It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound as a continuous relaxation involving the convex hull of all the optimal solutions of the Lagrangian relaxation. It is less often realized that this equivalence is \emph{effective}, in that basically all known algorithms for solving the Lagrangian dual either naturally compute an (approximate) optimal solution of the "convexified relaxation", or can be modified to do so. After recalling these results we elaborate on the importance of the availability of primal information produced by the Lagrangian dual within both exact and approximate approaches to the original (ILP), using three optimization problems with different structure to illustr...
Cutting plane methods and Lagrangian relaxation have both proven to be powerful methods in the solut...
This thesis deals with a class of Lagrangian relaxation based algorithms developed in the computer s...
AbstractThis paper examines algorithmic strategies relating to the formulation of Lagrangian duals, ...
It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound...
In mathematical optimzation, the Lagrangian approach is a general method to find an optimal solution...
International audienceLagrangian relaxation is usually considered in the combinatorial optimization ...
Lagrangian relaxation and more recently cutting plane techniques have both proven to be powerful met...
Operations in areas of importance to society are frequently modeled as Mixed-Integer Linear Programm...
Nonlinearly constrained optimization problems can be solved by minimizing a sequence of simpler unco...
International audienceWe propose in this paper a new Dantzig-Wolfe master model based on Lagrangian ...
This article provides results guarateeing that the optimal value of a given convex infinite optimiza...
summary:We consider general convex large-scale optimization problems in finite dimensions. Under usu...
Lagrangian relaxation is commonly used in combinatorial optimization to generate lower bounds for a ...
Neste trabalho abordamos a teoria da relaxação lagrangeana para resolução de problemas de programaçã...
This paper studies how to generalize Lagrangian relaxation to high-level optimization models, includ...
Cutting plane methods and Lagrangian relaxation have both proven to be powerful methods in the solut...
This thesis deals with a class of Lagrangian relaxation based algorithms developed in the computer s...
AbstractThis paper examines algorithmic strategies relating to the formulation of Lagrangian duals, ...
It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound...
In mathematical optimzation, the Lagrangian approach is a general method to find an optimal solution...
International audienceLagrangian relaxation is usually considered in the combinatorial optimization ...
Lagrangian relaxation and more recently cutting plane techniques have both proven to be powerful met...
Operations in areas of importance to society are frequently modeled as Mixed-Integer Linear Programm...
Nonlinearly constrained optimization problems can be solved by minimizing a sequence of simpler unco...
International audienceWe propose in this paper a new Dantzig-Wolfe master model based on Lagrangian ...
This article provides results guarateeing that the optimal value of a given convex infinite optimiza...
summary:We consider general convex large-scale optimization problems in finite dimensions. Under usu...
Lagrangian relaxation is commonly used in combinatorial optimization to generate lower bounds for a ...
Neste trabalho abordamos a teoria da relaxação lagrangeana para resolução de problemas de programaçã...
This paper studies how to generalize Lagrangian relaxation to high-level optimization models, includ...
Cutting plane methods and Lagrangian relaxation have both proven to be powerful methods in the solut...
This thesis deals with a class of Lagrangian relaxation based algorithms developed in the computer s...
AbstractThis paper examines algorithmic strategies relating to the formulation of Lagrangian duals, ...