarity knapsack problem. Traditionally, complementarit...
AbstractIn this paper, we study the polyhedral structure of the set of 0–1 integer solutions to a si...